\\ charpoly_s2_101-200.gp \\ This is a table of characteristic polynomials of the \\ Hecke operators T_p acting on the space S_2(Gamma_0(N)) \\ of weight 2 cusp forms for Gamma_0(N). \\ William Stein (was@math.berkeley.edu), September, 1998. { T=matrix(200,97,m,n,0); T[101,2]=(x^7 -13*x^5 + 2*x^4 + 47*x^3 -16*x^2 -43*x + 14)*(x ); T[101,3]=(x + 2)*(x^7 -4*x^6 -7*x^5 + 38*x^4 + 4*x^3 -96*x^2 + 13*x + 68); T[101,5]=(x + 1)*(x^7 + 3*x^6 -13*x^5 -33*x^4 + 48*x^3 + 94*x^2 -43*x -67); T[101,7]=(x + 2)*(x^7 -2*x^6 -25*x^5 + 66*x^4 + 90*x^3 -326*x^2 + 165*x + 14); T[101,11]=(x + 2)*(x^7 -8*x^6 -x^5 + 114*x^4 -72*x^3 -554*x^2 + 213*x + 878); T[101,13]=(x -1)*(x^7 + x^6 -45*x^5 -59*x^4 + 664*x^3 + 1066*x^2 -3203*x -6001); T[101,17]=(x -3)*(x^7 + 7*x^6 -33*x^5 -221*x^4 + 460*x^3 + 2038*x^2 -2747*x -3871); T[101,19]=(x + 5)*(x^7 -19*x^6 + 108*x^5 + 24*x^4 -2032*x^3 + 4400*x^2 + 5824*x -18880); T[101,23]=(x -1)*(x^7 + 7*x^6 -48*x^5 -304*x^4 + 432*x^3 + 2160*x^2 -1536*x -64); T[101,29]=(x + 4)*(x^7 + 2*x^6 -60*x^5 -88*x^4 + 880*x^3 + 1248*x^2 -2112*x -640); T[101,31]=(x + 9)*(x^7 -7*x^6 -92*x^5 + 900*x^4 -1472*x^3 -3872*x^2 + 11712*x -7616); T[101,37]=(x + 2)*(x^7 -123*x^5 -100*x^4 + 2990*x^3 + 696*x^2 -5103*x -918); T[101,41]=(x -8)*(x^7 + 2*x^6 -160*x^5 -256*x^4 + 3840*x^3 + 10112*x^2 + 6144*x + 1024); T[101,43]=(x + 8)*(x^7 -32*x^6 + 280*x^5 + 896*x^4 -25616*x^3 + 121024*x^2 -120256*x -235264); T[101,47]=(x -7)*(x^7 + 13*x^6 -36*x^5 -1120*x^4 -4832*x^3 -4176*x^2 + 9792*x + 12096); T[101,53]=(x + 2)*(x^7 + 8*x^6 -252*x^5 -2032*x^4 + 17408*x^3 + 146944*x^2 -210624*x -2213632); T[101,59]=(x + 14)*(x^7 -16*x^6 -49*x^5 + 1128*x^4 + 1338*x^3 -11046*x^2 -1023*x + 18680); T[101,61]=(x -4)*(x^7 + 6*x^6 -180*x^5 -472*x^4 + 7152*x^3 + 12448*x^2 -45760*x + 17792); T[101,67]=(x -2)*(x^7 -34*x^6 + 349*x^5 + 68*x^4 -23296*x^3 + 149424*x^2 -337723*x + 183394); T[101,71]=(x -13)*(x^7 -9*x^6 -200*x^5 + 1588*x^4 + 7248*x^3 -39904*x^2 -35840*x + 189632); T[101,73]=(x -8)*(x^7 + 2*x^6 -128*x^5 -320*x^4 + 3968*x^3 + 13184*x^2 -17408*x -68608); T[101,79]=(x + 9)*(x^7 -15*x^6 -148*x^5 + 3496*x^4 -15520*x^3 -10832*x^2 + 177152*x -244160); T[101,83]=(x + 4)*(x^7 + 22*x^6 -149*x^5 -6456*x^4 -28804*x^3 + 332730*x^2 + 3151505*x + 7092412); T[101,89]=(x -14)*(x^7 + 22*x^6 + 96*x^5 -464*x^4 -2128*x^3 + 5472*x^2 + 4672*x -10880); T[101,97]=(x -2)*(x^7 + 28*x^6 + 25*x^5 -5628*x^4 -62530*x^3 -249976*x^2 -314503*x + 59842); T[102,2]=(x^2 + 2)*(x^4 + x^3 + 2*x + 4)*(x + 1)^2*(x^2 + x + 2)^2*(x -1)^3; T[102,3]=(x^2 + 2*x + 3)*(x^2 + 3)^2*(x -1)^4*(x + 1)^5; T[102,5]=(x + 4)*(x -3)^2*(x^2 -3*x -2)^2*(x )^3*(x + 2)^5; T[102,7]=(x + 2)*(x -2)*(x -4)^4*(x + 4)^4*(x )^5; T[102,11]=(x + 4)*(x + 3)^2*(x -6)^2*(x^2 + x -4)^2*(x )^6; T[102,13]=(x + 6)*(x + 1)^2*(x^2 -5*x + 2)^2*(x -2)^3*(x + 2)^5; T[102,17]=(x + 1)^6*(x -1)^9; T[102,19]=(x -4)^2*(x + 1)^2*(x^2 -3*x -36)^2*(x + 4)^7; T[102,23]=(x -6)*(x + 6)*(x -9)^2*(x^2 + 9*x + 16)^2*(x )^3*(x -4)^4; T[102,29]=(x + 4)*(x + 10)*(x^2 -68)^2*(x )^3*(x -6)^6; T[102,31]=(x + 10)*(x -8)*(x + 6)*(x -2)^2*(x + 4)^2*(x^2 + 2*x -16)^2*(x -4)^4; T[102,37]=(x -8)*(x^2 + 2*x -16)^2*(x + 4)^5*(x + 2)^5; T[102,41]=(x -10)*(x + 10)*(x + 3)^2*(x^2 + 3*x -2)^2*(x -6)^3*(x + 6)^4; T[102,43]=(x -12)*(x -8)^2*(x + 7)^2*(x + 4)^2*(x^2 + 3*x -36)^2*(x -4)^4; T[102,47]=(x -12)*(x -4)*(x + 6)^2*(x^2 + 14*x + 32)^2*(x )^7; T[102,53]=(x + 2)*(x^2 -8*x -52)^2*(x + 6)^4*(x -6)^6; T[102,59]=(x -12)^2*(x -6)^2*(x^2 -6*x -8)^2*(x )^2*(x + 12)^5; T[102,61]=(x^2 -10*x + 8)^2*(x -8)^3*(x + 4)^3*(x + 10)^5; T[102,67]=(x -8)^2*(x + 12)^2*(x + 4)^3*(x -4)^8; T[102,71]=(x -6)*(x + 6)*(x -12)^2*(x^2 -4*x -64)^2*(x )^3*(x + 4)^4; T[102,73]=(x -10)*(x^2 + 8*x -52)^2*(x + 6)^4*(x -2)^6; T[102,79]=(x -10)*(x + 8)*(x -8)^2*(x^2 -6*x -144)^2*(x + 10)^3*(x -12)^4; T[102,83]=(x + 12)*(x -4)*(x -12)*(x + 6)^2*(x^2 + 10*x + 8)^2*(x )^2*(x + 4)^4; T[102,89]=(x + 18)*(x + 2)*(x^2 -6*x -8)^2*(x )^2*(x + 6)^3*(x -10)^4; T[102,97]=(x + 14)*(x -6)*(x + 16)^2*(x^2 + 14*x + 32)^2*(x -14)^3*(x -2)^4; T[103,2]=(x^2 + 3*x + 1)*(x^6 -4*x^5 -x^4 + 17*x^3 -9*x^2 -16*x + 11); T[103,3]=(x^6 -13*x^4 + 40*x^2 -8*x -16)*(x + 1)^2; T[103,5]=(x^2 + 3*x + 1)*(x^6 -3*x^5 -11*x^4 + 34*x^3 + 12*x^2 -40*x -16); T[103,7]=(x^6 + 2*x^5 -18*x^4 -26*x^3 + 74*x^2 + 66*x + 1)*(x + 1)^2; T[103,11]=(x^2 + 3*x + 1)*(x^6 + x^5 -41*x^4 -68*x^3 + 416*x^2 + 968*x + 272); T[103,13]=(x^2 + 3*x -9)*(x^6 + x^5 -28*x^4 + 53*x^3 + 20*x^2 -103*x + 55); T[103,17]=(x^2 + 9*x + 19)*(x^6 -21*x^5 + 144*x^4 -253*x^3 -912*x^2 + 3211*x -1745); T[103,19]=(x^2 -5*x -5)*(x^6 + 7*x^5 -8*x^4 -173*x^3 -508*x^2 -589*x -241); T[103,23]=(x^2 -20)*(x^6 -12*x^5 -23*x^4 + 640*x^3 -947*x^2 -6592*x + 12268); T[103,29]=(x^2 + 6*x + 4)*(x^6 -12*x^5 + 27*x^4 + 28*x^3 -39*x^2 + 2*x + 4); T[103,31]=(x^2 -45)*(x^6 + 16*x^5 + 57*x^4 -150*x^3 -1020*x^2 -1272*x -400); T[103,37]=(x^2 -45)*(x^6 -83*x^4 -322*x^3 -336*x^2 + 64*x + 176); T[103,41]=(x^2 -80)*(x^6 -14*x^5 -37*x^4 + 1574*x^3 -9687*x^2 + 22344*x -15152); T[103,43]=(x^2 + 4*x -41)*(x^6 + 6*x^5 -171*x^4 -1160*x^3 + 3720*x^2 + 19520*x -23984); T[103,47]=(x^2 + 3*x -29)*(x^6 -x^5 -143*x^4 -352*x^3 + 3048*x^2 + 5456*x -22384); T[103,53]=(x^2 + 9*x -11)*(x^6 -19*x^5 + 109*x^4 -194*x^3 -88*x^2 + 384*x -80); T[103,59]=(x^2 -15*x + 55)*(x^6 -3*x^5 -164*x^4 + 281*x^3 + 7632*x^2 -2167*x -78173); T[103,61]=(x^2 -15*x + 45)*(x^6 -x^5 -194*x^4 -273*x^3 + 3602*x^2 + 1459*x -2495); T[103,67]=(x^2 -2*x -179)*(x^6 + 12*x^5 -33*x^4 -752*x^3 -1016*x^2 + 9792*x + 22576); T[103,71]=(x^2 -3*x -29)*(x^6 + 27*x^5 + 139*x^4 -1346*x^3 -10956*x^2 -872*x + 83632); T[103,73]=(x^2 + 15*x + 45)*(x^6 + 7*x^5 -61*x^4 -428*x^3 + 760*x^2 + 4728*x -4624); T[103,79]=(x^2 -7*x -89)*(x^6 + 21*x^5 -12*x^4 -1983*x^3 -5824*x^2 + 9033*x + 5779); T[103,83]=(x^2 -3*x -59)*(x^6 + 9*x^5 -66*x^4 -819*x^3 -1462*x^2 + 4245*x + 9637); T[103,89]=(x^2 + 18*x + 36)*(x^6 + 14*x^5 -372*x^4 -5720*x^3 + 16224*x^2 + 490560*x + 1667776); T[103,97]=(x^2 -10*x -20)*(x^6 + 8*x^5 -337*x^4 -1292*x^3 + 28941*x^2 + 58914*x -560468); T[104,2]=(x + 1)*(x -1)*(x )^9; T[104,3]=(x^2 -x -4)*(x )^2*(x + 3)^3*(x -1)^4; T[104,5]=(x^2 -3*x -2)*(x -2)^2*(x + 3)^3*(x + 1)^4; T[104,7]=(x -5)*(x^2 + x -4)*(x + 2)^2*(x -1)^3*(x + 1)^3; T[104,11]=(x^2 + 2*x -16)*(x -6)^3*(x + 2)^6; T[104,13]=(x -1)^5*(x + 1)^6; T[104,17]=(x^2 + x -38)*(x -6)^2*(x + 3)^7; T[104,19]=(x + 2)*(x^2 -2*x -16)*(x + 6)^2*(x -2)^3*(x -6)^3; T[104,23]=(x -4)*(x -8)^2*(x + 8)^2*(x + 4)^3*(x )^3; T[104,29]=(x + 6)*(x + 2)^2*(x -6)^3*(x -2)^5; T[104,31]=(x -10)^2*(x + 4)^4*(x -4)^5; T[104,37]=(x -11)*(x^2 -7*x -26)*(x + 6)^2*(x + 7)^3*(x -3)^3; T[104,41]=(x -8)*(x^2 -2*x -16)*(x + 6)^2*(x )^6; T[104,43]=(x^2 -15*x + 52)*(x -4)^2*(x + 5)^3*(x + 1)^4; T[104,47]=(x -9)*(x^2 + 13*x + 4)*(x + 2)^2*(x -3)^3*(x -13)^3; T[104,53]=(x + 12)*(x^2 + 2*x -16)*(x -6)^2*(x -12)^3*(x )^3; T[104,59]=(x -6)*(x^2 -2*x -16)*(x + 6)^3*(x + 10)^5; T[104,61]=(x^2 -14*x + 32)*(x )*(x + 2)^2*(x + 8)^3*(x -8)^3; T[104,67]=(x -6)*(x^2 + 2*x -16)*(x -10)^2*(x -14)^3*(x + 2)^3; T[104,71]=(x -7)*(x^2 + 3*x -36)*(x -10)^2*(x + 3)^3*(x + 5)^3; T[104,73]=(x + 2)*(x + 6)^2*(x + 10)^3*(x -2)^5; T[104,79]=(x -12)*(x + 4)^5*(x -8)^5; T[104,83]=(x + 16)*(x^2 + 12*x -32)*(x + 6)^2*(x -12)^3*(x )^3; T[104,89]=(x + 10)*(x -10)^2*(x -6)^3*(x + 6)^5; T[104,97]=(x^2 -68)*(x -2)^2*(x -14)^3*(x + 10)^4; T[105,2]=(x -1)*(x^2 -5)*(x^2 + x -4)^2*(x )^2*(x + 1)^4; T[105,3]=(x^2 -x + 3)*(x^4 + x^3 + 2*x^2 + 3*x + 9)*(x -1)^3*(x + 1)^4; T[105,5]=(x^2 + 2*x + 5)*(x + 1)^4*(x -1)^7; T[105,7]=(x^2 + 7)*(x -1)^5*(x + 1)^6; T[105,11]=(x^2 -4*x -16)*(x )*(x -4)^2*(x + 4)^2*(x + 3)^2*(x^2 -x -4)^2; T[105,13]=(x + 6)*(x^2 -20)*(x -5)^2*(x^2 -5*x + 2)^2*(x + 2)^4; T[105,17]=(x + 6)^2*(x + 2)^2*(x -3)^2*(x^2 + 5*x + 2)^2*(x -2)^3; T[105,19]=(x + 8)*(x^2 -4*x -16)*(x -2)^2*(x^2 + 6*x -8)^2*(x -4)^4; T[105,23]=(x -8)*(x + 6)^2*(x -4)^2*(x^2 + 2*x -16)^2*(x )^4; T[105,29]=(x -3)^2*(x^2 -x -38)^2*(x + 2)^7; T[105,31]=(x -4)*(x^2 -12*x + 16)*(x + 4)^2*(x )^8; T[105,37]=(x + 2)*(x^2 -4*x -76)*(x + 10)^2*(x -2)^2*(x -6)^6; T[105,41]=(x + 6)*(x + 12)^2*(x + 2)^2*(x -2)^2*(x -10)^2*(x^2 -2*x -16)^2; T[105,43]=(x^2 -80)*(x + 10)^2*(x + 4)^2*(x^2 -10*x + 8)^2*(x -4)^3; T[105,47]=(x^2 -8*x -64)*(x -9)^2*(x^2 + 5*x -32)^2*(x )^2*(x -8)^3; T[105,53]=(x -10)*(x^2 + 16*x + 44)*(x -6)^2*(x -12)^2*(x + 10)^2*(x^2 + 2*x -16)^2; T[105,59]=(x -4)*(x^2 -80)*(x -12)^2*(x )^2*(x + 4)^6; T[105,61]=(x -8)^2*(x^2 -6*x -144)^2*(x + 2)^7; T[105,67]=(x -12)^2*(x^2 -4*x -64)^2*(x -4)^3*(x + 4)^4; T[105,71]=(x + 12)*(x^2 -20*x + 80)*(x + 8)^2*(x -8)^4*(x )^4; T[105,73]=(x + 2)*(x^2 + 16*x + 44)*(x -10)^2*(x -2)^2*(x + 6)^2*(x^2 + 8*x -52)^2; T[105,79]=(x -8)*(x^2 -8*x -64)*(x + 16)^2*(x + 1)^2*(x^2 + 9*x + 16)^2*(x )^2; T[105,83]=(x + 4)*(x^2 + 16*x -16)*(x + 12)^2*(x -12)^4*(x -4)^4; T[105,89]=(x + 14)^2*(x + 2)^2*(x + 12)^2*(x^2 -6*x -8)^2*(x + 6)^3; T[105,97]=(x + 18)*(x^2 -8*x -4)*(x + 1)^2*(x -18)^2*(x -2)^2*(x^2 + 9*x -86)^2; T[106,2]=(x^2 + x + 2)*(x^6 + x^5 + 3*x^4 + 3*x^3 + 6*x^2 + 4*x + 8)*(x + 1)^2*(x -1)^2; T[106,3]=(x + 1)*(x -1)*(x -2)*(x + 2)*(x + 3)^2*(x^3 -3*x^2 -x + 1)^2; T[106,5]=(x + 4)*(x -3)*(x -1)*(x^3 + 2*x^2 -4*x -4)^2*(x )^3; T[106,7]=(x + 2)*(x -2)*(x )*(x^3 -4*x^2 + 4)^2*(x + 4)^3; T[106,11]=(x -5)*(x + 4)*(x + 3)*(x^3 + 4*x^2 -4*x -20)^2*(x )^3; T[106,13]=(x -5)*(x + 3)^2*(x + 4)^2*(x -1)^7; T[106,17]=(x -5)*(x -3)^2*(x^3 + 5*x^2 -5*x -17)^2*(x + 3)^3; T[106,19]=(x + 1)*(x + 7)*(x + 5)^2*(x + 4)^2*(x^3 -11*x^2 + 37*x -37)^2; T[106,23]=(x + 3)*(x + 9)*(x -1)*(x -3)*(x -7)^2*(x^3 -3*x^2 -31*x -29)^2; T[106,29]=(x -5)*(x + 6)*(x -6)*(x -9)*(x + 7)^2*(x^3 + 5*x^2 -37*x -61)^2; T[106,31]=(x -7)*(x -5)*(x + 4)^2*(x -4)^2*(x^3 + 2*x^2 -76*x + 116)^2; T[106,37]=(x -1)*(x + 6)*(x + 10)*(x^3 + 5*x^2 -89*x -353)^2*(x -5)^3; T[106,41]=(x -2)*(x + 10)*(x^3 + 10*x^2 + 20*x -8)^2*(x -6)^4; T[106,43]=(x + 1)*(x -7)*(x + 10)^2*(x + 2)^2*(x^3 -18*x^2 + 24*x + 556)^2; T[106,47]=(x -4)*(x -6)*(x + 6)*(x )*(x + 2)^2*(x^3 + 10*x^2 -4*x -8)^2; T[106,53]=(x + 1)^5*(x -1)^7; T[106,59]=(x -15)*(x -6)*(x + 6)*(x -7)*(x + 2)^2*(x^3 -2*x^2 -60*x + 200)^2; T[106,61]=(x -4)*(x -2)*(x + 10)*(x -8)*(x + 8)^2*(x^3 + 10*x^2 -56*x -556)^2; T[106,67]=(x -4)*(x -16)*(x + 4)^2*(x + 12)^2*(x^3 -6*x^2 -72*x -108)^2; T[106,71]=(x + 3)*(x -15)*(x -1)^2*(x -12)^2*(x^3 + 5*x^2 -105*x + 277)^2; T[106,73]=(x + 12)*(x -8)*(x + 8)*(x^3 -6*x^2 -28*x -4)^2*(x + 4)^3; T[106,79]=(x + 7)*(x -11)*(x + 13)*(x -1)*(x + 1)^2*(x^3 + 7*x^2 -77*x + 131)^2; T[106,83]=(x + 6)*(x + 3)*(x -3)*(x + 14)*(x + 1)^2*(x^3 -27*x^2 + 213*x -457)^2; T[106,89]=(x -2)*(x -17)*(x -18)*(x -9)*(x + 14)^2*(x^3 + 2*x^2 -212*x + 1048)^2; T[106,97]=(x -17)*(x + 7)*(x -3)*(x + 13)*(x -1)^2*(x^3 + x^2 -133*x -137)^2; T[107,2]=(x^2 + x -1)*(x^7 + x^6 -10*x^5 -7*x^4 + 29*x^3 + 12*x^2 -20*x -8); T[107,3]=(x^2 + 3*x + 1)*(x^7 -3*x^6 -9*x^5 + 29*x^4 + 14*x^3 -69*x^2 + 12*x + 29); T[107,5]=(x^2 + 3*x + 1)*(x^7 -5*x^6 -9*x^5 + 64*x^4 -28*x^3 -152*x^2 + 192*x -64); T[107,7]=(x^2 + 4*x -1)*(x^7 -4*x^6 -23*x^5 + 114*x^4 -32*x^3 -360*x^2 + 448*x -128); T[107,11]=(x^2 -4*x -1)*(x^7 + 2*x^6 -41*x^5 -95*x^4 + 361*x^3 + 950*x^2 + 519*x + 47); T[107,13]=(x^7 -18*x^6 + 98*x^5 + x^4 -1649*x^3 + 4855*x^2 -3548*x -1244)*(x + 6)^2; T[107,17]=(x^2 + 3*x + 1)*(x^7 + x^6 -41*x^5 -16*x^4 + 488*x^3 + 32*x^2 -1536*x -512); T[107,19]=(x^2 -2*x -44)*(x^7 + 4*x^6 -52*x^5 -137*x^4 + 391*x^3 + 951*x^2 -694*x -1636); T[107,23]=(x^2 -6*x -11)*(x^7 -123*x^5 -41*x^4 + 4295*x^3 + 1802*x^2 -34533*x + 21431); T[107,29]=(x^2 + 2*x -19)*(x^7 + 3*x^6 -94*x^5 -382*x^4 + 1077*x^3 + 4927*x^2 -1896*x -11828); T[107,31]=(x^2 + 2*x -19)*(x^7 -4*x^6 -45*x^5 + 224*x^4 -84*x^3 -576*x^2 + 320*x + 256); T[107,37]=(x^2 + 13*x + 31)*(x^7 -25*x^6 + 219*x^5 -659*x^4 -1042*x^3 + 10321*x^2 -20000*x + 12113); T[107,41]=(x^2 -10*x + 20)*(x^7 -82*x^5 + 155*x^4 + 893*x^3 -1965*x^2 -394*x + 724); T[107,43]=(x^2 -9*x + 9)*(x^7 -11*x^6 -79*x^5 + 1026*x^4 + 140*x^3 -23568*x^2 + 59040*x -21856); T[107,47]=(x^2 + 14*x + 44)*(x^7 + 9*x^6 -107*x^5 -1361*x^4 -2306*x^3 + 14076*x^2 + 30432*x -30848); T[107,53]=(x^2 + 6*x -71)*(x^7 -8*x^6 -125*x^5 + 435*x^4 + 5683*x^3 -150*x^2 -79775*x -143149); T[107,59]=(x^2 -3*x -99)*(x^7 + 19*x^6 + 81*x^5 -538*x^4 -6064*x^3 -21232*x^2 -31888*x -16736); T[107,61]=(x^2 + 13*x + 31)*(x^7 -25*x^6 + 111*x^5 + 1195*x^4 -9280*x^3 + 2653*x^2 + 86150*x -123049); T[107,67]=(x^2 + 10*x + 20)*(x^7 + 24*x^6 + 44*x^5 -3400*x^4 -36896*x^3 -136864*x^2 -88704*x + 333056); T[107,71]=(x^2 + 3*x -99)*(x^7 + 19*x^6 -165*x^5 -4948*x^4 -15804*x^3 + 174696*x^2 + 1073984*x + 1370816); T[107,73]=(x^2 + 8*x -29)*(x^7 -30*x^6 + 101*x^5 + 3540*x^4 -21896*x^3 -74968*x^2 + 357776*x + 79712); T[107,79]=(x^2 -x -11)*(x^7 + 21*x^6 + 131*x^5 -13*x^4 -2664*x^3 -6337*x^2 + 5306*x + 19859); T[107,83]=(x^2 -3*x -9)*(x^7 -12*x^6 -395*x^5 + 5505*x^4 + 25518*x^3 -554561*x^2 + 1427088*x + 2420672); T[107,89]=(x^2 -20*x + 95)*(x^7 + 22*x^6 -87*x^5 -3053*x^4 -1107*x^3 + 33866*x^2 -27103*x -14123); T[107,97]=(x^2 + 12*x -9)*(x^7 + 4*x^6 -207*x^5 -414*x^4 + 10036*x^3 + 8368*x^2 -124544*x + 139424); T[108,2]=(x + 1)*(x -1)*(x^2 + 2)*(x )^6; T[108,3]=(x )^10; T[108,5]=(x + 3)^2*(x -3)^2*(x )^6; T[108,7]=(x -5)*(x + 4)^2*(x + 1)^7; T[108,11]=(x + 3)^2*(x -3)^2*(x )^6; T[108,13]=(x + 7)*(x -2)^2*(x -5)^3*(x + 4)^4; T[108,17]=(x )^10; T[108,19]=(x + 1)*(x -8)^2*(x + 7)^3*(x -2)^4; T[108,23]=(x -6)^2*(x + 6)^2*(x )^6; T[108,29]=(x -6)^2*(x + 6)^2*(x )^6; T[108,31]=(x -5)^4*(x + 4)^6; T[108,37]=(x + 1)*(x + 10)^2*(x -11)^3*(x -2)^4; T[108,41]=(x -6)^2*(x + 6)^2*(x )^6; T[108,43]=(x + 10)^4*(x -8)^6; T[108,47]=(x + 6)^2*(x -6)^2*(x )^6; T[108,53]=(x -9)^2*(x + 9)^2*(x )^6; T[108,59]=(x + 12)^2*(x -12)^2*(x )^6; T[108,61]=(x + 13)*(x -14)^2*(x + 1)^3*(x -8)^4; T[108,67]=(x -11)*(x + 16)^2*(x -5)^3*(x -14)^4; T[108,71]=(x )^10; T[108,73]=(x -17)*(x + 10)^2*(x + 7)^7; T[108,79]=(x + 13)*(x + 4)^2*(x -17)^3*(x -8)^4; T[108,83]=(x + 3)^2*(x -3)^2*(x )^6; T[108,89]=(x -18)^2*(x + 18)^2*(x )^6; T[108,97]=(x -5)*(x -14)^2*(x + 19)^3*(x + 1)^4; T[109,2]=(x -1)*(x^3 + 2*x^2 -x -1)*(x^4 + x^3 -5*x^2 -4*x + 3); T[109,3]=(x^3 + 4*x^2 + 3*x -1)*(x^4 -4*x^3 -x^2 + 15*x -8)*(x ); T[109,5]=(x -3)*(x^3 + 6*x^2 + 5*x -13)*(x^4 -x^3 -5*x^2 + 4*x + 3); T[109,7]=(x -2)*(x^3 + x^2 -16*x + 13)*(x^4 + 3*x^3 -10*x^2 -23*x -2); T[109,11]=(x -1)*(x^3 + 13*x^2 + 54*x + 71)*(x^4 -12*x^3 + 33*x^2 + 47*x -177); T[109,13]=(x^3 + x^2 -16*x + 13)*(x^4 + 7*x^3 -10*x^2 -93*x + 16)*(x ); T[109,17]=(x + 8)*(x^3 -3*x^2 -4*x + 13)*(x^4 -11*x^3 + 10*x^2 + 215*x -576); T[109,19]=(x + 5)*(x^3 + 5*x^2 -8*x -41)*(x^4 -10*x^3 + 27*x^2 + 3*x -59); T[109,23]=(x -7)*(x^3 -x^2 -58*x -13)*(x^4 + 2*x^3 -31*x^2 -43*x + 177); T[109,29]=(x + 5)*(x^3 + 6*x^2 -37*x -181)*(x^4 -x^3 -59*x^2 + 154*x -57); T[109,31]=(x -6)*(x^3 + 7*x^2 -28*x + 7)*(x^4 + 5*x^3 -22*x^2 -69*x + 158); T[109,37]=(x -2)*(x^3 -7*x -7)*(x^4 + 12*x^3 -65*x^2 -1031*x -2038); T[109,41]=(x -2)*(x^3 + 6*x^2 -51*x + 71)*(x^4 -12*x^3 + 47*x^2 -61*x + 6); T[109,43]=(x + 4)*(x^3 -9*x^2 -36*x + 351)*(x^4 -5*x^3 -40*x^2 + 75*x + 388); T[109,47]=(x -9)*(x^3 + 10*x^2 -25*x -125)*(x^4 + x^3 -5*x^2 -4*x + 3); T[109,53]=(x -12)*(x^3 -9*x^2 + 20*x -13)*(x^4 + 19*x^3 -24*x^2 -1351*x -684); T[109,59]=(x -12)*(x^3 + 25*x^2 + 192*x + 461)*(x^4 -27*x^3 + 216*x^2 -513*x + 324); T[109,61]=(x + 5)*(x^3 + 10*x^2 -144*x -1336)*(x^4 + 7*x^3 -102*x^2 + 72*x + 216); T[109,67]=(x + 12)*(x^3 + 11*x^2 -25*x -43)*(x^4 -7*x^3 -53*x^2 + 455*x -772); T[109,71]=(x + 6)*(x^3 + 10*x^2 -11*x -223)*(x^4 -32*x^3 + 209*x^2 + 1843*x -17298); T[109,73]=(x + 5)*(x^3 -20*x^2 + 131*x -281)*(x^4 + 9*x^3 -77*x^2 -710*x -997); T[109,79]=(x -8)*(x^3 + 6*x^2 -79*x -461)*(x^4 + 24*x^3 + 65*x^2 -935*x + 1264); T[109,83]=(x + 2)*(x^3 + 13*x^2 -2*x -139)*(x^4 -21*x^3 + 80*x^2 + 301*x -534); T[109,89]=(x -1)*(x^3 + 21*x^2 + 84*x + 91)*(x^4 + 16*x^3 -29*x^2 -349*x + 513); T[109,97]=(x -1)*(x^3 + 20*x^2 + 75*x -125)*(x^4 + 11*x^3 -45*x^2 -96*x -23); T[110,2]=(x^2 -x + 2)*(x^4 -2*x^3 + 3*x^2 -4*x + 4)*(x -1)^2*(x^2 + 2*x + 2)^2*(x + 1)^3; T[110,3]=(x^2 + x -8)*(x -1)^2*(x^2 -8)^2*(x )^2*(x + 1)^5; T[110,5]=(x^2 -x + 5)^2*(x -1)^5*(x + 1)^6; T[110,7]=(x -5)*(x + 1)*(x -3)*(x^2 -x -8)*(x )^2*(x + 2)^8; T[110,11]=(x + 1)^5*(x -1)^10; T[110,13]=(x + 6)*(x^2 + 8*x + 8)^2*(x -4)^4*(x -2)^6; T[110,17]=(x -3)*(x + 3)*(x + 7)*(x^2 + 3*x -6)*(x -6)^2*(x^2 -8*x + 8)^2*(x + 2)^4; T[110,19]=(x + 1)*(x + 7)*(x -5)*(x^2 -7*x + 4)*(x + 4)^2*(x )^8; T[110,23]=(x -6)*(x^2 + 6*x -24)*(x -4)^2*(x + 6)^2*(x^2 -8)^2*(x + 1)^4; T[110,29]=(x + 9)*(x + 3)*(x -5)*(x^2 + 3*x -6)*(x -6)^2*(x^2 -4*x -28)^2*(x )^4; T[110,31]=(x -5)*(x + 7)*(x + 3)*(x^2 -x -8)*(x + 8)^2*(x -7)^4*(x )^4; T[110,37]=(x + 7)*(x -5)*(x^2 -13*x + 34)*(x + 2)^2*(x^2 + 4*x -28)^2*(x -3)^5; T[110,41]=(x + 6)*(x^2 -132)*(x -2)^3*(x + 8)^4*(x -6)^5; T[110,43]=(x + 4)^2*(x -8)^2*(x -4)^3*(x + 6)^8; T[110,47]=(x + 2)*(x^2 + 6*x -24)*(x -6)^2*(x + 12)^2*(x^2 -8)^2*(x -8)^4; T[110,53]=(x + 1)*(x -9)*(x + 3)*(x^2 -9*x -54)*(x + 2)^2*(x^2 -12*x + 4)^2*(x + 6)^4; T[110,59]=(x -6)*(x + 6)*(x + 10)*(x^2 -6*x -24)*(x -4)^2*(x^2 + 8*x -16)^2*(x -5)^4; T[110,61]=(x -5)*(x + 1)*(x -7)*(x^2 + 5*x -2)*(x + 10)^2*(x^2 -4*x -124)^2*(x -12)^4; T[110,67]=(x + 16)^2*(x^2 -8*x -56)^2*(x + 7)^4*(x -8)^5; T[110,71]=(x -7)*(x -3)*(x + 9)*(x^2 -3*x -72)*(x -8)^2*(x^2 -128)^2*(x + 3)^4; T[110,73]=(x -2)*(x + 10)*(x^2 + 8*x -116)*(x^2 + 8*x + 8)^2*(x -14)^3*(x -4)^4; T[110,79]=(x -10)*(x -14)*(x^2 + 14*x + 16)*(x -8)^2*(x -4)^4*(x + 10)^5; T[110,83]=(x^2 -6*x -24)*(x + 4)^2*(x + 6)^11; T[110,89]=(x -9)*(x^2 -3*x -6)*(x + 15)^2*(x -10)^2*(x^2 + 4*x -124)^2*(x -15)^4; T[110,97]=(x + 12)*(x -8)*(x + 4)*(x^2 + 14*x + 16)*(x -10)^2*(x^2 + 4*x -28)^2*(x + 7)^4; T[111,2]=(x^3 -3*x^2 -x + 5)*(x^4 -6*x^2 + 2*x + 5)*(x + 2)^2*(x )^2; T[111,3]=(x^2 + 3*x + 3)*(x^2 -x + 3)*(x + 1)^3*(x -1)^4; T[111,5]=(x^3 -4*x^2 -4*x + 20)*(x^4 + 2*x^3 -8*x^2 + 4)*(x + 2)^2*(x )^2; T[111,7]=(x^3 + 4*x^2 -8*x -16)*(x^4 -4*x^3 -16*x^2 + 64*x -16)*(x + 1)^4; T[111,11]=(x^3 -4*x^2 -16*x + 32)*(x^4 -32*x^2 -32*x + 64)*(x -3)^2*(x + 5)^2; T[111,13]=(x^3 + 2*x^2 -20*x -8)*(x^4 -4*x^3 -32*x^2 + 144*x -80)*(x + 4)^2*(x + 2)^2; T[111,17]=(x^3 -4*x^2 -28*x + 116)*(x^4 + 2*x^3 -24*x^2 -72*x -28)*(x -6)^2*(x )^2; T[111,19]=(x^3 + 8*x^2 + 8*x -16)*(x^4 -8*x^3 -8*x^2 + 144*x -224)*(x -2)^2*(x )^2; T[111,23]=(x^3 + 2*x^2 -4*x -4)*(x^4 + 10*x^3 -32*x^2 -296*x + 652)*(x -2)^2*(x -6)^2; T[111,29]=(x^3 -16*x^2 + 76*x -92)*(x^4 + 2*x^3 -56*x^2 -40*x + 724)*(x -6)^2*(x + 6)^2; T[111,31]=(x^3 + 8*x^2 -32*x -272)*(x^4 -4*x^3 -16*x^2 + 16*x + 32)*(x + 4)^4; T[111,37]=(x -1)^5*(x + 1)^6; T[111,41]=(x^4 -12*x^3 + 304*x -400)*(x -6)^3*(x + 9)^4; T[111,43]=(x^3 + 12*x^2 + 32*x -16)*(x^4 -4*x^3 -128*x^2 + 176*x + 3424)*(x -2)^2*(x -8)^2; T[111,47]=(x^3 + 4*x^2 -48*x -64)*(x^4 + 12*x^3 + 16*x^2 -128*x -128)*(x -3)^2*(x + 9)^2; T[111,53]=(x^3 + 6*x^2 -100*x -632)*(x^4 -8*x^3 -56*x^2 + 320*x + 464)*(x -1)^2*(x + 3)^2; T[111,59]=(x^3 -6*x^2 -36*x + 108)*(x^4 + 10*x^3 -176*x^2 -2416*x -7156)*(x -12)^2*(x -8)^2; T[111,61]=(x^4 + 8*x^3 -72*x^2 -480*x + 656)*(x + 8)^2*(x -8)^2*(x + 2)^3; T[111,67]=(x^3 + 16*x^2 + 24*x -16)*(x^4 + 4*x^3 -16*x^2 -64*x -16)*(x -8)^2*(x + 4)^2; T[111,71]=(x^3 -12*x^2 -16*x + 320)*(x^4 + 12*x^3 -48*x^2 -512*x + 1664)*(x -9)^2*(x + 15)^2; T[111,73]=(x^3 + 6*x^2 -4*x -8)*(x^4 -12*x^3 -8*x^2 + 176*x -32)*(x + 1)^2*(x -11)^2; T[111,79]=(x^3 -12*x^2 -72*x + 400)*(x^4 + 8*x^3 -56*x^2 -656*x -1504)*(x -4)^2*(x + 10)^2; T[111,83]=(x^3 -112*x -416)*(x^4 + 20*x^3 + 112*x^2 + 192*x + 64)*(x -9)^2*(x + 15)^2; T[111,89]=(x^3 + 4*x^2 -108*x -52)*(x^4 -26*x^3 + 128*x^2 + 944*x -5452)*(x -6)^2*(x -4)^2; T[111,97]=(x^3 + 14*x^2 + 28*x -152)*(x^4 + 4*x^3 -272*x^2 -464*x + 17008)*(x -4)^2*(x -8)^2; T[112,2]=(x + 1)*(x )^10; T[112,3]=(x -2)^3*(x )^3*(x + 2)^5; T[112,5]=(x + 4)^3*(x -2)^3*(x )^5; T[112,7]=(x + 1)^4*(x -1)^7; T[112,11]=(x -4)*(x + 4)^2*(x )^8; T[112,13]=(x -2)^3*(x )^3*(x + 4)^5; T[112,17]=(x + 6)^3*(x + 2)^3*(x -6)^5; T[112,19]=(x + 8)*(x -8)^2*(x + 2)^3*(x -2)^5; T[112,23]=(x + 8)*(x -8)^2*(x )^8; T[112,29]=(x -2)^3*(x -6)^3*(x + 6)^5; T[112,31]=(x + 8)*(x -8)^2*(x -4)^3*(x + 4)^5; T[112,37]=(x + 6)^3*(x + 2)^3*(x -2)^5; T[112,41]=(x + 2)^3*(x -2)^3*(x -6)^5; T[112,43]=(x -4)*(x + 4)^2*(x + 8)^2*(x -8)^6; T[112,47]=(x -8)*(x -4)*(x -12)*(x + 4)^2*(x + 8)^2*(x + 12)^4; T[112,53]=(x + 10)^3*(x -6)^8; T[112,59]=(x -6)^3*(x )^3*(x + 6)^5; T[112,61]=(x -4)^3*(x + 6)^3*(x -8)^5; T[112,67]=(x -12)*(x + 12)^2*(x -4)^2*(x + 4)^6; T[112,71]=(x -8)*(x + 8)^2*(x )^8; T[112,73]=(x + 14)^3*(x -10)^3*(x -2)^5; T[112,79]=(x + 16)*(x -16)^2*(x + 8)^3*(x -8)^5; T[112,83]=(x + 8)*(x -8)^2*(x -6)^3*(x + 6)^5; T[112,89]=(x -10)^3*(x + 6)^8; T[112,97]=(x + 2)^3*(x + 6)^3*(x + 10)^5; T[113,2]=(x + 1)*(x^3 + 2*x^2 -5*x -9)*(x^3 + 2*x^2 -x -1)*(x -1)^2; T[113,3]=(x -2)*(x^2 -2*x -2)*(x^3 + x^2 -4*x -1)*(x^3 + 5*x^2 + 6*x + 1); T[113,5]=(x -2)*(x^2 -12)*(x^3 + x^2 -9*x -1)*(x + 1)^3; T[113,7]=(x^3 -6*x^2 + 3*x + 9)*(x^3 + 10*x^2 + 31*x + 29)*(x )*(x -4)^2; T[113,11]=(x^2 + 4*x -8)*(x^3 -2*x^2 -3*x + 3)*(x^3 -2*x^2 -15*x -13)*(x ); T[113,13]=(x -2)*(x^2 + 4*x -8)*(x^3 -8*x^2 + 17*x -7)*(x^3 + 8*x^2 + 5*x -43); T[113,17]=(x + 6)*(x^3 -10*x^2 + 21*x -9)*(x^3 + 2*x^2 -29*x + 13)*(x + 2)^2; T[113,19]=(x -6)*(x^2 + 6*x + 6)*(x^3 + 4*x^2 -11*x -1)*(x^3 -4*x^2 -45*x + 177); T[113,23]=(x + 6)*(x^2 -2*x -2)*(x^3 + 6*x^2 -9*x -27)*(x^3 -4*x^2 -15*x -9); T[113,29]=(x + 6)*(x^2 -8*x + 4)*(x^3 -5*x^2 -22*x + 97)*(x^3 + 7*x^2 + 12*x + 3); T[113,31]=(x + 4)*(x^2 -4*x -8)*(x^3 -9*x^2 + 18*x + 1)*(x^3 + 15*x^2 + 26*x -211); T[113,37]=(x -2)*(x^2 + 8*x + 4)*(x^3 -8*x^2 -61*x + 389)*(x^3 + 2*x^2 -71*x -113); T[113,41]=(x + 2)*(x^2 + 4*x -8)*(x^3 -x^2 -16*x + 29)*(x^3 + 7*x^2 -68*x -63); T[113,43]=(x -6)*(x^2 -6*x -66)*(x^3 -12*x^2 + 21*x -9)*(x^3 + 2*x^2 -29*x + 13); T[113,47]=(x -6)*(x^2 -6*x -18)*(x^3 + 7*x^2 -28*x + 7)*(x^3 -9*x^2 -6*x + 81); T[113,53]=(x -10)*(x^2 + 12*x + 24)*(x^3 + 5*x^2 -64*x + 29)*(x^3 + 21*x^2 + 120*x + 101); T[113,59]=(x -6)*(x^2 -6*x -18)*(x^3 + 9*x^2 -42*x -369)*(x^3 -15*x^2 + 26*x + 169); T[113,61]=(x -6)*(x^2 -12*x -12)*(x^3 + 21*x^2 + 108*x + 81)*(x^3 + 21*x^2 + 140*x + 301); T[113,67]=(x -2)*(x^2 + 10*x + 22)*(x^3 -5*x^2 -36*x -43)*(x^3 + 3*x^2 -156*x -869); T[113,71]=(x + 6)*(x^2 + 10*x + 22)*(x^3 -14*x^2 + 392)*(x^3 -22*x^2 + 144*x -264); T[113,73]=(x -2)*(x^2 -4*x -188)*(x^3 + x^2 -40*x -109)*(x^3 + 11*x^2 -46*x + 41); T[113,79]=(x -10)*(x^2 -10*x -50)*(x^3 -x^2 -40*x + 109)*(x^3 + 5*x^2 -50*x -125); T[113,83]=(x + 4)*(x^2 -192)*(x^3 -14*x^2 + 63*x -91)*(x^3 -2*x^2 -193*x + 413); T[113,89]=(x + 14)*(x^2 -12*x -12)*(x^3 + 6*x^2 -147*x + 401)*(x^3 + 16*x^2 -29*x -841); T[113,97]=(x + 14)*(x^3 -12*x^2 -33*x + 287)*(x^3 -217*x + 1183)*(x + 2)^2; T[114,2]=(x^2 -x + 2)*(x^2 + 2)^2*(x^2 + 2*x + 2)^2*(x + 1)^3*(x -1)^4; T[114,3]=(x^2 + x + 3)*(x^2 -x + 3)*(x^2 + 2*x + 3)^2*(x + 1)^4*(x -1)^5; T[114,5]=(x -2)*(x + 4)^2*(x + 3)^2*(x -1)^2*(x + 2)^2*(x -3)^4*(x )^4; T[114,7]=(x + 4)*(x -4)*(x + 5)^2*(x )^3*(x -3)^4*(x + 1)^6; T[114,11]=(x + 4)*(x -4)*(x + 6)^2*(x -2)^2*(x + 3)^2*(x -1)^2*(x )^3*(x -3)^4; T[114,13]=(x )*(x + 6)^2*(x -6)^2*(x -5)^2*(x + 1)^2*(x -2)^3*(x + 4)^5; T[114,17]=(x + 2)*(x -6)*(x + 1)^2*(x + 6)^3*(x + 3)^4*(x -3)^6; T[114,19]=(x -1)^8*(x + 1)^9; T[114,23]=(x + 6)*(x + 2)*(x + 1)^2*(x -3)^2*(x + 4)^3*(x -4)^4*(x )^4; T[114,29]=(x + 6)*(x -2)^2*(x + 10)^2*(x + 5)^2*(x -9)^2*(x + 2)^3*(x -6)^5; T[114,31]=(x -6)*(x -4)*(x + 8)^2*(x + 6)^2*(x -8)^2*(x -2)^3*(x + 4)^6; T[114,37]=(x + 4)*(x -10)*(x + 8)*(x -8)^2*(x + 10)^2*(x + 2)^2*(x )^2*(x -2)^6; T[114,41]=(x -6)*(x -10)^2*(x + 2)^2*(x + 6)^4*(x + 8)^4*(x )^4; T[114,43]=(x + 12)*(x -8)^2*(x + 4)^3*(x -4)^3*(x + 1)^8; T[114,47]=(x -10)*(x -6)*(x + 4)*(x -12)^2*(x -3)^2*(x + 9)^2*(x -8)^2*(x )^2*(x + 3)^4; T[114,53]=(x + 10)*(x -2)*(x -6)*(x + 1)^2*(x -10)^2*(x + 3)^2*(x + 6)^4*(x -12)^4; T[114,59]=(x -4)*(x -12)*(x -15)^2*(x + 8)^2*(x -9)^2*(x )^2*(x + 12)^3*(x + 6)^4; T[114,61]=(x -2)^2*(x + 2)^2*(x -14)^2*(x -7)^2*(x + 10)^3*(x + 1)^6; T[114,67]=(x + 12)*(x )*(x -3)^2*(x -5)^2*(x -8)^5*(x + 4)^6; T[114,71]=(x -8)*(x + 16)*(x -2)^2*(x + 6)^2*(x -12)^2*(x + 12)^2*(x )^3*(x -6)^4; T[114,73]=(x + 6)*(x + 2)*(x -14)*(x -9)^2*(x -10)^2*(x + 11)^4*(x + 7)^6; T[114,79]=(x + 4)*(x -10)*(x -16)^2*(x -8)^4*(x )^4*(x + 10)^5; T[114,83]=(x + 12)*(x + 16)*(x -16)^2*(x -4)^2*(x + 6)^4*(x -12)^7; T[114,89]=(x -10)^2*(x + 12)^2*(x )^2*(x + 2)^3*(x + 6)^4*(x -12)^4; T[114,97]=(x -10)^3*(x + 2)^4*(x -8)^4*(x + 10)^6; T[115,2]=(x -2)*(x^2 + 3*x + 1)*(x^4 -2*x^3 -4*x^2 + 5*x + 2)*(x^2 + x -1)^2; T[115,3]=(x )*(x + 1)^2*(x^2 -5)^2*(x^2 + x -4)^2; T[115,5]=(x^4 + 2*x^3 + 6*x^2 + 10*x + 25)*(x + 1)^3*(x -1)^4; T[115,7]=(x -1)*(x^2 + 2*x -4)*(x^4 + 3*x^3 -14*x^2 -52*x -32)*(x^2 -2*x -4)^2; T[115,11]=(x -2)*(x^2 + 2*x -4)*(x^4 -4*x^3 -16*x^2 + 40*x + 32)*(x^2 + 6*x + 4)^2; T[115,13]=(x + 2)*(x^2 + 8*x + 11)*(x^4 -41*x^2 + 212)*(x -3)^4; T[115,17]=(x -3)*(x^2 + 4*x -16)*(x^4 + x^3 -18*x^2 -24*x + 32)*(x^2 -6*x + 4)^2; T[115,19]=(x^2 -2*x -44)*(x^4 + 4*x^3 -16*x^2 -40*x + 32)*(x + 2)^5; T[115,23]=(x -1)^5*(x + 1)^6; T[115,29]=(x -7)*(x^2 + 10*x + 5)*(x^4 -19*x^3 + 117*x^2 -269*x + 202)*(x + 3)^4; T[115,31]=(x + 5)*(x^2 -4*x -1)*(x^4 + x^3 -101*x^2 + 11*x + 2144)*(x^2 -45)^2; T[115,37]=(x -11)*(x^2 + 6*x -36)*(x^4 + 3*x^3 -116*x^2 + 16*x + 2008)*(x^2 -2*x -4)^2; T[115,41]=(x -1)*(x^2 + 6*x -11)*(x^4 -13*x^3 + 45*x^2 -3*x -94)*(x^2 -2*x -19)^2; T[115,43]=(x^2 + 6*x -36)*(x^4 + 6*x^3 -36*x^2 -16*x + 128)*(x )^5; T[115,47]=(x^2 -10*x + 5)*(x^4 -6*x^3 -83*x^2 + 548*x -128)*(x )*(x^2 -5)^2; T[115,53]=(x -11)*(x^4 -19*x^3 -34*x^2 + 2092*x -8776)*(x + 6)^2*(x^2 + 8*x -4)^2; T[115,59]=(x + 13)*(x^2 -80)*(x^4 -23*x^3 + 100*x^2 + 560*x -3136)*(x^2 -4*x -16)^2; T[115,61]=(x + 8)*(x^2 -2*x -124)*(x^4 -56*x^2 + 136*x -32)*(x^2 -4*x -76)^2; T[115,67]=(x -5)*(x^2 -6*x -36)*(x^4 + 3*x^3 -98*x^2 -212*x + 2032)*(x^2 + 10*x + 20)^2; T[115,71]=(x -5)*(x^2 + 8*x + 11)*(x^4 + 3*x^3 -149*x^2 -535*x -8)*(x^2 -20*x + 95)^2; T[115,73]=(x -6)*(x^2 -45)*(x^4 + 32*x^3 + 343*x^2 + 1392*x + 1684)*(x^2 -22*x + 101)^2; T[115,79]=(x + 12)*(x^2 -22*x + 116)*(x^4 -2*x^3 -140*x^2 -352*x + 512)*(x^2 + 4*x -76)^2; T[115,83]=(x -9)*(x^2 + 4*x -16)*(x^4 + 21*x^3 + 96*x^2 -224*x -1216)*(x^2 + 22*x + 116)^2; T[115,89]=(x -4)*(x^2 -10*x + 20)*(x^4 -216*x^2 -1496*x -2752)*(x^2 + 12*x + 16)^2; T[115,97]=(x + 14)*(x^2 -10*x -100)*(x^4 + 18*x^3 + 72*x^2 -200*x -1072)*(x^2 -22*x + 76)^2; T[116,2]=(x + 1)*(x -1)*(x^4 + 2*x^3 + 3*x^2 + 4*x + 4)*(x )^7; T[116,3]=(x -1)*(x -2)*(x + 1)^2*(x + 3)^3*(x^2 -2*x -1)^3; T[116,5]=(x + 2)*(x + 3)^2*(x -3)^2*(x -1)^2*(x + 1)^6; T[116,7]=(x + 4)*(x -4)^2*(x^2 -8)^3*(x + 2)^4; T[116,11]=(x + 6)*(x -3)*(x + 3)^2*(x + 1)^3*(x^2 -2*x -1)^3; T[116,13]=(x -2)*(x + 3)*(x -5)*(x -3)^2*(x + 1)^2*(x^2 + 2*x -7)^3; T[116,17]=(x + 6)*(x -2)^2*(x + 4)^2*(x -8)^2*(x^2 + 4*x -4)^3; T[116,19]=(x -4)*(x + 4)*(x + 6)*(x + 8)^2*(x )^2*(x -6)^6; T[116,23]=(x + 6)^2*(x )^2*(x -4)^3*(x^2 + 4*x -28)^3; T[116,29]=(x -1)^6*(x + 1)^7; T[116,31]=(x + 6)*(x -9)*(x -5)*(x + 3)^2*(x -3)^2*(x^2 -6*x -41)^3; T[116,37]=(x -2)*(x -8)^3*(x + 8)^3*(x + 4)^6; T[116,41]=(x + 8)*(x )*(x + 2)^2*(x -2)^3*(x^2 -8*x -56)^3; T[116,43]=(x + 5)*(x + 1)*(x -10)*(x -7)^2*(x + 11)^2*(x^2 -10*x + 23)^3; T[116,47]=(x + 2)*(x + 3)*(x + 7)*(x -11)^2*(x -13)^2*(x^2 -2*x -17)^3; T[116,53]=(x -3)*(x -10)*(x + 5)*(x + 11)^2*(x -1)^2*(x^2 -2*x -71)^3; T[116,59]=(x -6)*(x + 10)*(x + 4)^2*(x^2 -4*x -28)^3*(x )^3; T[116,61]=(x -2)*(x -4)^2*(x -10)^2*(x + 8)^2*(x^2 + 4*x -4)^3; T[116,67]=(x + 4)^2*(x -8)^2*(x + 12)^3*(x^2 -32)^3; T[116,71]=(x -8)*(x -6)*(x -2)^2*(x + 2)^3*(x^2 + 12*x + 28)^3; T[116,73]=(x + 16)*(x -10)*(x )*(x + 12)^2*(x -4)^8; T[116,79]=(x -11)*(x + 1)*(x + 6)*(x + 7)^2*(x -15)^2*(x^2 + 2*x -1)^3; T[116,83]=(x -16)*(x -4)^2*(x -6)^2*(x )^2*(x^2 -4*x -28)^3; T[116,89]=(x -2)*(x -12)*(x + 12)*(x + 10)^2*(x + 6)^2*(x^2 + 8*x -56)^3; T[116,97]=(x -10)*(x -8)*(x )*(x + 6)^2*(x + 2)^2*(x^2 + 8*x -56)^3; T[117,2]=(x + 1)*(x^2 -3)*(x^2 -2*x -1)*(x -1)^2*(x^2 + 2*x -1)^2; T[117,3]=(x + 1)*(x -1)^2*(x )^8; T[117,5]=(x + 2)*(x -2)^2*(x )^2*(x^2 -8)^3; T[117,7]=(x -2)^2*(x + 4)^3*(x^2 -8)^3; T[117,11]=(x + 4)*(x^2 -12)*(x -2)^2*(x -4)^2*(x + 2)^4; T[117,13]=(x -1)^5*(x + 1)^6; T[117,17]=(x + 2)*(x^2 + 4*x -28)*(x^2 -48)*(x -2)^2*(x^2 -4*x -28)^2; T[117,19]=(x -2)^2*(x^2 -8)^3*(x )^3; T[117,23]=(x^2 -48)*(x -4)^2*(x )^3*(x + 4)^4; T[117,29]=(x -10)*(x^2 -48)*(x + 10)^2*(x + 2)^2*(x -2)^4; T[117,31]=(x -2)^2*(x -4)^3*(x^2 + 8*x + 8)^3; T[117,37]=(x -2)^2*(x + 2)^3*(x^2 + 4*x -28)^3; T[117,41]=(x + 6)*(x^2 -48)*(x^2 + 16*x + 56)*(x -6)^2*(x^2 -16*x + 56)^2; T[117,43]=(x -8)^2*(x + 12)^3*(x^2 -8*x -16)^3; T[117,47]=(x^2 -12*x + 4)*(x^2 -108)*(x^2 + 12*x + 4)^2*(x )^3; T[117,53]=(x + 6)*(x -6)^2*(x -2)^2*(x )^2*(x + 2)^4; T[117,59]=(x + 12)*(x^2 -12)*(x^2 + 4*x -28)*(x -12)^2*(x^2 -4*x -28)^2; T[117,61]=(x + 10)^2*(x + 2)^3*(x^2 -4*x -124)^3; T[117,67]=(x -14)^2*(x + 8)^3*(x^2 -8*x + 8)^3; T[117,71]=(x^2 -12)*(x + 2)^2*(x )^3*(x -2)^4; T[117,73]=(x + 10)^2*(x -2)^3*(x^2 -12*x + 4)^3; T[117,79]=(x + 4)^2*(x -8)^3*(x^2 -128)^3; T[117,83]=(x + 4)*(x^2 -108)*(x^2 -4*x -28)*(x -4)^2*(x^2 + 4*x -28)^2; T[117,89]=(x -2)*(x^2 -48)*(x^2 + 24*x + 136)*(x + 2)^2*(x^2 -24*x + 136)^2; T[117,97]=(x + 10)^2*(x -10)^3*(x^2 + 4*x -28)^3; T[118,2]=(x^10 + x^8 + 2*x^7 + 2*x^6 + 4*x^4 + 8*x^3 + 8*x^2 + 32)*(x + 1)^2*(x -1)^2; T[118,3]=(x + 1)^2*(x -2)^2*(x^5 + 2*x^4 -8*x^3 -11*x^2 + 13*x -1)^2; T[118,5]=(x -1)*(x + 2)*(x -2)*(x + 3)*(x^5 -2*x^4 -14*x^3 + 23*x^2 + 19*x + 1)^2; T[118,7]=(x + 1)*(x -3)*(x + 3)^2*(x^5 -2*x^4 -16*x^3 + 43*x^2 + 13*x -71)^2; T[118,11]=(x + 1)*(x -1)*(x -2)*(x + 2)*(x^5 + 2*x^4 -24*x^3 -24*x^2 + 128*x -64)^2; T[118,13]=(x + 2)*(x + 3)*(x -3)*(x + 6)*(x^5 -8*x^4 + 88*x^2 -48*x -224)^2; T[118,17]=(x -7)*(x + 1)*(x + 2)^2*(x^5 + x^4 -45*x^3 -81*x^2 + 224*x + 412)^2; T[118,19]=(x + 5)*(x + 8)*(x -3)*(x -4)*(x^5 -6*x^4 -28*x^3 + 217*x^2 -167*x -469)^2; T[118,23]=(x -8)*(x )*(x -4)^2*(x^5 + 8*x^4 -88*x^2 -112*x -32)^2; T[118,29]=(x + 5)*(x + 1)*(x -4)*(x + 4)*(x^5 -14*x^4 + 10*x^3 + 389*x^2 -485*x -1757)^2; T[118,31]=(x -2)*(x -10)*(x + 4)^2*(x^5 -116*x^3 + 56*x^2 + 1280*x + 256)^2; T[118,37]=(x + 7)*(x + 12)*(x + 1)*(x -8)*(x^5 -18*x^4 + 80*x^3 + 64*x^2 -592*x + 32)^2; T[118,41]=(x + 11)*(x -5)*(x -7)^2*(x^5 + 10*x^4 -70*x^3 -693*x^2 -93*x + 217)^2; T[118,43]=(x -9)*(x + 9)*(x + 6)^2*(x^5 + 4*x^4 -28*x^3 -56*x^2 + 256*x -128)^2; T[118,47]=(x -10)*(x -2)*(x + 6)*(x + 2)*(x^5 + 20*x^4 + 124*x^3 + 192*x^2 -320*x -256)^2; T[118,53]=(x + 11)*(x -12)*(x -9)*(x )*(x^5 + 10*x^4 -22*x^3 -77*x^2 + 91*x + 73)^2; T[118,59]=(x + 1)^3*(x -1)^11; T[118,61]=(x + 8)*(x + 2)*(x + 12)*(x -10)*(x^5 -22*x^4 + 56*x^3 + 1368*x^2 -8448*x + 11072)^2; T[118,67]=(x + 2)*(x -10)*(x -4)^2*(x^5 -188*x^3 -200*x^2 + 5472*x -8896)^2; T[118,71]=(x -12)*(x -9)*(x + 15)*(x -4)*(x^5 -3*x^4 -77*x^3 + 15*x^2 + 1696*x + 3424)^2; T[118,73]=(x -10)*(x -12)*(x -4)*(x + 14)*(x^5 + 8*x^4 -120*x^3 -1128*x^2 -336*x + 9952)^2; T[118,79]=(x + 15)*(x -5)*(x -11)^2*(x^5 -10*x^4 -60*x^3 + 1005*x^2 -3631*x + 3923)^2; T[118,83]=(x + 14)*(x + 13)*(x -14)*(x + 11)*(x^5 -6*x^4 -260*x^3 + 848*x^2 + 15296*x + 29152)^2; T[118,89]=(x -18)*(x + 6)*(x -4)*(x )*(x^5 -10*x^4 -80*x^3 + 600*x^2 + 1984*x -1984)^2; T[118,97]=(x -2)*(x -8)*(x -14)*(x )*(x^5 + 22*x^4 + 60*x^3 -576*x^2 -352*x + 2656)^2; T[119,2]=(x^4 + x^3 -5*x^2 -x + 3)*(x^5 -2*x^4 -8*x^3 + 14*x^2 + 14*x -17)*(x + 1)^2; T[119,3]=(x^4 -2*x^3 -7*x^2 + 12*x -1)*(x^5 + 2*x^4 -11*x^3 -12*x^2 + 31*x -12)*(x )^2; T[119,5]=(x^4 -2*x^3 -7*x^2 + 4*x + 3)*(x^5 -23*x^3 + 18*x^2 + 131*x -178)*(x + 2)^2; T[119,7]=(x^2 -4*x + 7)*(x -1)^4*(x + 1)^5; T[119,11]=(x^4 -2*x^3 -20*x^2 + 8*x + 48)*(x^5 + 2*x^4 -44*x^3 -40*x^2 + 496*x -192)*(x )^2; T[119,13]=(x^4 -8*x^3 -16*x^2 + 216*x -368)*(x^5 -2*x^4 -40*x^3 + 56*x^2 + 352*x -544)*(x + 2)^2; T[119,17]=(x + 1)^4*(x -1)^7; T[119,19]=(x^4 -10*x^3 -20*x^2 + 392*x -784)*(x^5 -6*x^4 -12*x^3 + 56*x^2 + 48*x -64)*(x + 4)^2; T[119,23]=(x^4 + 6*x^3 -40*x^2 -224*x -240)*(x^5 + 10*x^4 -8*x^3 -144*x^2 + 272*x -128)*(x -4)^2; T[119,29]=(x^4 -2*x^3 -20*x^2 + 8*x + 48)*(x^5 + 8*x^4 -72*x^3 -464*x^2 + 1216*x + 2592)*(x -6)^2; T[119,31]=(x^4 -12*x^3 -13*x^2 + 418*x -917)*(x^5 -33*x^3 -94*x^2 -77*x -16)*(x -4)^2; T[119,37]=(x^4 -6*x^3 -44*x^2 -8*x + 80)*(x^5 -8*x^4 -104*x^3 + 432*x^2 + 3584*x + 4384)*(x + 2)^2; T[119,41]=(x^4 -12*x^3 + 27*x^2 + 86*x -237)*(x^5 -18*x^4 + 79*x^3 -64*x^2 -137*x + 162)*(x + 6)^2; T[119,43]=(x^4 + 12*x^3 -23*x^2 -212*x -115)*(x^5 -8*x^4 -31*x^3 + 216*x^2 + 157*x -1052)*(x -4)^2; T[119,47]=(x^4 -2*x^3 -128*x^2 -64*x + 1776)*(x^5 + 10*x^4 -48*x^3 -816*x^2 -2704*x -2304)*(x )^2; T[119,53]=(x^4 + 26*x^3 + 227*x^2 + 758*x + 801)*(x^5 -4*x^4 -33*x^3 + 76*x^2 + 301*x + 138)*(x -6)^2; T[119,59]=(x^4 + 4*x^3 -192*x^2 -1408*x -768)*(x^5 -8*x^4 -80*x^3 + 640*x^2 + 256*x -3072)*(x + 12)^2; T[119,61]=(x^4 -12*x^3 -157*x^2 + 1330*x + 6451)*(x^5 -22*x^4 + 143*x^3 -40*x^2 -2377*x + 5542)*(x + 10)^2; T[119,67]=(x^4 + 12*x^3 -71*x^2 -548*x + 1949)*(x^5 -16*x^4 + 49*x^3 + 304*x^2 -1747*x + 1868)*(x -4)^2; T[119,71]=(x^4 + 14*x^3 -44*x^2 -1160*x -3312)*(x^5 + 2*x^4 -236*x^3 -872*x^2 + 7472*x + 13696)*(x + 4)^2; T[119,73]=(x^4 -20*x^3 + 123*x^2 -262*x + 131)*(x^5 -10*x^4 -177*x^3 + 2212*x^2 -4217*x -11118)*(x + 6)^2; T[119,79]=(x^4 + 14*x^3 -56*x^2 -928*x -400)*(x^5 -18*x^4 + 40*x^3 + 544*x^2 -2672*x + 3072)*(x -12)^2; T[119,83]=(x^4 + 28*x^3 + 264*x^2 + 968*x + 1200)*(x^5 + 12*x^4 -64*x^3 -952*x^2 -1872*x + 1984)*(x + 4)^2; T[119,89]=(x^4 + 10*x^3 -176*x^2 -592*x + 720)*(x^5 -20*x^4 -100*x^3 + 3552*x^2 -14192*x + 7456)*(x -10)^2; T[119,97]=(x^4 -26*x^3 + 177*x^2 + 4*x -1901)*(x^5 -12*x^4 -239*x^3 + 2766*x^2 + 2163*x + 218)*(x -2)^2; T[120,2]=(x + 1)*(x^2 + x + 2)*(x )^14; T[120,3]=(x^2 + 3)*(x^2 + 2*x + 3)^2*(x -1)^5*(x + 1)^6; T[120,5]=(x^2 + 2*x + 5)*(x -1)^7*(x + 1)^8; T[120,7]=(x -4)*(x -2)^4*(x + 4)^5*(x )^7; T[120,11]=(x -4)^4*(x + 4)^5*(x )^8; T[120,13]=(x -6)*(x + 6)*(x -2)^7*(x + 2)^8; T[120,17]=(x + 2)*(x -6)^3*(x + 6)^5*(x -2)^8; T[120,19]=(x -4)^7*(x + 4)^10; T[120,23]=(x -4)^2*(x + 8)^3*(x -6)^4*(x )^8; T[120,29]=(x + 6)^4*(x -6)^6*(x + 2)^7; T[120,31]=(x + 8)^3*(x + 4)^4*(x -8)^5*(x )^5; T[120,37]=(x + 6)*(x + 2)*(x -6)^4*(x + 10)^4*(x -2)^7; T[120,41]=(x -6)^4*(x -10)^5*(x + 6)^8; T[120,43]=(x -12)*(x + 8)^2*(x + 4)^4*(x + 10)^4*(x -4)^6; T[120,47]=(x -4)^2*(x + 6)^4*(x )^5*(x -8)^6; T[120,53]=(x -10)*(x + 2)^2*(x -6)^3*(x + 10)^4*(x + 6)^7; T[120,59]=(x -4)^2*(x )^4*(x -12)^5*(x + 4)^6; T[120,61]=(x -6)*(x -14)*(x + 10)^3*(x -2)^4*(x + 2)^8; T[120,67]=(x -4)*(x -8)^2*(x -12)^4*(x -2)^4*(x + 4)^6; T[120,71]=(x -8)^3*(x + 8)^4*(x + 12)^4*(x )^6; T[120,73]=(x + 14)*(x + 6)^3*(x -10)^6*(x -2)^7; T[120,79]=(x -16)*(x + 8)^3*(x )^6*(x -8)^7; T[120,83]=(x + 12)*(x + 16)^2*(x + 4)^2*(x -6)^4*(x -12)^8; T[120,89]=(x -2)*(x -10)*(x -18)^3*(x + 6)^12; T[120,97]=(x + 14)^2*(x -2)^15; T[121,2]=(x -2)*(x + 1)*(x -1)*(x )*(x + 2)^2; T[121,3]=(x -2)^2*(x + 1)^4; T[121,5]=(x + 3)*(x -1)^5; T[121,7]=(x )*(x -2)^2*(x + 2)^3; T[121,11]=(x -1)*(x )^5; T[121,13]=(x -1)*(x + 1)*(x + 4)*(x )*(x -4)^2; T[121,17]=(x + 5)*(x -2)*(x -5)*(x )*(x + 2)^2; T[121,19]=(x -6)*(x + 6)*(x )^4; T[121,23]=(x + 9)*(x -2)^2*(x + 1)^3; T[121,29]=(x + 9)*(x -9)*(x )^4; T[121,31]=(x + 5)*(x + 2)^2*(x -7)^3; T[121,37]=(x -7)*(x + 3)^2*(x -3)^3; T[121,41]=(x -8)*(x + 5)*(x -5)*(x )*(x + 8)^2; T[121,43]=(x -6)*(x + 6)^2*(x )^3; T[121,47]=(x + 12)*(x -2)^2*(x -8)^3; T[121,53]=(x -6)*(x -9)^2*(x + 6)^3; T[121,59]=(x + 15)*(x -8)^2*(x -5)^3; T[121,61]=(x -6)*(x + 6)*(x + 12)*(x )*(x -12)^2; T[121,67]=(x -13)*(x -2)^2*(x + 7)^3; T[121,71]=(x -12)^2*(x + 3)^4; T[121,73]=(x -2)*(x + 4)*(x + 2)*(x )*(x -4)^2; T[121,79]=(x )*(x -10)^2*(x + 10)^3; T[121,83]=(x )*(x -6)^2*(x + 6)^3; T[121,89]=(x -15)^3*(x + 9)^3; T[121,97]=(x -17)*(x + 13)^2*(x + 7)^3; T[122,2]=(x^2 + x + 2)*(x^6 -x^5 + 3*x^4 -3*x^3 + 6*x^2 -4*x + 8)*(x + 1)^3*(x -1)^3; T[122,3]=(x^2 -x -3)*(x^3 + x^2 -5*x + 2)*(x^3 -2*x^2 -4*x + 4)^2*(x + 2)^3; T[122,5]=(x -1)*(x^3 -x^2 -12*x + 16)*(x + 3)^2*(x^3 + x^2 -9*x -13)^2*(x )^2; T[122,7]=(x + 5)*(x^2 -5*x + 3)*(x^3 -4*x^2 -10*x + 41)*(x -1)^2*(x^3 + 3*x^2 -x -1)^2; T[122,11]=(x + 3)*(x^2 -2*x -12)*(x^3 + 7*x^2 + 10*x -4)*(x + 5)^2*(x^3 -13*x^2 + 53*x -67)^2; T[122,13]=(x + 3)*(x^2 -6*x -4)*(x^3 + x^2 -6*x -4)*(x -1)^2*(x^3 + 9*x^2 + 11*x -37)^2; T[122,17]=(x^2 + 2*x -12)*(x^3 + 6*x^2 -4*x -16)*(x )*(x -4)^2*(x^3 + 2*x^2 -8*x + 4)^2; T[122,19]=(x^2 -x -29)*(x^3 + 3*x^2 -x -4)*(x )*(x + 4)^2*(x^3 -48*x -20)^2; T[122,23]=(x -5)*(x^2 + 3*x -27)*(x^3 -2*x^2 -38*x + 113)*(x + 9)^2*(x^3 -5*x^2 + 5*x + 1)^2; T[122,29]=(x -6)*(x^2 + 11*x + 27)*(x^3 -x^2 -31*x + 2)*(x + 6)^2*(x^3 -4*x^2 -4*x + 20)^2; T[122,31]=(x^2 + x -3)*(x^3 + 3*x^2 -43*x + 8)*(x^3 + 2*x^2 -76*x + 116)^2*(x )^3; T[122,37]=(x + 12)*(x^2 + 3*x -1)*(x^3 -7*x^2 -65*x + 424)*(x -8)^2*(x^3 + 6*x^2 -36*x -108)^2; T[122,41]=(x + 3)*(x^2 + 9*x -9)*(x^3 -4*x^2 -70*x -139)*(x -5)^2*(x^3 -3*x^2 -61*x + 191)^2; T[122,43]=(x^3 -12*x^2 -16*x + 256)*(x -8)^2*(x^3 + 14*x^2 + 56*x + 68)^2*(x + 8)^3; T[122,47]=(x -12)*(x^2 -8*x -36)*(x^3 + 8*x^2 -28*x -208)*(x -4)^2*(x^3 + 4*x^2 -88*x + 16)^2; T[122,53]=(x + 2)*(x^2 + x -81)*(x^3 -11*x^2 -195*x + 2198)*(x -6)^2*(x^3 + 2*x^2 -12*x -8)^2; T[122,59]=(x + 9)*(x^3 + 23*x^2 + 164*x + 368)*(x -9)^2*(x^3 -29*x^2 + 231*x -325)^2*(x )^2; T[122,61]=(x + 1)^6*(x -1)^8; T[122,67]=(x -7)*(x^2 -52)*(x^3 -21*x^2 + 44*x + 772)*(x + 7)^2*(x^3 -9*x^2 -85*x + 559)^2; T[122,71]=(x + 16)*(x^2 -9*x -9)*(x^3 -27*x^2 + 207*x -432)*(x + 8)^2*(x^3 -14*x^2 -12*x + 92)^2; T[122,73]=(x + 3)*(x^2 -x -29)*(x^3 -22*x^2 + 80*x + 449)*(x + 11)^2*(x^3 + x^2 -45*x -25)^2; T[122,79]=(x -1)*(x^2 + 12*x -16)*(x^3 -3*x^2 -108*x + 432)*(x -3)^2*(x^3 -13*x^2 -51*x + 625)^2; T[122,83]=(x + 12)*(x^2 -9*x -9)*(x^3 + 11*x^2 -85*x -28)*(x -4)^2*(x^3 + 8*x^2 -64*x -256)^2; T[122,89]=(x -12)*(x^2 + 14*x + 36)*(x^3 + 10*x^2 -76*x + 112)*(x + 4)^2*(x^3 + 4*x^2 -56*x + 80)^2; T[122,97]=(x -2)*(x^2 -17*x -9)*(x^3 + 5*x^2 -7*x + 2)*(x + 14)^2*(x^3 -10*x^2 -116*x + 1096)^2; T[123,2]=(x + 2)*(x^2 -2)*(x^3 -x^2 -4*x + 2)*(x )*(x^3 + x^2 -5*x -1)^2; T[123,3]=(x^6 + 5*x^4 + 2*x^3 + 15*x^2 + 27)*(x -1)^3*(x + 1)^4; T[123,5]=(x + 2)*(x + 4)*(x^2 -4*x + 2)*(x^3 -4*x^2 -2*x + 4)*(x^3 + 2*x^2 -4*x -4)^2; T[123,7]=(x + 4)*(x + 2)*(x^2 + 4*x + 2)*(x^3 -2*x^2 -14*x + 32)*(x^3 -6*x^2 + 8*x -2)^2; T[123,11]=(x + 3)*(x -5)*(x^2 -2*x -1)*(x^3 + 4*x^2 + x -4)*(x^3 -2*x^2 -20*x + 50)^2; T[123,13]=(x + 6)*(x + 4)*(x^2 -4*x -14)*(x^3 -8*x^2 + 14*x + 4)*(x^3 + 2*x^2 -12*x -8)^2; T[123,17]=(x -3)*(x + 5)*(x^2 -2*x -1)*(x^3 -2*x^2 -23*x + 62)*(x + 2)^6; T[123,19]=(x + 2)*(x^2 + 8*x + 14)*(x^3 -2*x^2 -6*x + 8)*(x )*(x^3 -4*x^2 -16*x -10)^2; T[123,23]=(x -4)*(x + 6)*(x^2 -2)*(x^3 + 10*x^2 + 26*x + 16)*(x^3 -4*x^2 -32*x -32)^2; T[123,29]=(x -1)*(x -5)*(x^2 -2*x -49)*(x^3 + 6*x^2 -27*x -86)*(x^3 + 6*x^2 -4*x -40)^2; T[123,31]=(x -7)*(x + 5)*(x^3 + 2*x^2 -91*x -256)*(x + 3)^2*(x^3 -16*x^2 + 64*x -32)^2; T[123,37]=(x^2 + 2*x -71)*(x^3 -20*x^2 + 117*x -166)*(x + 7)^2*(x^3 + 6*x^2 -36*x -108)^2; T[123,41]=(x + 1)^3*(x -1)^10; T[123,43]=(x -7)*(x + 1)*(x^3 -10*x^2 -119*x + 1156)*(x + 5)^2*(x^3 + 4*x^2 -8*x -16)^2; T[123,47]=(x -7)*(x -3)*(x^2 -18*x + 79)*(x^3 -4*x^2 -35*x -8)*(x^3 -120*x -502)^2; T[123,53]=(x + 6)*(x + 14)*(x^2 -8*x + 8)*(x^3 -14*x^2 + 32)*(x^3 -6*x^2 -4*x + 8)^2; T[123,59]=(x + 12)*(x^2 -72)*(x^3 + 8*x^2 -40*x + 32)*(x )*(x^3 + 8*x^2 -16*x -160)^2; T[123,61]=(x^2 -2*x -31)*(x^3 + 8*x^2 + 5*x -46)*(x + 3)^2*(x^3 -2*x^2 -52*x + 184)^2; T[123,67]=(x^2 -4*x -68)*(x^3 -12*x^2 -124*x + 976)*(x + 2)^2*(x^3 + 2*x^2 -20*x -50)^2; T[123,71]=(x^2 -6*x -41)*(x^3 + 32*x^2 + 337*x + 1168)*(x + 3)^2*(x^3 -20*x^2 + 84*x + 134)^2; T[123,73]=(x -13)*(x + 11)*(x^2 -2*x -127)*(x^3 -4*x^2 -99*x + 454)*(x^3 + 2*x^2 -180*x + 244)^2; T[123,79]=(x + 2)*(x -10)*(x^2 + 4*x -28)*(x^3 + 20*x^2 + 68*x + 32)*(x^3 -32*x^2 + 328*x -1090)^2; T[123,83]=(x + 16)*(x + 2)*(x^2 + 12*x -14)*(x^3 + 14*x^2 + 10*x -296)*(x^3 -64*x -128)^2; T[123,89]=(x -18)*(x + 10)*(x^2 + 12*x + 4)*(x^3 -14*x^2 -4*x + 184)*(x^3 + 6*x^2 -148*x -920)^2; T[123,97]=(x + 14)*(x + 12)*(x^2 -24*x + 126)*(x^3 + 12*x^2 + 14*x -148)*(x^3 -6*x^2 -52*x + 248)^2; T[124,2]=(x -1)*(x^4 -x^3 + 3*x^2 -2*x + 4)*(x + 1)^2*(x )^7; T[124,3]=(x + 2)*(x^2 -2*x -2)^2*(x^2 + 2*x -4)^3*(x )^3; T[124,5]=(x + 3)*(x + 2)^2*(x^2 -12)^2*(x -1)^7; T[124,7]=(x + 1)*(x -3)*(x )^2*(x^2 + 4*x -1)^3*(x -2)^4; T[124,11]=(x + 6)*(x -6)*(x^2 + 6*x + 6)^2*(x )^2*(x -2)^6; T[124,13]=(x + 4)*(x^2 + 2*x -26)^2*(x -2)^3*(x^2 + 2*x -4)^3; T[124,17]=(x -6)*(x )*(x + 6)^2*(x^2 -12)^2*(x^2 -6*x + 4)^3; T[124,19]=(x + 1)*(x + 5)*(x -4)^2*(x^2 -5)^3*(x + 4)^4; T[124,23]=(x + 6)*(x + 4)*(x -8)^2*(x^2 + 2*x -44)^3*(x )^4; T[124,29]=(x )*(x^2 + 6*x -18)^2*(x -2)^3*(x^2 -10*x + 20)^3; T[124,31]=(x + 1)^3*(x -1)^11; T[124,37]=(x + 10)*(x -10)^2*(x^2 -10*x -2)^2*(x + 2)^7; T[124,41]=(x + 6)^2*(x + 9)^2*(x^2 -12*x + 24)^2*(x -7)^6; T[124,43]=(x -2)*(x^2 + 2*x -26)^2*(x -8)^3*(x^2 + 2*x -4)^3; T[124,47]=(x -4)*(x )*(x + 8)^2*(x^2 + 4*x -16)^3*(x -6)^4; T[124,53]=(x -12)*(x )*(x + 6)^2*(x^2 -6*x + 6)^2*(x^2 + 12*x + 16)^3; T[124,59]=(x -9)*(x + 3)*(x + 12)^2*(x^2 + 12*x + 24)^2*(x^2 -5)^3; T[124,61]=(x + 10)*(x -12)*(x + 6)^2*(x^2 + 2*x -26)^2*(x^2 + 6*x -116)^3; T[124,67]=(x + 4)*(x + 12)^3*(x -8)^10; T[124,71]=(x -5)*(x + 15)*(x -8)^2*(x^2 -192)^2*(x^2 -4*x -121)^3; T[124,73]=(x -14)*(x + 14)*(x -10)^2*(x^2 -8*x -4)^3*(x + 10)^4; T[124,79]=(x -10)*(x -8)*(x + 8)^2*(x^2 -4*x -104)^2*(x^2 + 10*x -20)^3; T[124,83]=(x -6)*(x -2)*(x -8)^2*(x^2 -6*x -66)^2*(x^2 + 12*x -44)^3; T[124,89]=(x -12)*(x + 6)^2*(x^2 -10*x -20)^3*(x -6)^5; T[124,97]=(x + 7)^2*(x -2)^2*(x^2 -4*x -104)^2*(x^2 + 14*x -31)^3; T[125,2]=(x^2 + x -1)*(x^2 -x -1)*(x^4 -8*x^2 + 11); T[125,3]=(x^2 -3*x + 1)*(x^2 + 3*x + 1)*(x^4 -7*x^2 + 11); T[125,5]=(x )^8; T[125,7]=(x^4 -13*x^2 + 11)*(x + 3)^2*(x -3)^2; T[125,11]=(x + 3)^4*(x -2)^4; T[125,13]=(x^2 + 3*x -9)*(x^2 -3*x -9)*(x^4 -32*x^2 + 176); T[125,17]=(x^2 + 4*x -1)*(x^2 -4*x -1)*(x^4 -28*x^2 + 176); T[125,19]=(x^2 + 5*x + 5)^2*(x^2 -10*x + 20)^2; T[125,23]=(x^2 -2*x -4)*(x^2 + 2*x -4)*(x^4 -17*x^2 + 11); T[125,29]=(x^2 -45)^2*(x^2 + 5*x -5)^2; T[125,31]=(x^2 + x -31)^2*(x -2)^4; T[125,37]=(x^2 + 6*x -36)*(x^2 -6*x -36)*(x^4 -68*x^2 + 176); T[125,41]=(x^2 + x -31)^2*(x + 3)^4; T[125,43]=(x^4 -107*x^2 + 1331)*(x -9)^2*(x + 9)^2; T[125,47]=(x^2 -x -61)*(x^2 + x -61)*(x^4 -43*x^2 + 11); T[125,53]=(x^2 -7*x + 11)*(x^2 + 7*x + 11)*(x^4 -112*x^2 + 2816); T[125,59]=(x^2 -15*x + 45)^2*(x^2 -20)^2; T[125,61]=(x^2 + x -31)^4; T[125,67]=(x^2 + 21*x + 99)*(x^2 -21*x + 99)*(x^4 -28*x^2 + 176); T[125,71]=(x^2 + 6*x -116)^2*(x + 3)^4; T[125,73]=(x^2 -3*x -9)*(x^2 + 3*x -9)*(x^4 -352*x^2 + 21296); T[125,79]=(x^2 -10*x + 20)^2*(x^2 -10*x + 5)^2; T[125,83]=(x^2 + 8*x -4)*(x^2 -8*x -4)*(x^4 -77*x^2 + 1331); T[125,89]=(x^2 -180)^2*(x^2 + 15*x + 55)^2; T[125,97]=(x^2 -9*x + 9)*(x^2 + 9*x + 9)*(x^4 -128*x^2 + 176); T[126,2]=(x^2 -x + 2)*(x^4 + x^2 + 4)*(x^2 + x + 2)^2*(x -1)^3*(x + 1)^4; T[126,3]=(x + 1)*(x^2 + 2*x + 3)*(x -1)^2*(x )^12; T[126,5]=(x^2 -12)^2*(x -2)^3*(x )^4*(x + 2)^6; T[126,7]=(x -1)^8*(x + 1)^9; T[126,11]=(x^2 -12)^2*(x + 4)^4*(x )^4*(x -4)^5; T[126,13]=(x -6)^3*(x + 4)^4*(x -2)^4*(x + 2)^6; T[126,17]=(x + 2)*(x -2)^2*(x^2 -12)^2*(x + 6)^5*(x -6)^5; T[126,19]=(x -2)^4*(x -4)^6*(x + 4)^7; T[126,23]=(x + 8)*(x -8)^2*(x^2 -12)^2*(x )^10; T[126,29]=(x -6)*(x + 6)^3*(x -2)^3*(x )^4*(x + 2)^6; T[126,31]=(x + 4)^8*(x )^9; T[126,37]=(x + 10)^3*(x -6)^6*(x -2)^8; T[126,41]=(x + 2)^2*(x^2 -108)^2*(x + 6)^3*(x -6)^4*(x -2)^4; T[126,43]=(x -8)^4*(x + 4)^13; T[126,47]=(x -12)*(x^2 -48)^2*(x + 12)^3*(x )^9; T[126,53]=(x^2 -48)^2*(x + 6)^4*(x -6)^9; T[126,59]=(x + 4)*(x -6)*(x + 12)^2*(x -4)^2*(x^2 -48)^2*(x + 6)^3*(x -12)^4; T[126,61]=(x -6)^3*(x -8)^4*(x + 10)^4*(x + 2)^6; T[126,67]=(x + 4)^8*(x -4)^9; T[126,71]=(x + 8)*(x -8)^2*(x^2 -108)^2*(x )^10; T[126,73]=(x -10)^3*(x -2)^4*(x -14)^4*(x + 6)^6; T[126,79]=(x )^3*(x + 16)^6*(x -8)^8; T[126,83]=(x -4)*(x -6)*(x + 4)^2*(x -12)^2*(x + 6)^3*(x + 12)^4*(x )^4; T[126,89]=(x -14)^2*(x -6)^2*(x^2 -12)^2*(x + 14)^4*(x + 6)^5; T[126,97]=(x + 14)^3*(x + 10)^4*(x -14)^4*(x -18)^6; T[127,2]=(x^3 + 3*x^2 -3)*(x^7 -2*x^6 -8*x^5 + 15*x^4 + 17*x^3 -28*x^2 -11*x + 15); T[127,3]=(x^3 + 3*x^2 -3)*(x^7 -3*x^6 -12*x^5 + 39*x^4 + 26*x^3 -128*x^2 + 64*x + 16); T[127,5]=(x^3 + 6*x^2 + 9*x + 1)*(x^7 -8*x^6 + 11*x^5 + 53*x^4 -146*x^3 + 32*x^2 + 128*x -48); T[127,7]=(x^3 + 3*x^2 -3)*(x^7 + 3*x^6 -20*x^5 -41*x^4 + 114*x^3 + 64*x^2 -112*x -16); T[127,11]=(x^3 -21*x -37)*(x^7 -28*x^5 -17*x^4 + 88*x^3 -37*x^2 -5*x + 3); T[127,13]=(x^3 + 3*x^2 -18*x -37)*(x^7 + x^6 -69*x^5 -38*x^4 + 1515*x^3 + 52*x^2 -10416*x + 5383); T[127,17]=(x^3 + 18*x^2 + 105*x + 199)*(x^7 -24*x^6 + 200*x^5 -467*x^4 -2678*x^3 + 19593*x^2 -45913*x + 38235); T[127,19]=(x^3 -3*x^2 + 1)*(x^7 + 5*x^6 -51*x^5 -206*x^4 + 685*x^3 + 1582*x^2 -2664*x + 853); T[127,23]=(x^3 + 9*x^2 + 18*x -9)*(x^7 + x^6 -74*x^5 -279*x^4 + 812*x^3 + 6344*x^2 + 12376*x + 8016); T[127,29]=(x^3 -3*x^2 -18*x + 3)*(x^7 + 7*x^6 -72*x^5 -359*x^4 + 1612*x^3 + 2512*x^2 -5368*x -5520); T[127,31]=(x^3 -12*x^2 + 27*x -17)*(x^7 + 8*x^6 -68*x^5 -465*x^4 + 648*x^3 + 3651*x^2 -229*x -2845); T[127,37]=(x^3 -84*x + 296)*(x^7 + 6*x^6 -81*x^5 -550*x^4 + 981*x^3 + 11180*x^2 + 16084*x -920); T[127,41]=(x^3 + 12*x^2 -192)*(x^7 -14*x^6 + 23*x^5 + 494*x^4 -3199*x^3 + 8072*x^2 -9296*x + 4032); T[127,43]=(x^3 + 9*x^2 -81*x -513)*(x^7 + x^6 -99*x^5 + 287*x^4 + 1374*x^3 -6236*x^2 + 2296*x + 10096); T[127,47]=(x^3 + 3*x^2 -81*x -379)*(x^7 -25*x^6 + 100*x^5 + 1920*x^4 -16340*x^3 -12320*x^2 + 439559*x -1046391); T[127,53]=(x^3 -3*x^2 -126*x + 57)*(x^7 -29*x^6 + 142*x^5 + 2659*x^4 -28158*x^3 + 43804*x^2 + 283688*x -755376); T[127,59]=(x^3 -21*x + 37)*(x^7 + 12*x^6 -233*x^5 -3351*x^4 + 6446*x^3 + 206960*x^2 + 572048*x -339120); T[127,61]=(x^3 + 3*x^2 -153*x -307)*(x^7 -7*x^6 -96*x^5 + 522*x^4 + 2454*x^3 -6956*x^2 -9711*x + 3625); T[127,67]=(x^3 + 3*x^2 -1)*(x^7 + 25*x^6 + 26*x^5 -3183*x^4 -15628*x^3 + 90672*x^2 + 534864*x -64784); T[127,71]=(x^3 -3*x^2 -153*x + 867)*(x^7 -7*x^6 -228*x^5 + 1424*x^4 + 9756*x^3 -79912*x^2 + 161143*x -84633); T[127,73]=(x^3 -3*x^2 -114*x + 269)*(x^7 -13*x^6 -161*x^5 + 2198*x^4 + 2483*x^3 -58764*x^2 + 8644*x + 17401); T[127,79]=(x^3 -9*x^2 -120*x + 71)*(x^7 + 23*x^6 -7*x^5 -3470*x^4 -19855*x^3 + 84554*x^2 + 916400*x + 1841711); T[127,83]=(x^3 -12*x^2 -225*x + 2649)*(x^7 -26*x^6 -9*x^5 + 4299*x^4 -20636*x^3 -111104*x^2 + 542920*x + 16464); T[127,89]=(x^3 + 33*x^2 + 306*x + 597)*(x^7 -13*x^6 -12*x^5 + 431*x^4 + 62*x^3 -2296*x^2 + 1184*x + 432); T[127,97]=(x^3 + 15*x^2 -6*x -37)*(x^7 + 5*x^6 -280*x^5 -1263*x^4 + 14750*x^3 + 41452*x^2 -172648*x -12656); T[128,2]=(x )^9; T[128,3]=(x + 2)^2*(x -2)^2*(x )^5; T[128,5]=(x -2)^4*(x + 2)^5; T[128,7]=(x -4)^2*(x + 4)^2*(x )^5; T[128,11]=(x -2)^2*(x + 2)^2*(x )^5; T[128,13]=(x + 2)^2*(x -2)^2*(x + 6)^2*(x -6)^3; T[128,17]=(x + 2)^4*(x -2)^5; T[128,19]=(x -2)^2*(x + 2)^2*(x )^5; T[128,23]=(x -4)^2*(x + 4)^2*(x )^5; T[128,29]=(x -6)^2*(x -10)^2*(x + 6)^2*(x + 10)^3; T[128,31]=(x )^9; T[128,37]=(x -2)^2*(x + 10)^2*(x -10)^2*(x + 2)^3; T[128,41]=(x + 6)^4*(x -10)^5; T[128,43]=(x -6)^2*(x + 6)^2*(x )^5; T[128,47]=(x -8)^2*(x + 8)^2*(x )^5; T[128,53]=(x -6)^2*(x + 6)^2*(x + 14)^2*(x -14)^3; T[128,59]=(x -14)^2*(x + 14)^2*(x )^5; T[128,61]=(x -2)^2*(x -10)^2*(x + 2)^2*(x + 10)^3; T[128,67]=(x + 10)^2*(x -10)^2*(x )^5; T[128,71]=(x + 12)^2*(x -12)^2*(x )^5; T[128,73]=(x -14)^4*(x + 6)^5; T[128,79]=(x + 8)^2*(x -8)^2*(x )^5; T[128,83]=(x -6)^2*(x + 6)^2*(x )^5; T[128,89]=(x + 2)^4*(x -10)^5; T[128,97]=(x + 2)^4*(x -18)^5; T[129,2]=(x -1)*(x^2 -2*x -1)*(x^3 + 2*x^2 -5*x -8)*(x )*(x + 2)^2*(x^2 -2)^2; T[129,3]=(x^2 + 2*x + 3)*(x^4 + 4*x^2 + 9)*(x + 1)^3*(x -1)^4; T[129,5]=(x -2)*(x + 2)*(x^2 -2*x -1)*(x^3 + 4*x^2 -x -2)*(x + 4)^2*(x^2 -4*x + 2)^2; T[129,7]=(x + 2)*(x^2 -2*x -7)*(x^3 -4*x^2 -3*x + 10)*(x^2 + 4*x + 2)^2*(x )^3; T[129,11]=(x + 5)*(x^2 -6*x + 7)*(x^3 -x^2 -19*x -25)*(x )*(x -3)^2*(x^2 + 2*x -7)^2; T[129,13]=(x + 2)*(x^2 -2*x -7)^2*(x -3)^4*(x + 5)^4; T[129,17]=(x + 6)*(x^2 + 4*x -4)*(x^3 -x^2 -8*x + 4)*(x^2 -10*x + 17)^2*(x + 3)^3; T[129,19]=(x -4)*(x -2)*(x^2 + 2*x -31)*(x^3 + 4*x^2 -19*x -2)*(x + 2)^2*(x^2 + 4*x -4)^2; T[129,23]=(x + 4)*(x^3 -11*x^2 -32*x + 452)*(x -6)^2*(x^2 -2*x -31)^2*(x + 1)^3; T[129,29]=(x^2 -6*x -9)*(x^3 -2*x^2 -5*x + 8)*(x )*(x^2 -18)^2*(x + 6)^3; T[129,31]=(x -8)*(x + 5)*(x^3 + 5*x^2 -16*x -64)*(x -4)^2*(x + 1)^2*(x + 3)^4; T[129,37]=(x -6)*(x -8)*(x^2 + 8*x + 8)*(x^3 -40*x + 64)*(x^2 -72)^2*(x )^2; T[129,41]=(x + 7)*(x -2)*(x^2 -32)*(x^3 + 15*x^2 + 32*x -32)*(x -5)^2*(x^2 + 2*x -7)^2; T[129,43]=(x -1)^6*(x + 1)^7; T[129,47]=(x + 8)*(x^2 + 2*x -97)*(x^3 + 2*x^2 -133*x -664)*(x -4)^3*(x -6)^4; T[129,53]=(x + 2)*(x -3)*(x^2 -128)*(x^3 + 5*x^2 -16*x -64)*(x + 5)^2*(x^2 -22*x + 113)^2; T[129,59]=(x -12)*(x^2 -4*x -124)*(x^3 -8*x^2 -12*x + 80)*(x )*(x + 12)^2*(x^2 + 4*x -4)^2; T[129,61]=(x + 8)*(x -14)*(x^2 + 8*x + 8)*(x^3 + 16*x^2 + 8*x -512)*(x -2)^2*(x^2 -8*x -2)^2; T[129,67]=(x -12)*(x + 15)*(x^2 + 12*x -36)*(x^3 + 11*x^2 -80*x -332)*(x + 3)^2*(x^2 -2*x -71)^2; T[129,71]=(x + 14)*(x -8)*(x^2 -12*x + 28)*(x^3 -22*x^2 + 84*x + 424)*(x -2)^2*(x^2 + 12*x + 28)^2; T[129,73]=(x -12)*(x^2 -4*x -28)*(x^3 + 16*x^2 + 52*x -16)*(x^2 + 24*x + 126)^2*(x -2)^3; T[129,79]=(x + 16)*(x^2 -8*x -56)*(x^3 -24*x^2 + 152*x -256)*(x^2 -4*x -4)^2*(x + 8)^3; T[129,83]=(x^2 + 14*x + 47)*(x^3 + 7*x^2 -79*x -485)*(x )*(x^2 -18*x + 49)^2*(x -15)^3; T[129,89]=(x -14)*(x -10)*(x^2 -72)*(x^3 + 38*x^2 + 456*x + 1744)*(x + 4)^2*(x^2 + 12*x + 18)^2; T[129,97]=(x + 14)*(x -11)*(x^3 -x^2 -77*x + 277)*(x -7)^2*(x^2 + 2*x -7)^3; T[130,2]=(x^4 + 2*x^3 + 3*x^2 + 4*x + 4)*(x^2 + x + 2)*(x^4 + x^2 + 4)*(x + 1)^3*(x -1)^4; T[130,3]=(x -2)*(x )*(x + 3)^2*(x -1)^2*(x^2 -2)^2*(x^2 -2*x -2)^2*(x + 2)^3; T[130,5]=(x^2 + 3*x + 5)*(x^2 + x + 5)*(x -1)^6*(x + 1)^7; T[130,7]=(x )*(x -1)^2*(x + 1)^2*(x^2 -4*x -4)^2*(x -2)^4*(x + 4)^4; T[130,11]=(x + 6)*(x )*(x -6)^2*(x -2)^2*(x^2 + 6*x + 6)^2*(x^2 -4*x + 2)^2*(x + 2)^3; T[130,13]=(x -1)^8*(x + 1)^9; T[130,17]=(x + 6)*(x^2 + 4*x -4)^2*(x^2 -12)^2*(x -2)^4*(x + 3)^4; T[130,19]=(x + 8)*(x + 6)^2*(x^2 -4*x + 2)^2*(x^2 + 2*x -26)^2*(x -2)^3*(x -6)^3; T[130,23]=(x + 6)^2*(x -6)^2*(x^2 -6*x + 6)^2*(x^2 -2)^2*(x )^2*(x + 4)^3; T[130,29]=(x + 2)*(x + 6)*(x -6)^2*(x^2 + 12*x + 24)^2*(x^2 -32)^2*(x -2)^5; T[130,31]=(x + 6)*(x -2)*(x -4)^2*(x + 10)^2*(x^2 -12*x + 18)^2*(x^2 -10*x -2)^2*(x + 4)^3; T[130,37]=(x -6)*(x -2)*(x -3)^2*(x + 7)^2*(x^2 -72)^2*(x + 2)^3*(x + 4)^4; T[130,41]=(x -10)^2*(x^2 -12)^2*(x^2 + 12*x + 28)^2*(x + 6)^3*(x )^4; T[130,43]=(x -2)*(x + 10)*(x )*(x + 1)^2*(x -10)^2*(x + 5)^2*(x^2 -10*x -2)^2*(x^2 + 8*x -34)^2; T[130,47]=(x -8)*(x -4)^2*(x -3)^2*(x -13)^2*(x + 12)^2*(x^2 + 4*x -4)^2*(x -6)^4; T[130,53]=(x -6)^2*(x -12)^2*(x^2 -108)^2*(x^2 + 12*x -36)^2*(x )^2*(x -2)^3; T[130,59]=(x -10)*(x -8)*(x + 6)^2*(x + 10)^2*(x^2 -12*x + 18)^2*(x^2 + 6*x -138)^2*(x -6)^3; T[130,61]=(x + 2)*(x -8)^2*(x^2 -4*x -104)^2*(x -2)^4*(x + 8)^6; T[130,67]=(x -4)*(x + 12)*(x -14)^2*(x^2 + 8*x -92)^2*(x + 4)^3*(x + 2)^6; T[130,71]=(x + 12)*(x -10)*(x + 6)*(x -6)^2*(x + 5)^2*(x + 3)^2*(x^2 -6*x + 6)^2*(x^2 -4*x -94)^2; T[130,73]=(x + 6)^2*(x -2)^2*(x -10)^2*(x^2 -72)^2*(x + 10)^3*(x + 4)^4; T[130,79]=(x + 8)*(x -8)^2*(x + 12)^2*(x^2 -4*x -104)^2*(x^2 -72)^2*(x + 4)^4; T[130,83]=(x + 16)^2*(x^2 + 12*x + 28)^2*(x -12)^3*(x + 6)^4*(x )^4; T[130,89]=(x + 14)*(x -10)*(x -2)^2*(x^2 + 12*x -12)^2*(x + 6)^3*(x -6)^6; T[130,97]=(x + 14)*(x + 10)^2*(x + 2)^2*(x^2 + 4*x -28)^2*(x -14)^3*(x -2)^5; T[131,2]=(x^10 -18*x^8 + 2*x^7 + 111*x^6 -18*x^5 -270*x^4 + 28*x^3 + 232*x^2 + 16*x -32)*(x ); T[131,3]=(x + 1)*(x^10 -x^9 -22*x^8 + 24*x^7 + 157*x^6 -184*x^5 -403*x^4 + 533*x^3 + 222*x^2 -390*x + 67); T[131,5]=(x + 2)*(x^10 -4*x^9 -26*x^8 + 116*x^7 + 155*x^6 -988*x^5 + 138*x^4 + 2384*x^3 -763*x^2 -1856*x + 8); T[131,7]=(x + 1)*(x^10 -x^9 -46*x^8 + 36*x^7 + 701*x^6 -376*x^5 -3971*x^4 + 929*x^3 + 7566*x^2 + 738*x -1213); T[131,11]=(x^10 -2*x^9 -48*x^8 + 76*x^7 + 829*x^6 -1032*x^5 -6248*x^4 + 6058*x^3 + 19601*x^2 -12860*x -17852)*(x ); T[131,13]=(x + 3)*(x^10 -11*x^9 -4*x^8 + 386*x^7 -1069*x^6 -1056*x^5 + 5897*x^4 -2717*x^3 -6108*x^2 + 4764*x -31); T[131,17]=(x -4)*(x^10 + 2*x^9 -82*x^8 -132*x^7 + 1656*x^6 + 176*x^5 -11104*x^4 + 12032*x^3 + 5376*x^2 -9216*x + 2048); T[131,19]=(x + 2)*(x^10 -110*x^8 -136*x^7 + 4152*x^6 + 9248*x^5 -56832*x^4 -170752*x^3 + 150656*x^2 + 614400*x + 64000); T[131,23]=(x + 2)*(x^10 + 10*x^9 -46*x^8 -772*x^7 -1368*x^6 + 11376*x^5 + 52416*x^4 + 71360*x^3 + 18304*x^2 -10240*x + 512); T[131,29]=(x^10 -16*x^9 -28*x^8 + 1560*x^7 -5216*x^6 -32224*x^5 + 193344*x^4 -105856*x^3 -788224*x^2 + 921600*x + 40960)*(x ); T[131,31]=(x + 2)*(x^10 -6*x^9 -138*x^8 + 1140*x^7 + 3776*x^6 -58816*x^5 + 117184*x^4 + 545472*x^3 -2745856*x^2 + 4174336*x -2020864); T[131,37]=(x + 8)*(x^10 -34*x^9 + 346*x^8 + 732*x^7 -38944*x^6 + 258400*x^5 -107200*x^4 -6420928*x^3 + 33150976*x^2 -69950464*x + 55889408); T[131,41]=(x + 3)*(x^10 + 13*x^9 -100*x^8 -1474*x^7 + 2451*x^6 + 42952*x^5 -63507*x^4 -418677*x^3 + 956032*x^2 -92192*x -544027); T[131,43]=(x -3)*(x^10 -9*x^9 -270*x^8 + 1512*x^7 + 28413*x^6 -43240*x^5 -1200559*x^4 -2158907*x^3 + 6257138*x^2 + 9962386*x -13498661); T[131,47]=(x -10)*(x^10 + 6*x^9 -218*x^8 -1764*x^7 + 10960*x^6 + 131328*x^5 + 39840*x^4 -2784384*x^3 -7409920*x^2 + 4899584*x + 25248256); T[131,53]=(x + 9)*(x^10 -30*x^9 + 263*x^8 -36*x^7 -7753*x^6 + 10242*x^5 + 90377*x^4 -48288*x^3 -420568*x^2 -300576*x -57328); T[131,59]=(x -1)*(x^10 + 5*x^9 -202*x^8 -968*x^7 + 12461*x^6 + 62456*x^5 -226347*x^4 -1328161*x^3 -406374*x^2 + 2689190*x -272185); T[131,61]=(x + 15)*(x^10 -51*x^9 + 984*x^8 -8138*x^7 + 11247*x^6 + 250360*x^5 -1330639*x^4 -134629*x^3 + 12807464*x^2 -11246072*x -32394611); T[131,67]=(x + 6)*(x^10 + 10*x^9 -112*x^8 -928*x^7 + 3680*x^6 + 25312*x^5 -35136*x^4 -234752*x^3 + 62976*x^2 + 643072*x + 217088); T[131,71]=(x -10)*(x^10 -324*x^8 + 384*x^7 + 34224*x^6 -69184*x^5 -1337408*x^4 + 3824384*x^3 + 13857024*x^2 -56783872*x + 43725824); T[131,73]=(x -4)*(x^10 + 14*x^9 -380*x^8 -4408*x^7 + 60080*x^6 + 453504*x^5 -4729728*x^4 -13659648*x^3 + 151739392*x^2 -151855104*x -45719552); T[131,79]=(x + 8)*(x^10 -24*x^9 -128*x^8 + 6952*x^7 -28016*x^6 -531776*x^5 + 4428032*x^4 + 4148736*x^3 -141518848*x^2 + 468480000*x -467968000); T[131,83]=(x -4)*(x^10 + 22*x^9 -4*x^8 -2808*x^7 -13248*x^6 + 68384*x^5 + 442432*x^4 -380672*x^3 -3799808*x^2 -1224704*x + 5208064); T[131,89]=(x + 11)*(x^10 -14*x^9 -305*x^8 + 4212*x^7 + 17431*x^6 -272542*x^5 + 383169*x^4 + 1705112*x^3 -1486936*x^2 -5165760*x -2616560); T[131,97]=(x -12)*(x^10 -4*x^9 -506*x^8 + 2096*x^7 + 71320*x^6 -306768*x^5 -2406528*x^4 + 11060160*x^3 -12157824*x^2 + 910592*x + 1846784); T[132,2]=(x + 1)*(x^2 -x + 2)*(x -1)^2*(x^2 + 2*x + 2)^2*(x )^10; T[132,3]=(x^2 -x + 3)*(x^2 + x + 3)^3*(x -1)^5*(x + 1)^6; T[132,5]=(x + 3)^2*(x + 4)^2*(x )^2*(x + 2)^3*(x -2)^4*(x -1)^6; T[132,7]=(x + 4)^2*(x -4)^3*(x -2)^5*(x + 2)^9; T[132,11]=(x + 1)^7*(x -1)^12; T[132,13]=(x -6)*(x + 6)^2*(x + 2)^4*(x + 4)^4*(x -4)^8; T[132,17]=(x + 4)*(x -4)*(x -2)^2*(x + 6)^2*(x -6)^2*(x + 2)^11; T[132,19]=(x + 2)*(x + 6)*(x -4)^2*(x -8)^2*(x + 4)^2*(x )^11; T[132,23]=(x + 8)*(x )*(x -4)^2*(x -6)^2*(x + 6)^2*(x + 3)^2*(x -8)^3*(x + 1)^6; T[132,29]=(x + 8)*(x -10)^2*(x + 6)^3*(x -6)^4*(x )^9; T[132,31]=(x -5)^2*(x -8)^2*(x )^3*(x + 8)^6*(x -7)^6; T[132,37]=(x -10)*(x + 6)*(x + 2)^2*(x + 10)^2*(x + 1)^2*(x -6)^5*(x -3)^6; T[132,41]=(x -8)*(x + 6)^2*(x -2)^2*(x -6)^2*(x + 2)^3*(x )^3*(x + 8)^6; T[132,43]=(x -10)*(x + 2)*(x -8)^2*(x + 10)^2*(x )^3*(x -4)^4*(x + 6)^6; T[132,47]=(x + 8)*(x + 12)^2*(x + 6)^2*(x + 2)^2*(x )^3*(x -8)^9; T[132,53]=(x + 2)*(x -14)*(x -2)^2*(x -4)^2*(x )^2*(x -6)^3*(x + 6)^8; T[132,59]=(x + 12)*(x -3)^2*(x -12)^3*(x + 4)^3*(x )^4*(x -5)^6; T[132,61]=(x -10)*(x -8)^2*(x + 8)^2*(x + 4)^2*(x -6)^3*(x + 14)^3*(x -12)^6; T[132,67]=(x -12)*(x + 1)^2*(x + 12)^2*(x -4)^3*(x + 4)^5*(x + 7)^6; T[132,71]=(x -8)*(x -2)^2*(x -15)^2*(x + 12)^2*(x -6)^2*(x )^4*(x + 3)^6; T[132,73]=(x -2)^2*(x -6)^2*(x + 4)^2*(x + 14)^3*(x + 6)^4*(x -4)^6; T[132,79]=(x + 2)*(x -14)^2*(x -10)^2*(x -2)^3*(x + 4)^5*(x + 10)^6; T[132,83]=(x -6)^2*(x + 12)^2*(x -16)^2*(x -12)^3*(x -4)^4*(x + 6)^6; T[132,89]=(x + 9)^2*(x + 14)^2*(x -10)^4*(x + 6)^5*(x -15)^6; T[132,97]=(x -14)^2*(x + 14)^2*(x -2)^3*(x + 2)^4*(x + 7)^8; T[133,2]=(x^2 -x -1)*(x^2 + 3*x + 1)*(x^3 -2*x^2 -4*x + 7)*(x^2 + x -3)*(x )^2; T[133,3]=(x^2 + 3*x + 1)*(x^2 -3*x + 1)*(x^2 + 3*x -1)*(x^3 -3*x^2 -x + 4)*(x + 2)^2; T[133,5]=(x^2 -5)*(x^3 + 2*x^2 -5*x -2)*(x + 3)^2*(x -1)^2*(x -3)^2; T[133,7]=(x^2 + x + 7)*(x -1)^4*(x + 1)^5; T[133,11]=(x^2 + 9*x + 19)*(x^2 + x -1)*(x^3 -7*x^2 + 11*x -4)*(x^2 + 5*x + 3)*(x -3)^2; T[133,13]=(x^2 + 4*x -9)*(x^3 + 2*x^2 -5*x -2)*(x + 1)^2*(x + 4)^2*(x -1)^2; T[133,17]=(x^2 + 7*x + 9)*(x^2 + 3*x -9)*(x^2 -x -11)*(x^3 -7*x^2 -11*x + 106)*(x + 3)^2; T[133,19]=(x + 1)^4*(x -1)^7; T[133,23]=(x^2 + 2*x -19)*(x^3 -14*x^2 + 53*x -56)*(x )^2*(x + 3)^4; T[133,29]=(x^2 + 9*x + 19)*(x^2 -5*x + 5)*(x^3 + 3*x^2 -73*x -278)*(x^2 -9*x -9)*(x -6)^2; T[133,31]=(x^2 + x -101)*(x^2 -5*x -5)*(x^3 + 11*x^2 + 25*x + 16)*(x^2 + x -3)*(x + 4)^2; T[133,37]=(x^2 + 14*x + 29)*(x^2 + 8*x -29)*(x^3 -43*x + 106)*(x^2 -13)*(x -2)^2; T[133,41]=(x^2 -9*x -11)*(x^2 -5*x + 3)*(x^2 -3*x + 1)*(x^3 + 7*x^2 -151*x -998)*(x + 6)^2; T[133,43]=(x^2 -8*x -4)*(x^3 + 4*x^2 -20*x -16)*(x + 1)^2*(x + 2)^2*(x + 10)^2; T[133,47]=(x^2 -6*x -11)*(x^2 -125)*(x^3 -8*x^2 -29*x -16)*(x^2 + 2*x -51)*(x + 3)^2; T[133,53]=(x^2 + 3*x -27)*(x^2 -3*x -9)*(x^2 + 9*x -11)*(x^3 + x^2 -31*x -2)*(x -12)^2; T[133,59]=(x^2 -20*x + 95)*(x^2 + 12*x -9)*(x^3 + 10*x^2 + x -124)*(x^2 -2*x -51)*(x + 6)^2; T[133,61]=(x^2 -45)*(x^2 -6*x -43)*(x^2 + 6*x -71)*(x^3 + 6*x^2 -49*x -82)*(x + 1)^2; T[133,67]=(x^2 -11*x -31)*(x^2 + 7*x -89)*(x^3 + 3*x^2 -79*x -188)*(x^2 -7*x -17)*(x + 4)^2; T[133,71]=(x^2 -6*x -11)*(x^2 -4*x -41)*(x^2 -10*x -27)*(x^3 -61*x -32)*(x -6)^2; T[133,73]=(x^2 -15*x + 45)*(x^2 + 7*x -49)*(x^3 -x^2 -101*x -98)*(x^2 + 15*x -25)*(x + 7)^2; T[133,79]=(x^2 -20)*(x^3 + 4*x^2 -44*x + 32)*(x^2 -8*x -36)*(x + 10)^2*(x -8)^2; T[133,83]=(x^2 -13*x + 31)*(x^2 + 15*x + 27)*(x^2 + 9*x + 9)*(x^3 -31*x^2 + 289*x -788)*(x -12)^2; T[133,89]=(x^2 -10*x + 20)*(x^2 -18*x + 36)*(x^2 + 14*x + 36)*(x^3 + 28*x^2 + 104*x -1352)*(x -12)^2; T[133,97]=(x^2 -12*x + 23)*(x^2 -2*x -179)*(x^2 -6*x -11)*(x^3 + 30*x^2 + 243*x + 482)*(x -8)^2; T[134,2]=(x^2 -2*x + 2)*(x^4 + x^3 + 3*x^2 + 2*x + 4)*(x^4 + 3*x^3 + 5*x^2 + 6*x + 4)*(x + 1)^3*(x -1)^3; T[134,3]=(x^3 -3*x^2 + 1)*(x^3 -x^2 -8*x + 11)*(x + 2)^2*(x^2 -x -1)^2*(x^2 + 3*x + 1)^2; T[134,5]=(x^3 + 3*x^2 -6*x + 1)*(x^3 -3*x^2 -2*x + 3)*(x -2)^2*(x^2 -4*x -1)^2*(x + 3)^4; T[134,7]=(x^3 -12*x -8)*(x^3 -20*x + 8)*(x + 2)^2*(x^2 -x -1)^2*(x^2 + x -11)^2; T[134,11]=(x^3 + x^2 -16*x + 9)*(x^3 + 3*x^2 -24*x -53)*(x + 4)^2*(x^2 -5)^2*(x -1)^4; T[134,13]=(x^3 + 3*x^2 -18*x -3)*(x^3 -11*x^2 + 30*x -9)*(x -2)^2*(x^2 + 7*x + 1)^2*(x^2 + x -1)^2; T[134,17]=(x^3 + 3*x^2 -18*x -3)*(x^3 + 3*x^2 -2*x -3)*(x -3)^2*(x^2 -6*x + 4)^2*(x^2 + 6*x + 4)^2; T[134,19]=(x^3 -6*x^2 -36*x + 152)*(x -7)^2*(x^2 -x -11)^2*(x^2 + 11*x + 29)^2*(x -2)^3; T[134,23]=(x^3 + 11*x^2 + 32*x + 27)*(x^3 + 3*x^2 -36*x + 51)*(x -9)^2*(x^2 + 2*x -19)^2*(x^2 -6*x -11)^2; T[134,29]=(x + 5)^2*(x^2 -10*x + 5)^2*(x^2 + 6*x -11)^2*(x + 4)^3*(x )^3; T[134,31]=(x^3 -12*x^2 + 36*x -8)*(x^3 -4*x^2 -84*x + 440)*(x + 10)^2*(x^2 -45)^2*(x + 1)^4; T[134,37]=(x^3 -84*x -136)*(x^3 -4*x^2 -60*x + 200)*(x + 1)^2*(x^2 + x -11)^2*(x^2 -3*x + 1)^2; T[134,41]=(x^3 + 4*x^2 -124*x -600)*(x^3 -12*x -8)*(x^2 + 3*x + 1)^2*(x^2 -5*x -25)^2*(x )^2; T[134,43]=(x^3 -3*x^2 -60*x + 53)*(x^3 -x^2 -60*x + 167)*(x + 2)^2*(x^2 -3*x -9)^2*(x^2 + 9*x -11)^2; T[134,47]=(x^3 -21*x^2 + 144*x -321)*(x^3 -x^2 -16*x -9)*(x + 1)^2*(x^2 + 15*x + 55)^2*(x^2 + 7*x + 11)^2; T[134,53]=(x^3 + 9*x^2 + 18*x -9)*(x^3 + 3*x^2 -74*x + 45)*(x -10)^2*(x^2 -45)^2*(x + 9)^4; T[134,59]=(x^3 -12*x + 8)*(x^3 -180*x + 216)*(x -9)^2*(x + 6)^4*(x -6)^4; T[134,61]=(x^3 -21*x^2 + 70*x + 317)*(x^3 -15*x^2 + 66*x -89)*(x + 2)^2*(x^2 + 7*x -89)^2*(x^2 + 9*x + 9)^2; T[134,67]=(x + 1)^7*(x -1)^9; T[134,71]=(x^3 -5*x^2 -88*x -165)*(x^3 -9*x^2 -12*x + 179)*(x^2 -245)^2*(x^2 -12*x + 31)^2*(x )^2; T[134,73]=(x^3 + 23*x^2 + 114*x -211)*(x^3 -9*x^2 -54*x -27)*(x + 7)^2*(x -8)^4*(x + 4)^4; T[134,79]=(x^3 + 6*x^2 -24*x + 8)*(x^3 -10*x^2 -96*x + 824)*(x + 8)^2*(x^2 + 7*x -89)^2*(x^2 + 11*x -31)^2; T[134,83]=(x^3 + 22*x^2 + 32*x -984)*(x^3 -18*x^2 + 648)*(x -4)^2*(x^2 + 15*x -5)^2*(x^2 -13*x + 31)^2; T[134,89]=(x^3 -3*x^2 -126*x -321)*(x^3 -19*x^2 + 98*x -153)*(x -7)^2*(x^2 -5)^2*(x^2 + 16*x + 19)^2; T[134,97]=(x^3 -18*x^2 + 24*x + 584)*(x^3 + 2*x^2 -136*x + 520)*(x^2 -2*x -179)^2*(x^2 -45)^2*(x )^2; T[135,2]=(x + 2)*(x -2)*(x^2 + x -3)*(x^2 -x -3)*(x -1)^2*(x )^2*(x + 1)^3; T[135,3]=(x + 1)*(x )^12; T[135,5]=(x^2 + 5)*(x + 1)^5*(x -1)^6; T[135,7]=(x + 1)^2*(x + 3)^2*(x^2 -2*x -12)^2*(x )^5; T[135,11]=(x -2)*(x + 2)*(x^2 + 2*x -12)*(x^2 -2*x -12)*(x -4)^2*(x )^2*(x + 4)^3; T[135,13]=(x + 5)^2*(x -5)^2*(x^2 -6*x -4)^2*(x + 2)^5; T[135,17]=(x + 8)*(x -8)*(x^2 -4*x -9)*(x^2 + 4*x -9)*(x + 2)^2*(x )^2*(x -2)^3; T[135,19]=(x -1)^2*(x + 7)^2*(x^2 -13)^2*(x -4)^5; T[135,23]=(x -6)*(x + 6)*(x + 3)^2*(x -3)^2*(x )^7; T[135,29]=(x^2 + 10*x + 12)*(x^2 -10*x + 12)*(x )^2*(x -2)^3*(x + 2)^4; T[135,31]=(x + 4)^2*(x^2 + 4*x -9)^2*(x )^7; T[135,37]=(x -11)^2*(x -5)^2*(x -2)^4*(x + 10)^5; T[135,41]=(x^2 -2*x -12)*(x^2 + 2*x -12)*(x )^2*(x + 10)^3*(x -10)^4; T[135,43]=(x -8)^2*(x^2 + 6*x -4)^2*(x -4)^7; T[135,47]=(x + 4)*(x -4)*(x^2 -4*x -48)*(x^2 + 4*x -48)*(x + 8)^2*(x )^2*(x -8)^3; T[135,53]=(x -2)*(x + 2)*(x^2 -4*x -9)*(x^2 + 4*x -9)*(x -10)^2*(x )^2*(x + 10)^3; T[135,59]=(x -8)*(x + 8)*(x^2 + 10*x + 12)*(x^2 -10*x + 12)*(x -4)^2*(x )^2*(x + 4)^3; T[135,61]=(x -7)^2*(x + 1)^2*(x^2 -6*x -43)^2*(x + 2)^5; T[135,67]=(x + 9)^2*(x -5)^2*(x^2 + 16*x + 12)^2*(x -12)^5; T[135,71]=(x + 2)*(x -2)*(x^2 -22*x + 108)*(x^2 + 22*x + 108)*(x -8)^2*(x )^2*(x + 8)^3; T[135,73]=(x + 5)^2*(x + 7)^2*(x^2 -18*x + 68)^2*(x -10)^5; T[135,79]=(x + 3)^2*(x -17)^2*(x^2 + 16*x + 51)^2*(x )^5; T[135,83]=(x + 6)*(x -6)*(x + 3)^2*(x -3)^2*(x + 12)^2*(x )^2*(x -12)^3; T[135,89]=(x -12)*(x + 12)*(x^2 + 6*x -108)*(x^2 -6*x -108)*(x -6)^2*(x )^2*(x + 6)^3; T[135,97]=(x + 13)^2*(x + 19)^2*(x -8)^4*(x -2)^5; T[136,2]=(x -1)*(x^2 + x + 2)*(x )^12; T[136,3]=(x -2)*(x^2 + 2*x -4)*(x^2 -2*x -2)^2*(x + 2)^4*(x )^4; T[136,5]=(x -2)^2*(x^2 -12)^2*(x )^4*(x + 2)^5; T[136,7]=(x + 2)*(x^2 -2*x -4)*(x )*(x^2 + 2*x -2)^2*(x + 4)^3*(x -4)^4; T[136,11]=(x + 6)*(x -2)*(x^2 -2*x -4)*(x^2 + 6*x + 6)^2*(x -6)^3*(x )^4; T[136,13]=(x + 6)*(x^2 -20)*(x^2 -4*x -8)^2*(x + 2)^4*(x -2)^4; T[136,17]=(x -1)^7*(x + 1)^8; T[136,19]=(x -4)*(x^2 + 4*x -16)*(x )*(x^2 -4*x -8)^2*(x + 4)^7; T[136,23]=(x -6)*(x^2 -2*x -4)*(x^2 + 6*x + 6)^2*(x )^3*(x -4)^5; T[136,29]=(x + 10)*(x -2)^2*(x^2 -12)^2*(x -6)^4*(x )^4; T[136,31]=(x -2)*(x + 8)*(x^2 + 2*x -4)*(x^2 + 2*x -26)^2*(x + 4)^3*(x -4)^4; T[136,37]=(x -6)*(x^2 + 4*x -76)*(x^2 -16*x + 52)^2*(x + 4)^4*(x + 2)^4; T[136,41]=(x -2)^2*(x -6)^4*(x + 6)^9; T[136,43]=(x + 8)*(x^2 + 12*x + 16)*(x^2 -4*x -104)^2*(x -4)^4*(x -8)^4; T[136,47]=(x + 8)*(x^2 -8*x -64)*(x^2 -48)^2*(x )^8; T[136,53]=(x -10)*(x + 10)*(x + 2)^2*(x^2 -12*x -12)^2*(x + 6)^3*(x -6)^4; T[136,59]=(x + 8)*(x^2 -20*x + 80)*(x^2 -12*x + 24)^2*(x + 12)^4*(x )^4; T[136,61]=(x -12)*(x -14)*(x^2 + 4*x -76)*(x^2 + 8*x + 4)^2*(x + 4)^3*(x + 10)^4; T[136,67]=(x + 12)^2*(x^2 -16*x + 16)^2*(x -8)^4*(x -4)^5; T[136,71]=(x -2)*(x -12)*(x^2 -14*x + 44)*(x^2 + 6*x -18)^2*(x )^3*(x + 4)^4; T[136,73]=(x + 14)*(x^2 -12*x -44)*(x + 6)^4*(x -2)^8; T[136,79]=(x + 10)*(x + 4)*(x^2 -10*x -20)*(x^2 + 14*x + 22)^2*(x -8)^3*(x -12)^4; T[136,83]=(x -16)*(x -8)*(x^2 -12*x + 16)*(x^2 + 12*x + 24)^2*(x )^3*(x + 4)^4; T[136,89]=(x + 10)*(x^2 + 24*x + 124)*(x^2 -12*x + 24)^2*(x + 6)^3*(x -10)^5; T[136,97]=(x + 18)*(x^2 -4*x -44)^2*(x -14)^3*(x -2)^7; T[137,2]=(x^4 + 3*x^3 -4*x -1)*(x^7 -10*x^5 + 28*x^3 + 3*x^2 -19*x -7); T[137,3]=(x^4 + 5*x^3 + 4*x^2 -10*x -11)*(x^7 -3*x^6 -8*x^5 + 26*x^4 + 11*x^3 -58*x^2 + 16*x + 14); T[137,5]=(x^4 + 2*x^3 -12*x^2 -23*x + 1)*(x^7 + 2*x^6 -18*x^5 -21*x^4 + 103*x^3 + 26*x^2 -188*x + 88); T[137,7]=(x^4 + 13*x^3 + 60*x^2 + 116*x + 79)*(x^7 -15*x^6 + 80*x^5 -168*x^4 + 43*x^3 + 300*x^2 -352*x + 112); T[137,11]=(x^4 -x^3 -38*x^2 + 76*x + 101)*(x^7 + 3*x^6 -26*x^5 -140*x^4 -219*x^3 -92*x^2 + 24*x + 16); T[137,13]=(x^4 + 8*x^3 + 10*x^2 -49*x -101)*(x^7 -12*x^6 + 32*x^5 + 85*x^4 -351*x^3 -202*x^2 + 876*x + 488); T[137,17]=(x^4 + 4*x^3 -28*x^2 -109*x + 31)*(x^7 + 6*x^6 -24*x^5 -69*x^4 + 185*x^3 + 154*x^2 -368*x -4); T[137,19]=(x^4 + 10*x^3 -4*x^2 -235*x -431)*(x^7 -10*x^6 -20*x^5 + 317*x^4 -283*x^3 -540*x^2 -176*x -16); T[137,23]=(x^4 + x^3 -38*x^2 -66*x + 121)*(x^7 + 3*x^6 -88*x^5 -206*x^4 + 2383*x^3 + 3920*x^2 -18796*x -11606); T[137,29]=(x^4 -11*x^3 -25*x^2 + 377*x -551)*(x^7 + 9*x^6 -25*x^5 -439*x^4 -1065*x^3 + 1414*x^2 + 7980*x + 7576); T[137,31]=(x^4 + 17*x^3 + 53*x^2 -203*x -319)*(x^7 -13*x^6 -29*x^5 + 1081*x^4 -5573*x^3 + 11106*x^2 -7794*x + 98); T[137,37]=(x^4 + 4*x^3 -50*x^2 -213*x -191)*(x^7 + 2*x^6 -102*x^5 -17*x^4 + 2727*x^3 -3598*x^2 -8376*x + 2332); T[137,41]=(x^4 + 7*x^3 -50*x^2 -286*x -121)*(x^7 + x^6 -194*x^5 -284*x^4 + 10059*x^3 + 20162*x^2 -86620*x + 7256); T[137,43]=(x^4 + 13*x^3 -5*x^2 -239*x -191)*(x^7 -7*x^6 -95*x^5 + 463*x^4 + 2751*x^3 -4682*x^2 -25238*x -12146); T[137,47]=(x^4 + 11*x^3 + 15*x^2 -67*x -41)*(x^7 -15*x^6 + 3*x^5 + 1081*x^4 -7385*x^3 + 20104*x^2 -23766*x + 9634); T[137,53]=(x^4 + 2*x^3 -15*x^2 -36*x -1)*(x^7 + 8*x^6 -83*x^5 -730*x^4 + 3*x^3 + 10562*x^2 + 25012*x + 15464); T[137,59]=(x^4 -2*x^3 -107*x^2 + 608*x -709)*(x^7 + 6*x^6 -215*x^5 -656*x^4 + 14451*x^3 + 13436*x^2 -308912*x + 232768); T[137,61]=(x^4 -7*x^3 -17*x^2 + 133*x + 11)*(x^7 -x^6 -415*x^5 -121*x^4 + 54409*x^3 + 95790*x^2 -2244928*x -7285532); T[137,67]=(x^4 + 6*x^3 -123*x^2 -536*x + 2831)*(x^7 -24*x^6 -23*x^5 + 3528*x^4 -15089*x^3 -59296*x^2 + 253180*x + 184654); T[137,71]=(x^7 -16*x^6 -224*x^5 + 4410*x^4 -824*x^3 -208000*x^2 + 614144*x + 221696)*(x^2 -4*x -16)^2; T[137,73]=(x^4 + 27*x^3 + 144*x^2 -1282*x -10219)*(x^7 + x^6 -310*x^5 + 1198*x^4 + 21357*x^3 -156630*x^2 + 207004*x + 298312); T[137,79]=(x^4 -3*x^3 -255*x^2 + 89*x + 9329)*(x^7 -15*x^6 -143*x^5 + 2591*x^4 -1335*x^3 -91520*x^2 + 323146*x -185806); T[137,83]=(x^4 + 3*x^3 -260*x^2 -354*x + 6449)*(x^7 -21*x^6 + 42*x^5 + 1714*x^4 -11437*x^3 + 84*x^2 + 118712*x -86338); T[137,89]=(x^7 + 8*x^6 -517*x^5 -1764*x^4 + 100437*x^3 -98906*x^2 -7074228*x + 31528168)*(x^2 -7*x + 1)^2; T[137,97]=(x^4 + 7*x^3 -206*x^2 + 658*x + 211)*(x^7 -x^6 -182*x^5 -604*x^4 + 5567*x^3 + 29074*x^2 + 18068*x -51016); T[138,2]=(x^2 -x + 2)*(x^4 -x^2 + 4)*(x^4 + x^3 + 3*x^2 + 2*x + 4)^2*(x -1)^3*(x + 1)^4; T[138,3]=(x^2 + 3)*(x^4 + x^2 + 9)^2*(x -1)^5*(x + 1)^6; T[138,5]=(x -2)*(x + 2)*(x -4)^2*(x )^3*(x^2 + 2*x -4)^7; T[138,7]=(x -2)*(x^2 -20)*(x )*(x + 4)^2*(x + 2)^3*(x^2 -2*x -4)^6; T[138,11]=(x + 6)*(x -2)^2*(x )^2*(x^2 + 6*x + 4)^5*(x -4)^6; T[138,13]=(x -2)*(x + 6)^2*(x^2 -20)^3*(x + 2)^4*(x -3)^8; T[138,17]=(x -2)*(x + 2)^2*(x -4)^2*(x + 4)^2*(x^2 + 10*x + 20)^2*(x )^2*(x^2 -6*x + 4)^4; T[138,19]=(x + 8)*(x^2 + 2*x -44)*(x )*(x^2 -10*x + 20)^2*(x -2)^3*(x + 2)^10; T[138,23]=(x + 1)^5*(x -1)^16; T[138,29]=(x + 2)*(x -6)*(x + 6)*(x^2 -20)^3*(x -2)^4*(x + 3)^8; T[138,31]=(x -8)*(x + 8)*(x + 4)*(x^2 -4*x -16)*(x -4)^2*(x^2 + 4*x -16)^2*(x )^2*(x^2 -45)^4; T[138,37]=(x + 10)*(x^2 -18*x + 76)*(x )*(x + 4)^2*(x^2 -20)^2*(x -2)^3*(x^2 -2*x -4)^4; T[138,41]=(x + 6)*(x + 2)^2*(x -10)^2*(x -2)^2*(x -6)^2*(x^2 + 4*x -76)^2*(x^2 -2*x -19)^4; T[138,43]=(x -8)*(x -2)*(x + 12)*(x^2 + 14*x + 44)*(x^2 -2*x -44)^2*(x -10)^4*(x )^8; T[138,47]=(x + 8)*(x -8)*(x -4)^2*(x + 4)^4*(x^2 -5)^4*(x )^5; T[138,53]=(x -12)*(x^2 -6*x + 4)*(x + 12)^2*(x -2)^2*(x + 4)^2*(x^2 + 6*x + 4)^2*(x^2 + 8*x -4)^4; T[138,59]=(x + 4)*(x^2 -80)*(x^2 -8*x -64)^2*(x + 12)^3*(x -12)^3*(x^2 -4*x -16)^4; T[138,61]=(x -4)*(x -2)*(x + 10)*(x^2 -6*x + 4)*(x + 8)^2*(x + 6)^2*(x^2 -20)^2*(x^2 -4*x -76)^4; T[138,67]=(x + 12)*(x -14)*(x -8)*(x^2 -6*x -36)*(x^2 -6*x + 4)^2*(x + 10)^4*(x^2 + 10*x + 20)^4; T[138,71]=(x^2 -80)*(x -8)^2*(x + 8)^4*(x^2 -20*x + 95)^4*(x )^5; T[138,73]=(x + 6)*(x -2)*(x + 10)*(x^2 -20)*(x + 14)^2*(x -6)^2*(x^2 + 4*x -76)^2*(x^2 -22*x + 101)^4; T[138,79]=(x -8)*(x + 10)*(x + 6)*(x^2 -20)*(x + 12)^2*(x -10)^2*(x^2 -6*x -36)^2*(x^2 + 4*x -76)^4; T[138,83]=(x + 16)*(x^2 -22*x + 116)*(x )*(x -12)^2*(x -14)^3*(x -4)^4*(x^2 + 22*x + 116)^4; T[138,89]=(x -12)*(x -18)*(x )*(x + 16)^2*(x + 6)^2*(x^2 -2*x -4)^2*(x^2 + 12*x + 16)^5; T[138,97]=(x + 6)*(x -10)*(x^2 + 8*x -4)*(x -6)^2*(x^2 -8*x -4)^2*(x + 10)^3*(x^2 -22*x + 76)^4; T[139,2]=(x -1)*(x^3 + 2*x^2 -x -1)*(x^7 -x^6 -11*x^5 + 8*x^4 + 35*x^3 -10*x^2 -32*x -8); T[139,3]=(x -2)*(x^3 + 2*x^2 -x -1)*(x^7 + 2*x^6 -15*x^5 -25*x^4 + 56*x^3 + 52*x^2 -56*x -16); T[139,5]=(x + 1)*(x^3 + 8*x^2 + 19*x + 13)*(x^7 -11*x^6 + 36*x^5 + 2*x^4 -211*x^3 + 319*x^2 -55*x -83); T[139,7]=(x -3)*(x^3 -7*x + 7)*(x^7 + 5*x^6 -8*x^5 -82*x^4 -155*x^3 -109*x^2 -31*x -3); T[139,11]=(x -5)*(x^3 + 7*x^2 -49)*(x^7 -2*x^6 -36*x^5 + 82*x^4 + 186*x^3 -314*x^2 -294*x + 229); T[139,13]=(x + 7)*(x^3 -x^2 -16*x -13)*(x^7 -6*x^6 -2*x^5 + 64*x^4 -108*x^3 + 38*x^2 + 6*x -1); T[139,17]=(x + 6)*(x^3 + 3*x^2 -4*x -13)*(x^7 -5*x^6 -42*x^5 + 363*x^4 -914*x^3 + 820*x^2 -80*x -144); T[139,19]=(x + 2)*(x^3 + 2*x^2 -43*x -127)*(x^7 + 10*x^6 -3*x^5 -213*x^4 -202*x^3 + 1272*x^2 + 1024*x -2432); T[139,23]=(x -2)*(x^3 + 7*x^2 -14*x -7)*(x^7 + x^6 -48*x^5 -135*x^4 + 248*x^3 + 908*x^2 -8*x -944); T[139,29]=(x -9)*(x^3 + 15*x^2 + 54*x + 13)*(x^7 -30*x^6 + 300*x^5 -516*x^4 -11232*x^3 + 86188*x^2 -246544*x + 257409); T[139,31]=(x -9)*(x^3 -3*x^2 -18*x + 13)*(x^7 + 20*x^6 + 96*x^5 -180*x^4 -1242*x^3 + 1458*x^2 + 1784*x -2001); T[139,37]=(x -2)*(x^3 + 9*x^2 -22*x -71)*(x^7 -6*x^6 -156*x^5 + 435*x^4 + 7968*x^3 + 2145*x^2 -101457*x -151706); T[139,41]=(x + 6)*(x^3 + 8*x^2 + 12*x -8)*(x^7 -19*x^6 -103*x^5 + 3587*x^4 -7462*x^3 -167116*x^2 + 779648*x -191472); T[139,43]=(x + 4)*(x^3 -2*x^2 -29*x + 71)*(x^7 + 12*x^6 -55*x^5 -1445*x^4 -8092*x^3 -19012*x^2 -17464*x -2528); T[139,47]=(x -8)*(x^3 -10*x^2 + 3*x + 13)*(x^7 + 3*x^6 -220*x^5 -883*x^4 + 15012*x^3 + 72268*x^2 -288629*x -1519088); T[139,53]=(x^3 + 12*x^2 -15*x -377)*(x^7 -38*x^6 + 547*x^5 -3669*x^4 + 10772*x^3 -6604*x^2 -15032*x -3168)*(x ); T[139,59]=(x -6)*(x^3 + 12*x^2 + 41*x + 29)*(x^7 + 14*x^6 -55*x^5 -815*x^4 + 1348*x^3 + 11788*x^2 -18232*x + 3888); T[139,61]=(x -4)*(x^3 + 4*x^2 -151*x -533)*(x^7 -4*x^6 -259*x^5 + 533*x^4 + 17850*x^3 -8224*x^2 -134920*x + 38176); T[139,67]=(x -5)*(x^3 -16*x^2 + 76*x -104)*(x^7 -9*x^6 -217*x^5 + 1406*x^4 + 15267*x^3 -51512*x^2 -328916*x -70136); T[139,71]=(x -5)*(x^3 -3*x^2 -144*x -351)*(x^7 -24*x^6 + 34*x^5 + 2322*x^4 -6972*x^3 -80898*x^2 + 159974*x + 1068511); T[139,73]=(x + 6)*(x^3 -13*x^2 -86*x + 1189)*(x^7 + 5*x^6 -270*x^5 -727*x^4 + 16476*x^3 + 46404*x^2 -203608*x -443952); T[139,79]=(x + 5)*(x^3 -13*x^2 + 12*x + 223)*(x^7 -8*x^6 -262*x^5 + 1250*x^4 + 17756*x^3 -70814*x^2 -332026*x + 1205557); T[139,83]=(x -7)*(x^3 -28*x^2 + 217*x -497)*(x^7 + 9*x^6 -316*x^5 -2990*x^4 + 17929*x^3 + 168239*x^2 -80339*x -1088879); T[139,89]=(x -7)*(x^3 -3*x^2 -144*x -491)*(x^7 -10*x^6 -238*x^5 + 1976*x^4 + 15828*x^3 -99390*x^2 -158894*x + 778513); T[139,97]=(x + 12)*(x^3 + 7*x^2 -154*x -791)*(x^7 + 5*x^6 -166*x^5 -1215*x^4 + 3370*x^3 + 34300*x^2 -13832*x -260544); T[140,2]=(x -1)*(x^2 + 2)*(x^4 + x^3 + 2*x + 4)*(x + 1)^2*(x )^10; T[140,3]=(x -3)*(x )^2*(x^2 + x -4)^3*(x -1)^4*(x + 2)^6; T[140,5]=(x^2 + 5)^2*(x -1)^7*(x + 1)^8; T[140,7]=(x^2 -2*x + 7)*(x -1)^8*(x + 1)^9; T[140,11]=(x -3)*(x + 5)*(x -4)^2*(x + 3)^3*(x^2 -x -4)^3*(x )^6; T[140,13]=(x + 3)*(x + 1)*(x -2)^2*(x + 6)^2*(x -5)^3*(x^2 -5*x + 2)^3*(x + 4)^4; T[140,17]=(x + 1)*(x + 3)*(x + 6)^2*(x -2)^2*(x -3)^3*(x^2 + 5*x + 2)^3*(x -6)^4; T[140,19]=(x -6)*(x + 4)^2*(x )^2*(x^2 + 6*x -8)^3*(x -2)^8; T[140,23]=(x -6)^3*(x^2 + 2*x -16)^3*(x + 6)^4*(x )^6; T[140,29]=(x + 9)^2*(x -3)^3*(x^2 -x -38)^3*(x -6)^4*(x + 6)^4; T[140,31]=(x -8)^3*(x )^6*(x + 4)^10; T[140,37]=(x + 10)^3*(x -6)^6*(x -2)^10; T[140,41]=(x + 4)*(x )*(x -2)^2*(x + 12)^3*(x^2 -2*x -16)^3*(x -6)^6; T[140,43]=(x -10)*(x -2)*(x -4)^2*(x^2 -10*x + 8)^3*(x -8)^4*(x + 10)^5; T[140,47]=(x + 3)*(x + 1)*(x -8)^2*(x + 6)^2*(x -9)^3*(x^2 + 5*x -32)^3*(x + 12)^4; T[140,53]=(x -4)*(x )*(x + 6)^2*(x + 2)^2*(x -12)^3*(x^2 + 2*x -16)^3*(x -6)^4; T[140,59]=(x -12)^3*(x + 8)^3*(x )^3*(x + 6)^4*(x + 4)^6; T[140,61]=(x + 8)*(x -2)^2*(x + 14)^2*(x^2 -6*x -144)^3*(x -8)^8; T[140,67]=(x -8)*(x -12)*(x -2)^2*(x + 12)^2*(x^2 -4*x -64)^3*(x + 4)^7; T[140,71]=(x + 16)^2*(x + 12)^2*(x -8)^7*(x )^8; T[140,73]=(x -14)*(x^2 + 8*x -52)^3*(x -2)^12; T[140,79]=(x -5)*(x -13)*(x + 8)^2*(x + 1)^3*(x^2 + 9*x + 16)^3*(x -8)^6; T[140,83]=(x + 12)*(x + 4)*(x -6)^2*(x -8)^2*(x -12)^3*(x + 6)^4*(x -4)^6; T[140,89]=(x -12)*(x -4)*(x -10)^2*(x + 12)^3*(x^2 -6*x -8)^3*(x + 6)^6; T[140,97]=(x + 13)*(x -17)*(x + 1)^3*(x^2 + 9*x -86)^3*(x + 10)^4*(x -2)^4; T[141,2]=(x -2)*(x + 2)*(x^2 + x -4)*(x )*(x + 1)^2*(x^4 -x^3 -5*x^2 + 5*x -1)^2; T[141,3]=(x^8 + 5*x^6 + 4*x^5 + 13*x^4 + 12*x^3 + 45*x^2 + 81)*(x -1)^3*(x + 1)^4; T[141,5]=(x + 3)*(x -2)*(x^2 -x -4)*(x )*(x + 1)^2*(x^4 + 2*x^3 -16*x^2 -16*x + 48)^2; T[141,7]=(x -4)*(x^2 -x -4)*(x )*(x^4 -4*x^3 -7*x^2 + 44*x -43)^2*(x + 3)^3; T[141,11]=(x -1)*(x + 5)*(x + 3)*(x -4)*(x^2 -7*x + 8)*(x )*(x^4 + 6*x^3 -4*x^2 -56*x -48)^2; T[141,13]=(x -6)*(x + 4)*(x -2)*(x^2 + 6*x -8)*(x + 2)^2*(x^4 -8*x^3 + 56*x + 48)^2; T[141,17]=(x -8)*(x^2 -2*x -16)*(x -2)^2*(x + 6)^2*(x^4 -6*x^3 -21*x^2 + 74*x + 141)^2; T[141,19]=(x -2)*(x )*(x + 6)^2*(x^4 -16*x^2 -8*x + 16)^2*(x -6)^3; T[141,23]=(x -9)*(x -4)*(x^2 + 3*x -36)*(x )*(x -3)^2*(x^4 + 6*x^3 -20*x^2 -40*x -16)^2; T[141,29]=(x -1)*(x + 1)*(x + 6)*(x -8)*(x -3)*(x^2 + 15*x + 52)*(x^4 + 10*x^3 + 20*x^2 -8*x -16)^2; T[141,31]=(x -2)*(x -6)*(x + 2)*(x + 4)*(x -4)*(x^2 -6*x -8)*(x^4 + 8*x^3 -56*x + 48)^2; T[141,37]=(x + 7)*(x + 6)*(x + 10)*(x^2 -11*x + 26)*(x -1)^2*(x^4 -10*x^3 + 15*x^2 + 34*x + 9)^2; T[141,41]=(x + 8)*(x -10)*(x + 10)*(x -6)*(x + 2)*(x^2 -6*x -8)*(x^4 -6*x^3 -8*x^2 + 32*x -16)^2; T[141,43]=(x -2)*(x -8)*(x + 8)*(x + 10)*(x + 6)*(x^2 -14*x + 32)*(x^4 -2*x^3 -80*x^2 -112*x + 432)^2; T[141,47]=(x + 1)^3*(x -1)^12; T[141,53]=(x -4)*(x -2)*(x + 2)*(x -10)*(x^2 + 8*x -52)*(x )*(x^4 + 6*x^3 -101*x^2 -314*x + 2429)^2; T[141,59]=(x -8)*(x + 4)*(x -12)*(x + 10)*(x + 12)*(x^2 -6*x -8)*(x^4 -4*x^3 -115*x^2 + 704*x -519)^2; T[141,61]=(x + 10)*(x -14)*(x + 2)*(x^4 + 6*x^3 -73*x^2 + 10*x + 337)^2*(x -2)^4; T[141,67]=(x -2)*(x + 8)*(x -10)*(x + 2)*(x -4)*(x^2 -2*x -16)*(x^4 -10*x^3 -120*x^2 + 752*x + 3184)^2; T[141,71]=(x + 14)*(x -16)*(x + 6)*(x + 2)*(x^2 + 2*x -16)*(x )*(x^4 + 12*x^3 -19*x^2 -320*x + 657)^2; T[141,73]=(x -2)*(x + 2)*(x + 8)*(x^2 -10*x + 8)*(x + 10)^2*(x^4 -22*x^3 + 60*x^2 + 1368*x -7664)^2; T[141,79]=(x -8)*(x + 4)*(x -17)*(x + 15)*(x + 3)*(x^2 + 15*x + 52)*(x^4 -20*x^3 + 77*x^2 + 240*x -47)^2; T[141,83]=(x -4)*(x -8)*(x + 18)*(x^2 -6*x -8)*(x + 4)^2*(x^4 -20*x^3 + 80*x^2 + 192*x -256)^2; T[141,89]=(x -6)*(x -18)*(x + 10)*(x + 2)*(x -10)*(x^2 -68)*(x^4 + 6*x^3 -161*x^2 -206*x + 4841)^2; T[141,97]=(x + 18)*(x + 14)*(x -5)*(x^2 + 5*x -202)*(x -1)^2*(x^4 -30*x^3 + 179*x^2 + 1634*x -14307)^2; T[142,2]=(x^6 + x^5 + 2*x^4 + x^3 + 4*x^2 + 4*x + 8)*(x^6 + x^4 + 3*x^3 + 2*x^2 + 8)*(x -1)^2*(x + 1)^3; T[142,3]=(x -1)*(x + 1)*(x -3)*(x + 3)*(x )*(x^3 -x^2 -4*x + 3)^2*(x^3 + x^2 -8*x -3)^2; T[142,5]=(x + 2)*(x + 4)*(x )*(x -2)^2*(x^3 + 3*x^2 -2*x -7)^2*(x^3 -5*x^2 -2*x + 25)^2; T[142,7]=(x )*(x + 3)^2*(x + 1)^2*(x^3 -2*x^2 -16*x + 24)^4; T[142,11]=(x + 6)*(x -6)*(x + 2)*(x^3 -20*x + 24)^2*(x^3 + 2*x^2 -16*x -24)^2*(x )^2; T[142,13]=(x -1)*(x + 3)*(x + 5)*(x + 1)*(x^3 + 6*x^2 -8*x -56)^2*(x -4)^7; T[142,17]=(x + 6)*(x -6)^2*(x^3 + 2*x^2 -32*x -24)^2*(x^3 -2*x^2 -16*x + 24)^2*(x )^2; T[142,19]=(x -1)*(x + 5)*(x + 1)*(x -5)*(x + 8)*(x^3 -x^2 -20*x -25)^2*(x^3 -11*x^2 + 36*x -35)^2; T[142,23]=(x + 7)*(x -5)*(x -3)*(x + 1)*(x^3 -8*x^2 -12*x + 72)^2*(x + 4)^7; T[142,29]=(x -6)*(x + 8)*(x )*(x + 2)^2*(x^3 + 5*x^2 -2*x -25)^2*(x^3 -11*x^2 + 14*x + 71)^2; T[142,31]=(x -5)*(x + 5)*(x -1)*(x -7)*(x + 8)*(x^3 + 6*x^2 -8*x -56)^2*(x -4)^6; T[142,37]=(x -10)*(x + 4)*(x -6)*(x -4)*(x + 2)*(x^3 -9*x^2 -26*x + 37)^2*(x^3 + 15*x^2 + 70*x + 97)^2; T[142,41]=(x -4)*(x + 6)*(x -10)*(x + 2)*(x )*(x^3 + 2*x^2 -68*x + 56)^2*(x^3 -14*x^2 + 48*x -8)^2; T[142,43]=(x + 1)*(x + 8)*(x -1)*(x + 5)*(x -5)*(x^3 -13*x^2 + 48*x -45)^2*(x^3 + 17*x^2 + 72*x + 81)^2; T[142,47]=(x -9)*(x + 13)*(x + 3)*(x + 4)*(x + 1)*(x^3 -4*x^2 -28*x + 40)^2*(x^3 + 10*x^2 -72)^2; T[142,53]=(x )*(x + 6)^2*(x -6)^2*(x^3 -20*x -24)^2*(x^3 + 18*x^2 + 28*x -456)^2; T[142,59]=(x -2)*(x + 2)*(x -6)*(x -10)^2*(x^3 + 4*x^2 -36*x -152)^2*(x^3 + 22*x^2 + 144*x + 280)^2; T[142,61]=(x -2)*(x + 8)*(x + 6)*(x + 2)^2*(x^3 -16*x^2 + 16*x + 320)^2*(x^3 -8*x^2 -76*x + 536)^2; T[142,67]=(x + 14)*(x + 4)*(x -8)*(x -2)^2*(x^3 + 12*x^2 + 28*x -40)^2*(x^3 + 12*x^2 -32*x -64)^2; T[142,71]=(x + 1)^2*(x -1)^15; T[142,73]=(x + 1)*(x + 2)*(x + 17)*(x -7)^2*(x^3 -27*x^2 + 202*x -461)^2*(x^3 -3*x^2 -2*x + 7)^2; T[142,79]=(x -10)*(x -8)*(x + 6)*(x^3 + 3*x^2 -44*x + 15)^2*(x^3 -7*x^2 -136*x + 525)^2*(x )^2; T[142,83]=(x -4)*(x -12)*(x^3 + 19*x^2 + 96*x + 63)^2*(x^3 -23*x^2 + 172*x -419)^2*(x + 4)^3; T[142,89]=(x -6)*(x + 3)^2*(x -9)^2*(x^3 -x^2 -22*x -27)^2*(x^3 -13*x^2 -82*x + 45)^2; T[142,97]=(x + 6)*(x -2)*(x -14)*(x + 16)*(x + 4)*(x^3 -4*x^2 -36*x + 152)^2*(x^3 -22*x^2 + 144*x -280)^2; T[143,2]=(x^4 -3*x^3 -x^2 + 5*x + 1)*(x^6 -10*x^4 + 2*x^3 + 24*x^2 -7*x -12)*(x )*(x + 2)^2; T[143,3]=(x^4 -7*x^2 + 4*x + 1)*(x^6 -3*x^5 -11*x^4 + 33*x^3 + 25*x^2 -91*x + 28)*(x + 1)^3; T[143,5]=(x + 1)*(x^4 -16*x^2 + 8*x + 16)*(x^6 -x^5 -26*x^4 + 32*x^3 + 152*x^2 -256*x + 96)*(x -1)^2; T[143,7]=(x^4 -6*x^3 + x^2 + 44*x -61)*(x^6 -4*x^5 -23*x^4 + 66*x^3 + 187*x^2 -210*x -448)*(x + 2)^3; T[143,11]=(x -1)^6*(x + 1)^7; T[143,13]=(x^2 -4*x + 13)*(x + 1)^5*(x -1)^6; T[143,17]=(x + 4)*(x^4 -6*x^3 -36*x^2 + 136*x + 496)*(x^6 -40*x^4 -16*x^3 + 384*x^2 + 224*x -768)*(x + 2)^2; T[143,19]=(x -2)*(x^4 -8*x^3 -25*x^2 + 154*x + 387)*(x^6 + 10*x^5 + 3*x^4 -196*x^3 -561*x^2 -454*x -104)*(x )^2; T[143,23]=(x -7)*(x^4 + 4*x^3 -7*x^2 -44*x -43)*(x^6 -11*x^5 -43*x^4 + 701*x^3 -447*x^2 -8635*x + 13176)*(x + 1)^2; T[143,29]=(x + 2)*(x^4 + 10*x^3 + 16*x^2 -64*x -144)*(x^6 -2*x^5 -92*x^4 + 408*x^3 + 208*x^2 -2240*x + 1344)*(x )^2; T[143,31]=(x + 3)*(x^4 -2*x^3 -96*x^2 + 96*x + 688)*(x^6 + 9*x^5 -62*x^4 -880*x^3 -3040*x^2 -3888*x -1664)*(x -7)^2; T[143,37]=(x + 11)*(x^4 -12*x^3 -16*x^2 + 448*x -768)*(x^6 -15*x^5 -6*x^4 + 968*x^3 -4864*x^2 + 7680*x -2560)*(x -3)^2; T[143,41]=(x -10)*(x^4 -8*x^3 -57*x^2 + 450*x -413)*(x^6 + 4*x^5 -105*x^4 -222*x^3 + 1655*x^2 -1568*x -252)*(x + 8)^2; T[143,43]=(x + 4)*(x^4 -26*x^3 + 236*x^2 -872*x + 1104)*(x^6 + 2*x^5 -100*x^4 + 120*x^3 + 1584*x^2 -2496*x -1024)*(x + 6)^2; T[143,47]=(x + 4)*(x^4 + 18*x^3 + 88*x^2 + 16*x -496)*(x^6 -6*x^5 -96*x^4 + 240*x^3 + 1712*x^2 -2240*x -7680)*(x -8)^2; T[143,53]=(x -2)*(x^4 + 6*x^3 -13*x^2 -118*x -159)*(x^6 -2*x^5 -169*x^4 -294*x^3 + 5877*x^2 + 18088*x -10116)*(x + 6)^2; T[143,59]=(x + 1)*(x^4 + 16*x^3 + 44*x^2 -336*x -1424)*(x^6 -11*x^5 -120*x^4 + 844*x^3 + 5968*x^2 -7952*x -57792)*(x -5)^2; T[143,61]=(x + 2)*(x^4 + 12*x^3 -248*x -48)*(x^6 -16*x^5 -52*x^4 + 1496*x^3 -5232*x^2 -1632*x + 19648)*(x -12)^2; T[143,67]=(x + 1)*(x^4 -2*x^3 -148*x^2 -792*x -1136)*(x^6 -9*x^5 -62*x^4 + 332*x^3 + 936*x^2 -112*x -832)*(x + 7)^2; T[143,71]=(x + 9)*(x^4 + 14*x^3 -104*x^2 -1136*x -2256)*(x^6 + 15*x^5 -98*x^4 -1936*x^3 -4144*x^2 + 12592*x + 33024)*(x + 3)^2; T[143,73]=(x + 16)*(x^4 -22*x^3 + 69*x^2 + 1112*x -6101)*(x^6 -32*x^5 + 349*x^4 -1222*x^3 -2093*x^2 + 12362*x + 17456)*(x -4)^2; T[143,79]=(x -8)*(x^4 + 10*x^3 -220*x^2 -1272*x + 6544)*(x^6 -14*x^5 -12*x^4 + 904*x^3 -4048*x^2 + 4416*x + 2048)*(x + 10)^2; T[143,83]=(x^4 + 2*x^3 -35*x^2 -104*x -21)*(x^6 + 26*x^5 + 33*x^4 -3460*x^3 -18629*x^2 + 90560*x + 584400)*(x )*(x + 6)^2; T[143,89]=(x + 7)*(x^4 -10*x^3 -12*x^2 + 40*x + 48)*(x^6 + 23*x^5 -24*x^4 -3576*x^3 -22496*x^2 -21728*x + 61152)*(x -15)^2; T[143,97]=(x + 13)*(x^4 -22*x^3 -168*x^2 + 6528*x -36848)*(x^6 -27*x^5 + 204*x^4 + 404*x^3 -11824*x^2 + 50384*x -65312)*(x + 7)^2; T[144,2]=(x )^13; T[144,3]=(x -1)*(x + 1)^2*(x )^10; T[144,5]=(x -2)^3*(x )^4*(x + 2)^6; T[144,7]=(x -4)*(x + 4)^3*(x )^9; T[144,11]=(x + 4)^4*(x )^4*(x -4)^5; T[144,13]=(x -2)^4*(x + 2)^9; T[144,17]=(x + 2)^3*(x )^4*(x -2)^6; T[144,19]=(x + 8)*(x -4)^3*(x -8)^3*(x + 4)^6; T[144,23]=(x -8)^4*(x )^4*(x + 8)^5; T[144,29]=(x + 6)^3*(x )^4*(x -6)^6; T[144,31]=(x -4)*(x + 4)^3*(x + 8)^3*(x -8)^6; T[144,37]=(x + 10)^4*(x -6)^9; T[144,41]=(x -6)^3*(x )^4*(x + 6)^6; T[144,43]=(x + 8)*(x + 4)^3*(x -8)^3*(x -4)^6; T[144,47]=(x )^13; T[144,53]=(x -2)^3*(x )^4*(x + 2)^6; T[144,59]=(x + 4)^4*(x )^4*(x -4)^5; T[144,61]=(x -14)^4*(x + 2)^9; T[144,67]=(x -16)*(x + 16)^3*(x -4)^3*(x + 4)^6; T[144,71]=(x + 8)^4*(x )^4*(x -8)^5; T[144,73]=(x + 10)^4*(x -10)^9; T[144,79]=(x -4)*(x -8)^3*(x + 4)^3*(x + 8)^6; T[144,83]=(x -4)^4*(x )^4*(x + 4)^5; T[144,89]=(x -6)^3*(x )^4*(x + 6)^6; T[144,97]=(x -14)^4*(x -2)^9; T[145,2]=(x + 1)*(x^3 -x^2 -3*x + 1)*(x^3 -3*x^2 -x + 5)*(x^2 + 2*x -1)^3; T[145,3]=(x^3 + 2*x^2 -4*x -4)*(x^3 -2*x^2 -4*x + 4)*(x )*(x + 2)^2*(x^2 -2*x -1)^2; T[145,5]=(x^2 + x + 5)^2*(x + 1)^4*(x -1)^5; T[145,7]=(x + 2)*(x^2 + 4*x -4)*(x^3 + 2*x^2 -8*x + 4)*(x^3 -4*x^2 + 4)*(x^2 -8)^2; T[145,11]=(x + 6)*(x^2 + 4*x -4)*(x^3 -8*x^2 + 16*x -4)*(x^3 -2*x^2 -8*x -4)*(x^2 -2*x -1)^2; T[145,13]=(x -2)*(x^3 + 6*x^2 -4*x -8)*(x^3 + 2*x^2 -12*x -8)*(x + 2)^2*(x^2 + 2*x -7)^2; T[145,17]=(x + 2)*(x^2 -8)*(x^3 -40*x + 76)*(x^3 + 4*x^2 -40*x -68)*(x^2 + 4*x -4)^2; T[145,19]=(x + 2)*(x^2 + 4*x -4)*(x^3 + 10*x^2 + 28*x + 20)*(x^3 -28*x + 52)*(x -6)^4; T[145,23]=(x -2)*(x^2 + 12*x + 28)*(x^3 -16*x^2 + 76*x -92)*(x^3 -14*x^2 + 60*x -76)*(x^2 + 4*x -28)^2; T[145,29]=(x + 1)^4*(x -1)^9; T[145,31]=(x -2)*(x^2 + 4*x -68)*(x^3 -12*x^2 + 20*x -4)*(x^3 + 14*x^2 + 60*x + 76)*(x^2 -6*x -41)^2; T[145,37]=(x -10)*(x^2 -72)*(x^3 + 8*x^2 -24*x -92)*(x^3 -4*x^2 -40*x + 68)*(x + 4)^4; T[145,41]=(x -2)*(x^3 + 10*x^2 + 20*x -8)*(x^3 + 2*x^2 -84*x + 232)*(x + 6)^2*(x^2 -8*x -56)^2; T[145,43]=(x -8)*(x^3 + 10*x^2 + 28*x + 20)*(x^3 -2*x^2 -132*x -4)*(x + 6)^2*(x^2 -10*x + 23)^2; T[145,47]=(x + 12)*(x^2 + 12*x + 4)*(x^3 -18*x^2 + 60*x + 92)*(x^3 -14*x^2 + 60*x -76)*(x^2 -2*x -17)^2; T[145,53]=(x + 6)*(x^2 -4*x -28)*(x^3 -10*x^2 + 20*x + 8)*(x^3 -6*x^2 -4*x + 8)*(x^2 -2*x -71)^2; T[145,59]=(x + 8)*(x^3 -8*x^2 -64*x -80)*(x^3 -4*x^2 -48*x -80)*(x^2 -4*x -28)^2*(x )^2; T[145,61]=(x + 6)*(x^2 -4*x -28)*(x^3 + 6*x^2 -108*x -216)*(x^3 -6*x^2 -4*x + 40)*(x^2 + 4*x -4)^2; T[145,67]=(x -2)*(x^2 + 4*x -68)*(x^3 + 10*x^2 + 28*x + 20)*(x^3 -28*x^2 + 252*x -716)*(x^2 -32)^2; T[145,71]=(x + 12)*(x^2 + 8*x -112)*(x^3 -28*x^2 + 176*x + 272)*(x^3 -24*x^2 + 176*x -368)*(x^2 + 12*x + 28)^2; T[145,73]=(x + 6)*(x^2 -72)*(x^3 + 16*x^2 -100*x -1700)*(x^3 + 4*x^2 -180*x -1108)*(x -4)^4; T[145,79]=(x + 10)*(x^2 -12*x -36)*(x^3 -8*x^2 -56*x + 20)*(x^3 + 6*x^2 -88*x -460)*(x^2 + 2*x -1)^2; T[145,83]=(x + 14)*(x^2 -20*x + 92)*(x^3 + 2*x^2 -32*x + 52)*(x^3 -12*x^2 + 148)*(x^2 -4*x -28)^2; T[145,89]=(x -18)*(x^2 + 4*x -28)*(x^3 -22*x^2 + 124*x -200)*(x^3 + 10*x^2 + 12*x -40)*(x^2 + 8*x -56)^2; T[145,97]=(x -2)*(x^3 + 36*x^2 + 348*x + 452)*(x^3 -8*x^2 -68*x -76)*(x^2 + 8*x -56)^3; T[146,2]=(x^2 -x + 2)*(x^4 -x^3 + x^2 -2*x + 4)*(x^4 + 3*x^3 + 5*x^2 + 6*x + 4)*(x + 1)^3*(x -1)^4; T[146,3]=(x^4 -8*x^2 + 4*x + 4)*(x^3 -8*x + 4)*(x^2 -x -3)^2*(x^2 + 3*x + 1)^2*(x )^2; T[146,5]=(x^4 -2*x^3 -14*x^2 + 26*x + 2)*(x^3 + 2*x^2 -4*x -6)*(x -2)^2*(x^2 + x -3)^2*(x^2 + 3*x + 1)^2; T[146,7]=(x^4 -22*x^2 + 6*x + 2)*(x^3 -8*x^2 + 16*x -2)*(x -2)^2*(x + 1)^4*(x + 3)^4; T[146,11]=(x^4 -24*x^2 -16*x + 80)*(x^3 -2*x^2 -28*x + 72)*(x + 2)^2*(x^2 + 3*x + 1)^2*(x^2 -7*x + 9)^2; T[146,13]=(x^4 + 4*x^3 -38*x^2 -106*x + 314)*(x^3 -4*x^2 + 2)*(x + 6)^2*(x^2 -x -11)^2*(x^2 + x -3)^2; T[146,17]=(x^4 + 4*x^3 -16*x^2 -64*x -16)*(x^3 + 2*x^2 -28*x -72)*(x -2)^2*(x^2 + 4*x -9)^2*(x^2 -45)^2; T[146,19]=(x^4 -32*x^2 -48*x -16)*(x^3 -8*x^2 -8*x + 112)*(x -8)^2*(x + 7)^4*(x -1)^4; T[146,23]=(x^3 -4*x^2 -16*x + 48)*(x^4 + 12*x^3 + 8*x^2 -240*x -416)*(x -4)^2*(x^2 -13*x + 39)^2*(x^2 + 15*x + 55)^2; T[146,29]=(x^4 -2*x^3 -50*x^2 -10*x + 218)*(x^3 + 6*x^2 -104*x -582)*(x -2)^2*(x^2 -6*x -11)^2*(x^2 -2*x -51)^2; T[146,31]=(x^3 -2*x^2 -24*x -18)*(x^4 + 6*x^3 -42*x^2 -170*x + 362)*(x + 2)^2*(x^2 -2*x -44)^2*(x^2 -6*x -4)^2; T[146,37]=(x^3 + 14*x^2 -4*x -344)*(x^4 -12*x^3 + 16*x^2 + 48*x -16)*(x + 6)^2*(x^2 -8*x + 3)^2*(x^2 + 4*x -41)^2; T[146,41]=(x^3 + 6*x^2 + 4*x -12)*(x^4 -88*x^2 -396*x -404)*(x -6)^2*(x^2 -20)^2*(x + 6)^4; T[146,43]=(x^4 -20*x^3 + 112*x^2 -48*x -656)*(x^3 + 6*x^2 -20*x -88)*(x + 2)^2*(x^2 -6*x -43)^2*(x + 1)^4; T[146,47]=(x^3 -6*x^2 -36*x + 162)*(x^4 + 18*x^3 + 50*x^2 -378*x -790)*(x -6)^2*(x^2 + 6*x -11)^2*(x -9)^4; T[146,53]=(x^3 + 4*x^2 -20*x -66)*(x^4 -8*x^3 -194*x^2 + 862*x + 8554)*(x -10)^2*(x^2 -6*x -71)^2*(x^2 + 2*x -51)^2; T[146,59]=(x^4 -20*x^3 + 128*x^2 -256*x -16)*(x^3 -2*x^2 -28*x + 72)*(x + 6)^2*(x^2 + 12*x + 16)^2*(x )^4; T[146,61]=(x^3 -22*x^2 + 132*x -232)*(x^4 -12*x^3 -64*x^2 + 864*x -1168)*(x + 14)^2*(x^2 -7*x + 1)^2*(x^2 + 9*x + 17)^2; T[146,67]=(x^3 + 4*x^2 -80*x -212)*(x^4 + 4*x^3 -96*x^2 + 348*x -364)*(x -8)^2*(x^2 -16*x + 19)^2*(x^2 -4*x -113)^2; T[146,71]=(x^3 -16*x^2 + 16*x + 96)*(x^4 + 24*x^3 + 96*x^2 -1120*x -6592)*(x^2 + 21*x + 109)^2*(x^2 -3*x -27)^2*(x )^2; T[146,73]=(x + 1)^8*(x -1)^9; T[146,79]=(x^3 -8*x^2 -176*x + 1552)*(x^4 -40*x^3 + 520*x^2 -2032*x -2144)*(x + 4)^2*(x^2 + 19*x + 79)^2*(x^2 -x -29)^2; T[146,83]=(x^3 -10*x^2 -68*x + 24)*(x^4 + 4*x^3 -56*x^2 -32*x + 208)*(x + 14)^2*(x^2 -7*x -69)^2*(x^2 + 3*x -9)^2; T[146,89]=(x^4 + 12*x^3 -96*x^2 -508*x -436)*(x^3 + 6*x^2 + 4*x -12)*(x + 6)^2*(x^2 -12*x -81)^2*(x^2 -12*x + 31)^2; T[146,97]=(x^3 + 14*x^2 -132*x -1864)*(x^4 -96*x^2 -16*x + 2144)*(x + 10)^2*(x^2 + 9*x + 9)^2*(x^2 + 5*x -23)^2; T[147,2]=(x -2)^2*(x -1)^2*(x^2 + 2*x -1)^2*(x + 1)^3; T[147,3]=(x^2 + 3)*(x + 1)^4*(x -1)^5; T[147,5]=(x^2 -4*x + 2)*(x^2 + 4*x + 2)*(x -2)^2*(x )^2*(x + 2)^3; T[147,7]=(x + 1)*(x )^10; T[147,11]=(x -4)^5*(x + 2)^6; T[147,13]=(x + 1)*(x -2)*(x -1)*(x^2 -8*x + 14)*(x^2 + 8*x + 14)*(x + 2)^2*(x )^2; T[147,17]=(x -6)*(x^2 + 4*x -14)*(x^2 -4*x -14)*(x + 6)^2*(x )^4; T[147,19]=(x + 4)*(x + 1)*(x -1)*(x -4)^2*(x^2 -8)^2*(x )^2; T[147,23]=(x -8)^2*(x^2 + 4*x -28)^2*(x )^5; T[147,29]=(x -2)^2*(x -4)^2*(x^2 + 8*x + 8)^2*(x + 2)^3; T[147,31]=(x -9)*(x + 9)*(x^2 + 8*x + 8)*(x^2 -8*x + 8)*(x )^5; T[147,37]=(x + 6)^2*(x -3)^2*(x -6)^3*(x + 4)^4; T[147,41]=(x + 2)*(x + 10)*(x -10)*(x^2 -4*x -14)*(x^2 + 4*x -14)*(x -2)^2*(x )^2; T[147,43]=(x -5)^2*(x + 12)^2*(x^2 -32)^2*(x + 4)^3; T[147,47]=(x -6)*(x + 6)*(x^2 -8)^2*(x )^5; T[147,53]=(x + 10)^2*(x -12)^2*(x -6)^3*(x + 2)^4; T[147,59]=(x^2 + 8*x + 8)*(x^2 -8*x + 8)*(x + 12)^2*(x )^2*(x -12)^3; T[147,61]=(x -10)*(x -2)*(x + 10)*(x^2 + 16*x + 46)*(x^2 -16*x + 46)*(x + 2)^2*(x )^2; T[147,67]=(x + 5)^2*(x^2 -32)^2*(x -4)^5; T[147,71]=(x -16)^2*(x + 6)^2*(x^2 + 4*x -124)^2*(x )^3; T[147,73]=(x + 3)*(x -3)*(x -6)*(x^2 + 8*x -82)*(x^2 -8*x -82)*(x + 6)^2*(x )^2; T[147,79]=(x + 1)^2*(x -8)^2*(x^2 -16*x + 32)^2*(x + 16)^3; T[147,83]=(x -6)*(x -12)*(x + 6)*(x^2 -8*x -112)*(x^2 + 8*x -112)*(x + 12)^2*(x )^2; T[147,89]=(x + 16)*(x -16)*(x -14)*(x^2 -20*x + 82)*(x^2 + 20*x + 82)*(x + 14)^2*(x )^2; T[147,97]=(x + 18)*(x + 6)*(x -6)*(x^2 + 8*x + 14)*(x^2 -8*x + 14)*(x -18)^2*(x )^2; T[148,2]=(x^2 + 2)*(x^2 + 2*x + 2)*(x -1)^2*(x + 1)^2*(x )^9; T[148,3]=(x + 1)*(x^2 + x -4)*(x^2 + x -1)^2*(x^2 -3*x -1)^2*(x + 3)^3*(x -1)^3; T[148,5]=(x + 4)*(x -2)^2*(x^2 + x -3)^2*(x^2 -x -11)^2*(x + 2)^3*(x )^3; T[148,7]=(x + 3)*(x^2 -x -4)*(x^2 + 2*x -4)^2*(x^2 -2*x -12)^2*(x + 1)^6; T[148,11]=(x -5)*(x^2 -x -4)*(x^2 + 5*x + 5)^2*(x^2 + x -3)^2*(x + 5)^3*(x -3)^3; T[148,13]=(x )*(x -2)^2*(x^2 + x -3)^2*(x^2 -x -11)^2*(x + 4)^3*(x + 2)^3; T[148,17]=(x^2 -6*x -8)*(x^2 -20)^2*(x -6)^3*(x )^3*(x + 6)^5; T[148,19]=(x^2 + 6*x -8)*(x^2 -20)^2*(x )^3*(x -2)^8; T[148,23]=(x + 6)*(x + 2)^2*(x^2 + x -11)^2*(x^2 + 3*x -27)^2*(x -2)^3*(x -6)^3; T[148,29]=(x^2 -68)*(x^2 + 3*x -59)^2*(x^2 -3*x -27)^2*(x -6)^3*(x + 6)^4; T[148,31]=(x -4)*(x^2 + 10*x + 8)*(x^2 -3*x -1)^2*(x^2 -17*x + 71)^2*(x + 4)^6; T[148,37]=(x -1)^8*(x + 1)^9; T[148,41]=(x^2 -5*x + 2)*(x^2 -17*x + 71)^2*(x^2 -9*x -9)^2*(x + 9)^7; T[148,43]=(x -4)*(x^2 -68)*(x^2 + 6*x + 4)^2*(x^2 + 6*x -4)^2*(x -2)^3*(x -8)^3; T[148,47]=(x + 7)*(x^2 -17*x + 68)*(x^2 -2*x -12)^2*(x^2 -2*x -4)^2*(x -3)^3*(x + 9)^3; T[148,53]=(x -9)*(x^2 -7*x -94)*(x^2 + 8*x -4)^2*(x + 3)^3*(x -1)^3*(x + 6)^4; T[148,59]=(x + 4)*(x^2 + 2*x -16)*(x^2 -14*x + 36)^2*(x^2 + 14*x + 44)^2*(x -12)^3*(x -8)^3; T[148,61]=(x^2 + 14*x + 32)*(x^2 -19*x + 89)^2*(x^2 + 3*x -79)^2*(x -8)^3*(x + 8)^4; T[148,67]=(x + 12)*(x^2 + 12*x -32)*(x^2 + 9*x -11)^2*(x^2 -11*x -51)^2*(x + 4)^3*(x -8)^3; T[148,71]=(x -3)*(x^2 -15*x + 52)*(x^2 + 12*x -44)^2*(x -9)^3*(x + 15)^3*(x -6)^4; T[148,73]=(x + 5)*(x^2 + 3*x -206)*(x^2 -3*x -29)^2*(x^2 + 21*x + 107)^2*(x + 1)^3*(x -11)^3; T[148,79]=(x -6)*(x^2 -6*x -144)*(x^2 -3*x -99)^2*(x^2 + 7*x -147)^2*(x + 10)^3*(x -4)^3; T[148,83]=(x + 1)*(x^2 -7*x + 8)*(x^2 -20*x + 48)^2*(x^2 + 20*x + 80)^2*(x -9)^3*(x + 15)^3; T[148,89]=(x -2)*(x^2 -18*x + 64)*(x^2 + 12*x + 16)^2*(x^2 + 4*x -48)^2*(x -4)^3*(x -6)^3; T[148,97]=(x^2 + 10*x + 8)*(x )*(x^2 + 4*x -204)^2*(x^2 -8*x -4)^2*(x -8)^3*(x -4)^3; T[149,2]=(x^3 + x^2 -2*x -1)*(x^9 + x^8 -15*x^7 -12*x^6 + 75*x^5 + 48*x^4 -137*x^3 -76*x^2 + 68*x + 39); T[149,3]=(x^3 + 4*x^2 + 3*x -1)*(x^9 -6*x^8 + 55*x^6 -67*x^5 -125*x^4 + 235*x^3 -6*x^2 -117*x + 27); T[149,5]=(x^3 + 3*x^2 -4*x -13)*(x^9 + x^8 -25*x^7 -4*x^6 + 202*x^5 -83*x^4 -529*x^3 + 305*x^2 + 392*x -221); T[149,7]=(x^3 + 5*x^2 + 6*x + 1)*(x^9 -3*x^8 -34*x^7 + 117*x^6 + 208*x^5 -916*x^4 + 144*x^3 + 1056*x^2 -128*x -64); T[149,11]=(x^3 + 5*x^2 -8*x + 1)*(x^9 -5*x^8 -33*x^7 + 202*x^6 + 66*x^5 -1503*x^4 + 997*x^3 + 2817*x^2 -3392*x + 981); T[149,13]=(x^3 + 3*x^2 -4*x -13)*(x^9 -7*x^8 -28*x^7 + 277*x^6 -152*x^5 -2028*x^4 + 3072*x^3 + 32*x^2 -512*x -64); T[149,17]=(x^3 -5*x^2 -22*x + 97)*(x^9 + 5*x^8 -75*x^7 -342*x^6 + 1572*x^5 + 7471*x^4 -7485*x^3 -53675*x^2 -36298*x + 24053); T[149,19]=(x^3 + 18*x^2 + 101*x + 167)*(x^9 -30*x^8 + 337*x^7 -1533*x^6 -768*x^5 + 38360*x^4 -171648*x^3 + 358384*x^2 -366592*x + 145856); T[149,23]=(x^3 -8*x^2 + 19*x -13)*(x^9 + 4*x^8 -88*x^7 -135*x^6 + 2377*x^5 -1281*x^4 -10871*x^3 + 5476*x^2 + 11587*x -6341); T[149,29]=(x^3 + 2*x^2 -29*x -71)*(x^9 + 16*x^8 + 52*x^7 -397*x^6 -3233*x^5 -7917*x^4 -6043*x^3 + 3944*x^2 + 7739*x + 2861); T[149,31]=(x^3 + 18*x^2 + 87*x + 83)*(x^9 -22*x^8 + 91*x^7 + 991*x^6 -7564*x^5 -3356*x^4 + 98336*x^3 -32960*x^2 -312448*x + 161984); T[149,37]=(x^3 -3*x^2 -81*x + 27)*(x^9 + 7*x^8 -142*x^7 -828*x^6 + 5789*x^5 + 18971*x^4 -88867*x^3 + 40715*x^2 + 104171*x -75969); T[149,41]=(x^3 -6*x^2 -37*x + 181)*(x^9 -6*x^8 -185*x^7 + 1007*x^6 + 9700*x^5 -40160*x^4 -155136*x^3 + 317376*x^2 -186112*x + 35328); T[149,43]=(x^3 + 4*x^2 -109*x -533)*(x^9 -4*x^8 -202*x^7 + 423*x^6 + 10581*x^5 + 9877*x^4 -113871*x^3 -256632*x^2 -68795*x + 109051); T[149,47]=(x^3 + 2*x^2 -85*x -337)*(x^9 + 6*x^8 -273*x^7 -1593*x^6 + 21800*x^5 + 134552*x^4 -414736*x^3 -3462160*x^2 -4525952*x + 1225536); T[149,53]=(x^3 -8*x^2 -23*x -13)*(x^9 + 2*x^8 -170*x^7 -1081*x^6 + 4013*x^5 + 59133*x^4 + 216201*x^3 + 327714*x^2 + 153685*x -43997); T[149,59]=(x^3 -x^2 -30*x + 43)*(x^9 -43*x^8 + 711*x^7 -5710*x^6 + 23024*x^5 -40699*x^4 + 4089*x^3 + 67513*x^2 -45344*x -13589); T[149,61]=(x^3 -3*x^2 -46*x -1)*(x^9 -x^8 -191*x^7 + 246*x^6 + 11156*x^5 -10667*x^4 -200993*x^3 -122141*x^2 + 830518*x + 1028703); T[149,67]=(x^3 + 23*x^2 + 174*x + 433)*(x^9 -33*x^8 + 162*x^7 + 4853*x^6 -59204*x^5 + 97700*x^4 + 1357024*x^3 -7316416*x^2 + 13408448*x -8246976); T[149,71]=(x^3 + 5*x^2 -106*x -97)*(x^9 -15*x^8 -55*x^7 + 1188*x^6 -1656*x^5 -17961*x^4 + 52241*x^3 -8251*x^2 -51176*x + 2931); T[149,73]=(x^3 + x^2 -212*x -169)*(x^9 + 11*x^8 -145*x^7 -2102*x^6 + 706*x^5 + 89825*x^4 + 247339*x^3 -714453*x^2 -3446560*x -3257073); T[149,79]=(x^3 + 9*x^2 -x -113)*(x^9 -x^8 -549*x^7 + 173*x^6 + 106772*x^5 + 52012*x^4 -8541904*x^3 -11412320*x^2 + 225852288*x + 468778432); T[149,83]=(x^3 -2*x^2 -x + 1)*(x^9 + 4*x^8 -384*x^7 -1765*x^6 + 42213*x^5 + 217533*x^4 -1021329*x^3 -5009504*x^2 -3680845*x + 2245797); T[149,89]=(x^3 + 9*x^2 -85*x -757)*(x^9 + 19*x^8 -37*x^7 -1467*x^6 + 2336*x^5 + 33412*x^4 -103920*x^3 -16720*x^2 + 313344*x -239936); T[149,97]=(x^3 + 3*x^2 -298*x -2267)*(x^9 + x^8 -462*x^7 + 79*x^6 + 50736*x^5 + 9648*x^4 -1868176*x^3 -930512*x^2 + 17893120*x + 3173696); T[150,2]=(x^2 + 2*x + 2)*(x^2 -2*x + 2)*(x^2 -x + 2)*(x^2 + x + 2)^2*(x -1)^4*(x + 1)^5; T[150,3]=(x^2 -x + 3)*(x^2 + x + 3)*(x -1)^7*(x + 1)^8; T[150,5]=(x + 1)*(x -1)^2*(x )^16; T[150,7]=(x -4)*(x + 3)^2*(x + 4)^2*(x -3)^2*(x -2)^3*(x + 2)^3*(x )^6; T[150,11]=(x )^3*(x + 3)^4*(x -2)^6*(x + 4)^6; T[150,13]=(x -6)*(x + 6)*(x -4)^2*(x + 1)^2*(x + 4)^2*(x -1)^2*(x -2)^4*(x + 2)^5; T[150,17]=(x + 6)*(x + 3)^2*(x -6)^2*(x -3)^2*(x + 2)^5*(x -2)^7; T[150,19]=(x )^2*(x + 4)^3*(x -5)^4*(x + 5)^4*(x -4)^6; T[150,23]=(x + 4)*(x -4)*(x -6)^4*(x + 6)^4*(x )^9; T[150,29]=(x + 6)^3*(x -10)^4*(x + 2)^6*(x )^6; T[150,31]=(x + 8)^2*(x -8)^3*(x -2)^4*(x + 3)^4*(x )^6; T[150,37]=(x -10)^2*(x + 10)^4*(x + 2)^6*(x -2)^7; T[150,41]=(x -2)^2*(x + 6)^3*(x + 3)^4*(x + 8)^4*(x -10)^6; T[150,43]=(x + 1)^2*(x -1)^2*(x + 4)^7*(x -4)^8; T[150,47]=(x + 12)^2*(x -2)^2*(x -12)^2*(x + 2)^2*(x + 8)^3*(x )^3*(x -8)^5; T[150,53]=(x + 4)^2*(x -4)^2*(x -10)^2*(x -6)^4*(x + 10)^4*(x + 6)^5; T[150,59]=(x -10)^2*(x + 10)^4*(x + 4)^6*(x )^7; T[150,61]=(x + 10)^3*(x -7)^4*(x + 2)^6*(x -2)^6; T[150,67]=(x -8)*(x -4)*(x + 8)*(x -13)^2*(x + 13)^2*(x + 12)^2*(x + 4)^2*(x + 3)^2*(x -3)^2*(x -12)^4; T[150,71]=(x )^3*(x -12)^6*(x + 8)^10; T[150,73]=(x -4)*(x + 2)*(x + 4)*(x + 10)^2*(x -11)^2*(x + 11)^2*(x + 14)^2*(x -2)^2*(x -14)^2*(x -10)^4; T[150,79]=(x -8)^3*(x + 10)^4*(x )^12; T[150,83]=(x + 4)*(x -4)*(x -9)^2*(x + 9)^2*(x + 6)^2*(x -6)^2*(x + 12)^3*(x -12)^6; T[150,89]=(x + 10)^2*(x -18)^3*(x -15)^4*(x )^4*(x + 6)^6; T[150,97]=(x + 8)*(x -8)*(x -17)^2*(x + 17)^2*(x + 2)^5*(x -2)^8; T[151,2]=(x^3 -5*x + 3)*(x^3 + 2*x^2 -x -1)*(x^6 -x^5 -7*x^4 + 3*x^3 + 13*x^2 + 3*x -1); T[151,3]=(x^3 + x^2 -2*x -1)*(x^6 + 5*x^5 -4*x^4 -51*x^3 -68*x^2 -12*x + 8)*(x -2)^3; T[151,5]=(x^3 -5*x^2 -2*x + 25)*(x^3 + 7*x^2 + 14*x + 7)*(x^6 -6*x^5 + 5*x^4 + 16*x^3 -8*x^2 -12*x -1); T[151,7]=(x^6 -3*x^5 -33*x^4 + 119*x^3 + 200*x^2 -1100*x + 1000)*(x + 1)^3*(x + 2)^3; T[151,11]=(x^3 + x^2 -20*x + 25)*(x^3 + 5*x^2 -x -13)*(x^6 -8*x^5 + 14*x^4 + 23*x^3 -64*x^2 -7*x + 49); T[151,13]=(x^3 + 2*x^2 -32*x -24)*(x^3 + x^2 -16*x + 13)*(x^6 + x^5 -40*x^4 -x^3 + 236*x^2 -36*x -328); T[151,17]=(x^3 -9*x^2 + 22*x -15)*(x^3 + 8*x^2 + 5*x -43)*(x^6 -9*x^5 -21*x^4 + 245*x^3 + 117*x^2 -869*x + 253); T[151,19]=(x^3 -3*x^2 -36*x + 81)*(x^3 + 3*x^2 -46*x -139)*(x^6 + 6*x^5 -45*x^4 -150*x^3 + 524*x^2 + 558*x + 115); T[151,23]=(x^3 -20*x + 24)*(x^3 -21*x -7)*(x^6 + 4*x^5 -47*x^4 + 27*x^3 + 208*x^2 -208*x -64); T[151,29]=(x^3 + x^2 -72*x + 41)*(x^3 -3*x^2 -62*x -129)*(x^6 + 2*x^5 -61*x^4 -18*x^3 + 244*x^2 -14*x -5); T[151,31]=(x^3 + x^2 -8*x -3)*(x^3 + x^2 -30*x -43)*(x^6 + 8*x^5 -39*x^4 -386*x^3 -362*x^2 + 982*x + 271); T[151,37]=(x^3 -13*x^2 + 40*x -29)*(x^3 -3*x^2 -42*x -37)*(x^6 + 12*x^5 -51*x^4 -1032*x^3 -1344*x^2 + 19774*x + 56789); T[151,41]=(x^3 + 21*x^2 + 119*x + 91)*(x^6 -41*x^5 + 687*x^4 -6011*x^3 + 28912*x^2 -72348*x + 73432)*(x )^3; T[151,43]=(x^3 -16*x^2 + 41*x + 197)*(x^3 + x^2 -8*x -3)*(x^6 -x^5 -163*x^4 + 107*x^3 + 4263*x^2 + 2315*x -11425); T[151,47]=(x^3 -3*x^2 -109*x + 559)*(x^3 + 13*x^2 + 52*x + 61)*(x^6 -28*x^5 + 206*x^4 + 715*x^3 -14856*x^2 + 57597*x -65843); T[151,53]=(x^3 + 8*x^2 -23*x -197)*(x^3 + 6*x^2 -144*x -648)*(x^6 -14*x^5 -53*x^4 + 1545*x^3 -6240*x^2 -524*x + 24664); T[151,59]=(x^3 -23*x^2 + 168*x -387)*(x^3 + x^2 -100*x + 181)*(x^6 -12*x^5 -x^4 + 24*x^3 + 6*x^2 -12*x -5); T[151,61]=(x^3 + 8*x^2 -112*x -320)*(x^3 + x^2 -58*x + 13)*(x^6 -5*x^5 -154*x^4 + 251*x^3 + 5490*x^2 + 3168*x -16984); T[151,67]=(x^3 + x^2 -170*x + 41)*(x^3 -2*x^2 -132*x + 72)*(x^6 + 15*x^5 -122*x^4 -1709*x^3 + 5026*x^2 + 30272*x + 14696); T[151,71]=(x^3 -20*x -24)*(x^3 + 14*x^2 -49*x -889)*(x^6 + 2*x^5 -151*x^4 + 327*x^3 + 1730*x^2 -1832*x -4024); T[151,73]=(x^3 -10*x^2 + 72)*(x^3 + x^2 -65*x -169)*(x^6 + 7*x^5 -325*x^4 -1647*x^3 + 24708*x^2 + 35552*x -135872); T[151,79]=(x^3 + 3*x^2 -88*x -293)*(x^3 + 26*x^2 + 192*x + 360)*(x^6 + 9*x^5 -270*x^4 -1667*x^3 + 18962*x^2 + 74696*x -195080); T[151,83]=(x^3 + 3*x^2 -25*x -83)*(x^3 -28*x^2 + 172*x + 296)*(x^6 + 11*x^5 -155*x^4 -1371*x^3 + 9914*x^2 + 44944*x -260696); T[151,89]=(x^3 -36*x^2 + 412*x -1464)*(x^6 -36*x^5 + 364*x^4 + 424*x^3 -22080*x^2 + 67200*x + 64000)*(x + 12)^3; T[151,97]=(x^3 + 5*x^2 -238*x -965)*(x^3 -63*x + 189)*(x^6 -11*x^5 + 3*x^4 + 105*x^3 + 3*x^2 -291*x -193); T[152,2]=(x -1)*(x + 1)*(x^2 + 2)*(x )^13; T[152,3]=(x^3 -x^2 -10*x + 8)*(x -2)^2*(x + 1)^3*(x -1)^4*(x + 2)^5; T[152,5]=(x^3 -x^2 -10*x + 8)*(x + 1)^3*(x + 4)^3*(x -3)^4*(x )^4; T[152,7]=(x^3 -4*x^2 -5*x + 16)*(x + 3)^3*(x -3)^4*(x + 1)^7; T[152,11]=(x + 3)*(x^3 + 5*x^2 -2*x -8)*(x -5)^2*(x + 6)^3*(x -2)^4*(x -3)^4; T[152,13]=(x -1)*(x^3 -5*x^2 -2*x + 8)*(x + 1)^3*(x -5)^3*(x + 4)^7; T[152,17]=(x + 5)*(x -5)*(x^3 -2*x^2 -9*x + 2)*(x + 3)^6*(x -3)^6; T[152,19]=(x -1)^8*(x + 1)^9; T[152,23]=(x^3 + 5*x^2 -64*x -256)*(x -8)^2*(x -3)^3*(x + 1)^4*(x )^5; T[152,29]=(x + 3)*(x -2)*(x^3 + 9*x^2 -4*x -4)*(x + 2)^2*(x + 5)^3*(x -9)^3*(x -6)^4; T[152,31]=(x -8)*(x -4)^3*(x + 8)^3*(x )^3*(x + 4)^7; T[152,37]=(x + 10)*(x -10)^2*(x + 2)^6*(x -2)^8; T[152,41]=(x -6)*(x^3 -8*x^2 -20*x + 128)*(x -10)^2*(x )^3*(x + 6)^4*(x + 8)^4; T[152,43]=(x + 7)*(x + 8)*(x^3 -17*x^2 + 24*x + 368)*(x -1)^2*(x -4)^3*(x -8)^3*(x + 1)^4; T[152,47]=(x + 8)*(x + 9)*(x^3 + x^2 -72*x -256)*(x + 1)^2*(x -8)^3*(x )^3*(x + 3)^4; T[152,53]=(x + 8)*(x -9)*(x^3 -x^2 -134*x + 256)*(x + 4)^2*(x + 3)^3*(x + 1)^3*(x -12)^4; T[152,59]=(x -14)*(x -1)*(x^3 + 23*x^2 + 166*x + 376)*(x -6)^2*(x -9)^3*(x -15)^3*(x + 6)^4; T[152,61]=(x + 5)*(x -14)*(x^3 -3*x^2 -28*x + 92)*(x + 13)^2*(x + 10)^3*(x -2)^3*(x + 1)^4; T[152,67]=(x -13)*(x^3 -15*x^2 + 44*x -32)*(x )*(x + 12)^2*(x -3)^3*(x -5)^3*(x + 4)^4; T[152,71]=(x -10)*(x^3 + 12*x^2 -76*x -928)*(x -6)^4*(x + 6)^4*(x -2)^5; T[152,73]=(x + 15)*(x^3 -4*x^2 -67*x + 326)*(x -9)^6*(x + 7)^7; T[152,79]=(x + 4)*(x^3 -26*x^2 + 184*x -256)*(x -8)^6*(x + 10)^7; T[152,83]=(x -10)*(x -4)*(x^3 + 6*x^2 -112*x -736)*(x + 12)^2*(x -12)^4*(x + 6)^6; T[152,89]=(x^3 -18*x^2 -16*x + 1024)*(x + 12)^4*(x )^4*(x -12)^6; T[152,97]=(x -16)*(x -14)*(x^3 + 8*x^2 -20*x -128)*(x + 8)^2*(x + 10)^3*(x + 2)^3*(x -8)^4; T[153,2]=(x -2)*(x -1)*(x + 2)*(x^2 -x -4)*(x^2 + x -4)^2*(x + 1)^3*(x )^3; T[153,3]=(x -1)*(x^2 + 3)*(x + 1)^2*(x )^10; T[153,5]=(x -2)*(x -1)*(x + 1)*(x + 3)*(x^2 + 3*x -2)*(x -3)^2*(x^2 -3*x -2)^2*(x + 2)^3; T[153,7]=(x + 2)^2*(x + 4)^3*(x -4)^4*(x )^6; T[153,11]=(x^2 -x -4)*(x -3)^2*(x^2 + x -4)^2*(x + 3)^3*(x )^4; T[153,13]=(x + 5)^2*(x + 1)^3*(x^2 -5*x + 2)^3*(x + 2)^4; T[153,17]=(x + 1)^6*(x -1)^9; T[153,19]=(x^2 -3*x -36)^3*(x + 4)^4*(x + 1)^5; T[153,23]=(x + 9)*(x + 7)*(x + 4)*(x -7)*(x^2 -9*x + 16)*(x -9)^2*(x^2 + 9*x + 16)^2*(x -4)^3; T[153,29]=(x + 6)^3*(x^2 -68)^3*(x -6)^6; T[153,31]=(x -2)^3*(x^2 + 2*x -16)^3*(x -4)^6; T[153,37]=(x -10)^2*(x + 4)^3*(x^2 + 2*x -16)^3*(x + 2)^4; T[153,41]=(x -3)*(x + 9)*(x -6)*(x -9)*(x^2 -3*x -2)*(x + 3)^2*(x^2 + 3*x -2)^2*(x + 6)^3; T[153,43]=(x -1)^2*(x + 7)^3*(x^2 + 3*x -36)^3*(x -4)^4; T[153,47]=(x -6)*(x -12)*(x + 12)*(x^2 -14*x + 32)*(x + 6)^2*(x^2 + 14*x + 32)^2*(x )^4; T[153,53]=(x -12)*(x + 12)*(x^2 + 8*x -52)*(x^2 -8*x -52)^2*(x + 6)^3*(x -6)^4; T[153,59]=(x -12)*(x^2 + 6*x -8)*(x + 6)^2*(x^2 -6*x -8)^2*(x -6)^3*(x + 12)^3; T[153,61]=(x -2)^2*(x -8)^3*(x^2 -10*x + 8)^3*(x + 10)^4; T[153,67]=(x + 4)^3*(x -4)^12; T[153,71]=(x -4)*(x + 12)*(x + 8)*(x -8)*(x^2 + 4*x -64)*(x -12)^2*(x^2 -4*x -64)^2*(x + 4)^3; T[153,73]=(x )^2*(x -2)^3*(x^2 + 8*x -52)^3*(x + 6)^4; T[153,79]=(x + 6)^2*(x + 10)^3*(x^2 -6*x -144)^3*(x -12)^4; T[153,83]=(x -6)*(x^2 -10*x + 8)*(x -4)^2*(x + 6)^2*(x^2 + 10*x + 8)^2*(x + 4)^4; T[153,89]=(x + 2)*(x -2)*(x + 10)*(x^2 + 6*x -8)*(x^2 -6*x -8)^2*(x -10)^3*(x )^3; T[153,97]=(x -8)^2*(x + 16)^3*(x^2 + 14*x + 32)^3*(x -2)^4; T[154,2]=(x^2 -x + 2)*(x^4 -x^2 + 4)*(x^2 + 2)^2*(x^2 + 2*x + 2)^2*(x -1)^3*(x + 1)^4; T[154,3]=(x^2 + 2*x -4)*(x -1)^2*(x + 3)^2*(x + 2)^2*(x^2 -2*x -4)^2*(x )^2*(x -2)^3*(x + 1)^4; T[154,5]=(x + 4)*(x^2 -2*x -4)*(x -2)^2*(x + 1)^2*(x -3)^2*(x )^2*(x -1)^4*(x + 2)^6; T[154,7]=(x^2 + 2*x + 7)^2*(x + 1)^7*(x -1)^10; T[154,11]=(x^2 + 11)*(x -1)^9*(x + 1)^10; T[154,13]=(x^2 + 2*x -4)*(x -2)^2*(x^2 -2*x -4)^2*(x -4)^6*(x + 4)^7; T[154,17]=(x + 4)*(x^2 + 4*x -16)*(x )*(x -6)^2*(x + 6)^2*(x -4)^2*(x^2 + 2*x -4)^2*(x -2)^3*(x + 2)^4; T[154,19]=(x -4)*(x^2 + 10*x + 20)*(x^2 -4*x -16)^2*(x + 6)^3*(x -2)^4*(x )^7; T[154,23]=(x + 8)*(x + 5)^2*(x -3)^2*(x + 4)^2*(x^2 + 4*x -16)^2*(x )^2*(x + 1)^4*(x -4)^4; T[154,29]=(x -2)*(x^2 -20)*(x -10)^2*(x + 2)^2*(x^2 -8*x -4)^2*(x )^4*(x + 6)^6; T[154,31]=(x + 8)*(x + 10)*(x + 2)*(x -10)^2*(x -1)^2*(x + 4)^2*(x -5)^2*(x -2)^2*(x^2 + 10*x + 20)^2*(x -7)^4; T[154,37]=(x -10)*(x + 2)*(x^2 + 4*x -76)*(x -11)^2*(x -2)^2*(x + 5)^2*(x^2 + 8*x -4)^2*(x + 6)^3*(x -3)^4; T[154,41]=(x -10)*(x^2 -4*x -16)*(x )*(x + 2)^2*(x^2 + 18*x + 76)^2*(x -4)^3*(x -6)^4*(x + 8)^4; T[154,43]=(x + 4)*(x -4)*(x^2 + 12*x + 16)*(x -12)^2*(x + 8)^3*(x + 6)^4*(x -8)^8; T[154,47]=(x -2)*(x -10)*(x + 12)^2*(x + 10)^2*(x + 2)^2*(x^2 -10*x + 20)^2*(x )^2*(x -8)^7; T[154,53]=(x + 14)*(x^2 -8*x -4)^3*(x -6)^4*(x + 6)^10; T[154,59]=(x -10)*(x + 12)*(x^2 -10*x + 20)*(x )*(x + 9)^2*(x -2)^2*(x + 6)^2*(x -3)^2*(x^2 -2*x -4)^2*(x -5)^4; T[154,61]=(x + 14)*(x + 8)*(x -10)*(x^2 + 6*x + 4)*(x -8)^2*(x + 2)^2*(x + 10)^2*(x^2 + 10*x + 20)^2*(x )^2*(x -12)^4; T[154,67]=(x^2 + 4*x -176)*(x + 3)^2*(x + 12)^2*(x + 4)^2*(x -5)^2*(x^2 -20*x + 80)^2*(x -8)^3*(x + 7)^4; T[154,71]=(x -16)*(x + 4)*(x + 8)*(x^2 -4*x -16)*(x + 12)^2*(x -1)^2*(x -9)^2*(x^2 + 12*x + 16)^2*(x )^2*(x + 3)^4; T[154,73]=(x + 14)*(x^2 -8*x -64)*(x -10)^2*(x + 8)^2*(x^2 + 6*x + 4)^2*(x -2)^4*(x -4)^6; T[154,79]=(x -16)*(x -6)^2*(x^2 -80)^2*(x -8)^4*(x )^4*(x + 10)^6; T[154,83]=(x -4)*(x^2 + 2*x -124)*(x^2 -4*x -176)^2*(x )^3*(x -12)^4*(x + 6)^7; T[154,89]=(x + 15)^2*(x + 3)^2*(x -10)^3*(x -2)^4*(x -15)^4*(x + 6)^6; T[154,97]=(x + 14)*(x -6)*(x -10)*(x^2 -16*x + 44)*(x + 5)^2*(x + 1)^2*(x^2 -8*x -164)^2*(x + 10)^4*(x + 7)^4; T[155,2]=(x + 2)*(x + 1)*(x^4 -x^3 -6*x^2 + 4*x + 4)*(x^4 + x^3 -8*x^2 -4*x + 12)*(x )*(x^2 -x -1)^2; T[155,3]=(x -2)*(x^4 + x^3 -9*x^2 -9*x -2)*(x^4 -x^3 -5*x^2 + 3*x + 4)*(x + 1)^2*(x^2 + 2*x -4)^2; T[155,5]=(x^2 -x + 5)^2*(x -1)^5*(x + 1)^6; T[155,7]=(x -4)*(x + 2)*(x^4 -2*x^3 -20*x^2 + 52*x -32)*(x^4 -12*x^2 -4*x + 16)*(x )*(x^2 + 4*x -1)^2; T[155,11]=(x + 4)*(x -4)*(x^4 + 6*x^3 -16*x^2 -124*x -144)*(x^4 + 4*x^3 -8*x^2 -12*x + 16)*(x -2)^5; T[155,13]=(x^4 -16*x^3 + 84*x^2 -156*x + 64)*(x^4 -10*x^3 + 20*x^2 + 52*x -136)*(x )*(x + 6)^2*(x^2 + 2*x -4)^2; T[155,17]=(x + 8)*(x -5)*(x + 7)*(x^4 -11*x^3 + 35*x^2 -13*x -58)*(x^4 -x^3 -25*x^2 -49*x -24)*(x^2 -6*x + 4)^2; T[155,19]=(x + 1)*(x -4)*(x + 5)*(x^4 + 3*x^3 -33*x^2 -107*x + 44)*(x^4 -5*x^3 -21*x^2 + 81*x + 108)*(x^2 -5)^2; T[155,23]=(x -8)*(x -2)*(x -4)*(x^4 -64*x^2 + 196*x -24)*(x^4 + 2*x^3 -20*x^2 -52*x -32)*(x^2 + 2*x -44)^2; T[155,29]=(x + 6)*(x + 10)*(x^4 + 8*x^3 -20*x^2 -292*x -584)*(x^4 -6*x^3 -40*x^2 + 308*x -456)*(x )*(x^2 -10*x + 20)^2; T[155,31]=(x + 1)^5*(x -1)^10; T[155,37]=(x + 7)*(x -1)*(x + 4)*(x^4 -3*x^3 -81*x^2 + 143*x + 1538)*(x^4 -9*x^3 + 7*x^2 + 7*x -4)*(x + 2)^4; T[155,41]=(x + 6)*(x^4 -13*x^3 + 17*x^2 + 161*x -294)*(x^4 + 11*x^3 -31*x^2 -359*x + 506)*(x + 3)^2*(x -7)^4; T[155,43]=(x + 7)*(x + 6)*(x -9)*(x^4 -7*x^3 -7*x^2 + 129*x -214)*(x^4 -17*x^3 + 73*x^2 + 21*x -236)*(x^2 + 2*x -4)^2; T[155,47]=(x + 6)*(x -8)*(x + 2)*(x^4 + 14*x^3 + 36*x^2 -56*x -192)*(x^4 + 10*x^3 -52*x^2 -376*x + 1408)*(x^2 + 4*x -16)^2; T[155,53]=(x -9)*(x -5)*(x + 12)*(x^4 -13*x^3 -71*x^2 + 783*x + 1306)*(x^4 -11*x^3 -75*x^2 + 1103*x -2892)*(x^2 + 12*x + 16)^2; T[155,59]=(x + 4)*(x + 5)*(x -11)*(x^4 + 3*x^3 -97*x^2 + 129*x -44)*(x^4 -13*x^3 -65*x^2 + 625*x + 2484)*(x^2 -5)^2; T[155,61]=(x + 12)*(x + 8)*(x -10)*(x^4 -22*x^3 + 160*x^2 -432*x + 352)*(x^4 -22*x^3 + 144*x^2 -288*x -32)*(x^2 + 6*x -116)^2; T[155,67]=(x + 2)*(x^4 + 12*x^3 -72*x^2 -324*x + 1296)*(x^4 + 10*x^3 + 8*x^2 -36*x -32)*(x -8)^6; T[155,71]=(x -9)*(x + 3)*(x^4 -3*x^3 -37*x^2 + 59*x + 384)*(x^4 + 21*x^3 + 159*x^2 + 511*x + 584)*(x )*(x^2 -4*x -121)^2; T[155,73]=(x + 9)*(x + 1)*(x + 4)*(x^4 -19*x^3 + 85*x^2 -123*x + 34)*(x^4 -9*x^3 -95*x^2 + 649*x + 452)*(x^2 -8*x -4)^2; T[155,79]=(x + 10)*(x^4 + 2*x^3 -260*x^2 + 404*x + 6592)*(x^4 + 16*x^3 -12*x^2 -500*x + 256)*(x^2 + 10*x -20)^2*(x )^2; T[155,83]=(x -2)*(x -9)*(x + 11)*(x^4 + 15*x^3 -63*x^2 -1247*x -3364)*(x^4 + 17*x^3 -3*x^2 -455*x + 738)*(x^2 + 12*x -44)^2; T[155,89]=(x -10)*(x -14)*(x^4 + 12*x^3 -124*x^2 -1348*x + 1656)*(x^4 + 10*x^3 -152*x^2 -420*x + 3688)*(x )*(x^2 -10*x -20)^2; T[155,97]=(x -18)*(x + 14)*(x + 18)*(x^4 -4*x^3 -248*x^2 + 992*x -464)*(x^4 -16*x^3 + 56*x^2 + 48*x -16)*(x^2 + 14*x -31)^2; T[156,2]=(x^2 -x + 2)*(x^4 + 2*x^3 + 3*x^2 + 4*x + 4)*(x -1)^2*(x + 1)^3*(x )^12; T[156,3]=(x^2 + 3)*(x^2 + 3*x + 3)^2*(x^2 -x + 3)^2*(x + 1)^6*(x -1)^7; T[156,5]=(x + 4)*(x )*(x^2 -8)^3*(x + 3)^4*(x + 1)^4*(x -2)^7; T[156,7]=(x -2)*(x -4)^2*(x + 2)^3*(x + 4)^3*(x^2 -8)^3*(x + 1)^4*(x -1)^4; T[156,11]=(x )*(x + 4)^3*(x -4)^3*(x -6)^4*(x + 2)^12; T[156,13]=(x -1)^11*(x + 1)^12; T[156,17]=(x + 6)*(x -6)^2*(x^2 -4*x -28)^3*(x -2)^6*(x + 3)^8; T[156,19]=(x + 2)*(x + 6)^2*(x + 8)^2*(x^2 -8)^3*(x )^3*(x -6)^4*(x -2)^5; T[156,23]=(x -8)^2*(x + 4)^10*(x )^11; T[156,29]=(x + 6)^2*(x + 10)^3*(x -6)^6*(x -2)^12; T[156,31]=(x -2)*(x + 10)*(x -10)^2*(x^2 + 8*x + 8)^3*(x + 4)^6*(x -4)^7; T[156,37]=(x -2)*(x -10)*(x + 6)^2*(x^2 + 4*x -28)^3*(x -3)^4*(x + 7)^4*(x + 2)^5; T[156,41]=(x -8)*(x + 12)*(x + 10)^2*(x + 6)^2*(x -6)^3*(x^2 -16*x + 56)^3*(x )^8; T[156,43]=(x + 4)*(x + 12)^3*(x^2 -8*x -16)^3*(x + 1)^4*(x + 5)^4*(x -4)^5; T[156,47]=(x + 4)*(x + 2)^2*(x -8)^2*(x^2 + 12*x + 4)^3*(x -3)^4*(x -13)^4*(x )^4; T[156,53]=(x + 10)^3*(x -12)^4*(x )^4*(x -6)^6*(x + 2)^6; T[156,59]=(x + 8)*(x -4)^2*(x^2 -4*x -28)^3*(x + 6)^4*(x -12)^4*(x + 10)^6; T[156,61]=(x + 14)*(x -2)*(x^2 -4*x -124)^3*(x + 8)^4*(x -8)^4*(x + 2)^7; T[156,67]=(x -2)*(x + 10)*(x + 16)^2*(x -10)^2*(x + 8)^3*(x^2 -8*x + 8)^3*(x -14)^4*(x + 2)^4; T[156,71]=(x -16)*(x -12)*(x + 8)^2*(x -10)^2*(x )^3*(x + 3)^4*(x + 5)^4*(x -2)^6; T[156,73]=(x -14)*(x^2 -12*x + 4)^3*(x + 10)^5*(x -2)^11; T[156,79]=(x + 16)*(x^2 -128)^3*(x + 4)^6*(x -8)^10; T[156,83]=(x + 6)^2*(x -4)^3*(x^2 + 4*x -28)^3*(x )^5*(x -12)^7; T[156,89]=(x + 4)*(x )*(x -14)^2*(x + 2)^3*(x^2 -24*x + 136)^3*(x -6)^4*(x + 6)^6; T[156,97]=(x + 2)*(x -2)^2*(x^2 + 4*x -28)^3*(x -14)^4*(x + 10)^5*(x -10)^5; T[157,2]=(x^5 + 5*x^4 + 5*x^3 -6*x^2 -7*x + 1)*(x^7 -5*x^6 + 2*x^5 + 21*x^4 -22*x^3 -21*x^2 + 27*x -1); T[157,3]=(x^5 + 7*x^4 + 15*x^3 + 7*x^2 -8*x -5)*(x^7 -5*x^6 -x^5 + 31*x^4 -20*x^3 -45*x^2 + 44*x -4); T[157,5]=(x^5 + 3*x^4 -12*x^3 -39*x^2 -x + 25)*(x^7 + x^6 -16*x^5 + 3*x^4 + 73*x^3 -87*x^2 + 8*x + 16); T[157,7]=(x^5 + 3*x^4 -15*x^3 -26*x^2 + 61*x + 17)*(x^7 -x^6 -16*x^5 + 19*x^4 + 56*x^3 -75*x^2 + 19*x -1); T[157,11]=(x^5 + 14*x^4 + 64*x^3 + 91*x^2 -20*x + 1)*(x^7 -10*x^6 + 28*x^5 -9*x^4 -44*x^3 + 33*x^2 + 8*x -8); T[157,13]=(x^5 + 7*x^4 + 9*x^3 -32*x^2 -89*x -59)*(x^7 + 5*x^6 -16*x^5 -63*x^4 + 128*x^3 + 187*x^2 -407*x + 113); T[157,17]=(x^5 + 9*x^4 -23*x^3 -191*x^2 + 474*x -139)*(x^7 -5*x^6 -44*x^5 + 152*x^4 + 593*x^3 -890*x^2 -2384*x + 413); T[157,19]=(x^5 + 3*x^4 -31*x^3 -88*x^2 + 213*x + 557)*(x^7 + 3*x^6 -95*x^5 -368*x^4 + 1717*x^3 + 9185*x^2 + 12552*x + 5296); T[157,23]=(x^5 + 13*x^4 + 39*x^3 -81*x^2 -534*x -631)*(x^7 -15*x^6 + 54*x^5 + 190*x^4 -1529*x^3 + 1726*x^2 + 5352*x -10073); T[157,29]=(x^5 + 2*x^4 -24*x^3 -75*x^2 -38*x -5)*(x^7 -8*x^6 -76*x^5 + 883*x^4 -1230*x^3 -10329*x^2 + 32680*x -18992); T[157,31]=(x^5 -3*x^4 -139*x^3 + 338*x^2 + 3275*x + 2797)*(x^7 + 13*x^6 + 33*x^5 -150*x^4 -613*x^3 + 29*x^2 + 1152*x -436); T[157,37]=(x^5 -3*x^4 -53*x^3 + 117*x^2 + 640*x -641)*(x^7 + 15*x^6 -46*x^5 -1020*x^4 + 2073*x^3 + 19900*x^2 -64910*x + 39539); T[157,41]=(x^5 -5*x^4 -49*x^3 + 33*x^2 + 122*x -85)*(x^7 -3*x^6 -175*x^5 + 77*x^4 + 7678*x^3 + 6763*x^2 -70468*x -47404); T[157,43]=(x^5 + 23*x^4 + 153*x^3 + 297*x^2 + 218*x + 53)*(x^7 -11*x^6 -100*x^5 + 1196*x^4 + 3193*x^3 -41900*x^2 -32356*x + 475171); T[157,47]=(x^5 + 8*x^4 + 18*x^3 -x^2 -38*x -25)*(x^7 -8*x^6 -70*x^5 + 323*x^4 + 1874*x^3 -989*x^2 -12804*x -13444); T[157,53]=(x^5 + 25*x^4 + 123*x^3 -1358*x^2 -14641*x -36997)*(x^7 -9*x^6 -23*x^5 + 350*x^4 -215*x^3 -3033*x^2 + 1920*x + 8612); T[157,59]=(x^5 -7*x^4 -201*x^3 + 1676*x^2 + 4851*x -45421)*(x^7 -31*x^6 + 176*x^5 + 2659*x^4 -24666*x^3 -46015*x^2 + 515641*x + 863917); T[157,61]=(x^5 -4*x^4 -64*x^3 + 207*x^2 + 204*x -145)*(x^7 + 6*x^6 -166*x^5 -1043*x^4 + 7088*x^3 + 46747*x^2 -47412*x -385772); T[157,67]=(x^5 + 12*x^4 -85*x^3 -1310*x^2 -1538*x + 11339)*(x^7 -4*x^6 -161*x^5 + 662*x^4 + 7134*x^3 -32157*x^2 -66540*x + 317732); T[157,71]=(x^5 + 18*x^4 + 64*x^3 -269*x^2 -952*x + 2105)*(x^7 -14*x^6 -220*x^5 + 2455*x^4 + 16584*x^3 -119771*x^2 -388488*x + 1683928); T[157,73]=(x^7 + 3*x^6 -178*x^5 -386*x^4 + 3409*x^3 + 3787*x^2 -14816*x -11564)*(x^5 + 3*x^4 -198*x^3 -162*x^2 + 9477*x -14337); T[157,79]=(x^5 -22*x^4 -75*x^3 + 3606*x^2 -16908*x + 21877)*(x^7 -6*x^6 -213*x^5 + 384*x^4 + 11138*x^3 + 2965*x^2 -141844*x -169324); T[157,83]=(x^5 + 27*x^4 + 219*x^3 + 105*x^2 -5614*x -17375)*(x^7 -41*x^6 + 583*x^5 -2425*x^4 -18530*x^3 + 227645*x^2 -834084*x + 1053284); T[157,89]=(x^5 -25*x^4 -112*x^3 + 7061*x^2 -53097*x + 86269)*(x^7 + 13*x^6 -225*x^5 -2952*x^4 + 12077*x^3 + 165800*x^2 + 59133*x + 4949); T[157,97]=(x^5 -20*x^4 -69*x^3 + 2200*x^2 + 1014*x -37157)*(x^7 + 12*x^6 -421*x^5 -5594*x^4 + 42556*x^3 + 688139*x^2 + 33536*x -13926728); T[158,2]=(x^2 + x + 2)*(x^10 + 4*x^8 + 12*x^6 -x^5 + 24*x^4 + 32*x^2 + 32)*(x -1)^3*(x + 1)^4; T[158,3]=(x + 3)*(x -2)*(x -1)*(x^2 -6)*(x^5 -x^4 -12*x^3 + 8*x^2 + 24*x -16)^2*(x + 1)^4; T[158,5]=(x -3)*(x + 1)*(x -1)*(x^5 -7*x^4 + 9*x^3 + 27*x^2 -65*x + 31)^2*(x + 2)^3*(x + 3)^3; T[158,7]=(x -3)*(x )*(x -4)^2*(x + 3)^2*(x^5 + 5*x^4 -6*x^3 -52*x^2 -56*x -16)^2*(x + 1)^3; T[158,11]=(x + 4)*(x -4)*(x -2)*(x^5 -2*x^4 -35*x^3 + 34*x^2 + 185*x + 106)^2*(x + 2)^3*(x )^3; T[158,13]=(x + 5)*(x + 1)*(x -5)*(x -2)*(x + 7)*(x^2 -4*x -20)*(x -3)^2*(x^5 + 3*x^4 -23*x^3 -123*x^2 -197*x -103)^2; T[158,17]=(x + 4)*(x -6)*(x^2 -4*x -20)*(x )*(x + 6)^2*(x + 2)^2*(x^5 -10*x^4 + 16*x^3 + 88*x^2 -224*x + 32)^2; T[158,19]=(x -2)*(x + 6)*(x^2 -24)*(x -4)^2*(x^5 + 4*x^4 -47*x^3 -124*x^2 + 541*x + 488)^2*(x )^3; T[158,23]=(x + 2)*(x -6)*(x^2 -4*x -20)*(x )*(x -2)^2*(x + 6)^2*(x^5 -2*x^4 -43*x^3 + 106*x^2 + 177*x -142)^2; T[158,29]=(x -8)*(x -6)*(x + 10)*(x -4)*(x^2 + 4*x -50)*(x )*(x + 6)^2*(x^5 -6*x^4 -52*x^3 + 392*x^2 -496*x -32)^2; T[158,31]=(x -2)*(x + 4)*(x^2 + 4*x -20)*(x -8)^2*(x^5 -2*x^4 -63*x^3 + 6*x^2 + 397*x + 314)^2*(x + 10)^3; T[158,37]=(x -2)*(x -4)*(x -10)*(x + 10)*(x^2 + 4*x -2)*(x^5 -84*x^3 -64*x^2 + 1264*x + 2272)^2*(x + 2)^3; T[158,41]=(x + 8)*(x + 12)*(x^2 -12*x + 12)*(x -2)^2*(x^5 -30*x^4 + 336*x^3 -1752*x^2 + 4256*x -3872)^2*(x + 10)^3; T[158,43]=(x -8)*(x + 8)*(x + 2)*(x^2 + 16*x + 58)*(x^5 + 14*x^4 + 44*x^3 -120*x^2 -688*x -704)^2*(x -4)^4; T[158,47]=(x + 9)*(x -3)*(x^2 -96)*(x )*(x -7)^2*(x + 3)^2*(x^5 -5*x^4 -136*x^3 + 536*x^2 + 4176*x -13456)^2; T[158,53]=(x + 8)*(x -4)*(x + 12)*(x -2)*(x -6)*(x^2 -4*x -2)*(x -8)^2*(x^5 -2*x^4 -136*x^3 -240*x^2 + 3792*x + 12352)^2; T[158,59]=(x -5)*(x -1)*(x -14)*(x + 1)*(x + 9)*(x^2 -6)*(x + 3)^2*(x^5 -5*x^4 -70*x^3 + 368*x^2 + 864*x -4624)^2; T[158,61]=(x -8)*(x^2 + 12*x + 30)*(x -12)^2*(x + 4)^2*(x^5 + 6*x^4 -196*x^3 -808*x^2 + 9840*x + 17984)^2*(x )^2; T[158,67]=(x + 8)*(x^2 -16*x + 40)*(x + 4)^2*(x^5 + 16*x^4 -47*x^3 -1084*x^2 + 865*x + 3368)^2*(x -8)^4; T[158,71]=(x -8)*(x + 13)*(x + 9)*(x + 11)*(x + 3)*(x -15)^2*(x + 4)^2*(x^5 -3*x^4 -94*x^3 -68*x^2 + 1208*x + 848)^2; T[158,73]=(x -6)*(x -12)^2*(x^5 + 12*x^4 + 31*x^3 + 24*x^2 + x -2)^2*(x + 6)^3*(x -2)^3; T[158,79]=(x + 1)^5*(x -1)^14; T[158,83]=(x -14)*(x -6)*(x -12)*(x -18)*(x^2 -8*x -80)*(x^5 + 30*x^4 + 280*x^3 + 640*x^2 -1536*x + 512)^2*(x + 6)^3; T[158,89]=(x -6)*(x -9)*(x -4)^2*(x + 15)^2*(x^5 -47*x^4 + 817*x^3 -6181*x^2 + 16507*x + 5951)^2*(x + 7)^3; T[158,97]=(x -17)*(x -1)*(x -10)*(x -13)*(x + 11)*(x^2 + 4*x -92)*(x + 19)^2*(x^5 + x^4 -211*x^3 -497*x^2 + 6847*x -1793)^2; T[159,2]=(x^4 -3*x^3 -x^2 + 7*x -3)*(x^5 -10*x^3 + 22*x + 5)*(x + 1)^2*(x^3 + x^2 -3*x -1)^2; T[159,3]=(x^2 + 3*x + 3)*(x^6 -3*x^5 + 8*x^4 -17*x^3 + 24*x^2 -27*x + 27)*(x -1)^4*(x + 1)^5; T[159,5]=(x^4 -2*x^3 -11*x^2 + 32*x -21)*(x^5 -19*x^3 + 6*x^2 + 67*x -2)*(x^3 + 2*x^2 -4*x -4)^2*(x )^2; T[159,7]=(x^4 + 4*x^3 -7*x^2 -44*x -43)*(x^5 -4*x^4 -23*x^3 + 92*x^2 + 117*x -472)*(x + 4)^2*(x^3 -4*x^2 + 4)^2; T[159,11]=(x^4 -6*x^3 -28*x^2 + 232*x -336)*(x^5 -2*x^4 -28*x^3 + 72*x^2 + 16*x -64)*(x^3 + 4*x^2 -4*x -20)^2*(x )^2; T[159,13]=(x^4 + 6*x^3 -9*x^2 -70*x + 1)*(x^5 -8*x^4 -13*x^3 + 136*x^2 + 101*x -110)*(x + 3)^2*(x -1)^6; T[159,17]=(x^4 -10*x^3 -12*x^2 + 280*x -432)*(x^5 -40*x^3 + 352*x -160)*(x + 3)^2*(x^3 + 5*x^2 -5*x -17)^2; T[159,19]=(x^4 + 6*x^3 -36*x^2 -280*x -368)*(x^5 -2*x^4 -28*x^3 + 72*x^2 + 16*x -64)*(x + 5)^2*(x^3 -11*x^2 + 37*x -37)^2; T[159,23]=(x^4 -2*x^3 -35*x^2 + 104*x -21)*(x^5 + 6*x^4 -39*x^3 -196*x^2 + 227*x + 272)*(x -7)^2*(x^3 -3*x^2 -31*x -29)^2; T[159,29]=(x^4 -6*x^3 -28*x^2 + 232*x -336)*(x^5 -20*x^4 + 96*x^3 + 192*x^2 -1728*x + 1504)*(x + 7)^2*(x^3 + 5*x^2 -37*x -61)^2; T[159,31]=(x^4 + 12*x^3 -24*x^2 -568*x -944)*(x^5 -8*x^4 -8*x^3 + 168*x^2 -336*x + 128)*(x -4)^2*(x^3 + 2*x^2 -76*x + 116)^2; T[159,37]=(x^4 + 10*x^3 + 3*x^2 -94*x + 53)*(x^5 -4*x^4 -65*x^3 + 248*x^2 -215*x + 34)*(x -5)^2*(x^3 + 5*x^2 -89*x -353)^2; T[159,41]=(x^4 -12*x^3 -85*x^2 + 742*x + 3243)*(x^5 -18*x^4 + 63*x^3 + 400*x^2 -2553*x + 3474)*(x -6)^2*(x^3 + 10*x^2 + 20*x -8)^2; T[159,43]=(x^4 + 16*x^3 + 33*x^2 -356*x -1103)*(x^5 -12*x^4 -39*x^3 + 392*x^2 + 329*x -3004)*(x + 2)^2*(x^3 -18*x^2 + 24*x + 556)^2; T[159,47]=(x^4 -64*x^2 -200*x -48)*(x^5 + 4*x^4 -104*x^3 -456*x^2 + 272*x + 2048)*(x + 2)^2*(x^3 + 10*x^2 -4*x -8)^2; T[159,53]=(x + 1)^6*(x -1)^11; T[159,59]=(x^4 -10*x^3 -116*x^2 + 904*x + 48)*(x^5 + 18*x^4 + 20*x^3 -1224*x^2 -7440*x -11968)*(x + 2)^2*(x^3 -2*x^2 -60*x + 200)^2; T[159,61]=(x^4 -14*x^3 -4*x^2 + 456*x -752)*(x^5 -12*x^4 -192*x^3 + 1216*x^2 + 13632*x + 18272)*(x + 8)^2*(x^3 + 10*x^2 -56*x -556)^2; T[159,67]=(x^4 + 6*x^3 -84*x^2 -280*x + 496)*(x^5 -6*x^4 -188*x^3 + 968*x^2 + 7472*x -34240)*(x + 12)^2*(x^3 -6*x^2 -72*x -108)^2; T[159,71]=(x^4 + 8*x^3 -25*x^2 -154*x + 387)*(x^5 -4*x^4 -293*x^3 + 822*x^2 + 12603*x -24992)*(x -1)^2*(x^3 + 5*x^2 -105*x + 277)^2; T[159,73]=(x^4 -10*x^3 -136*x^2 + 864*x + 5072)*(x^5 -8*x^4 -300*x^3 + 1424*x^2 + 22832*x -8800)*(x + 4)^2*(x^3 -6*x^2 -28*x -4)^2; T[159,79]=(x^4 -10*x^3 + 4*x^2 + 152*x -304)*(x^5 + 2*x^4 -116*x^3 -88*x^2 + 1296*x -1408)*(x + 1)^2*(x^3 + 7*x^2 -77*x + 131)^2; T[159,83]=(x^4 -12*x^3 -21*x^2 + 2*x + 3)*(x^5 + 36*x^4 + 327*x^3 -1618*x^2 -35733*x -128420)*(x + 1)^2*(x^3 -27*x^2 + 213*x -457)^2; T[159,89]=(x^4 + 4*x^3 -200*x^2 -376*x + 1008)*(x^5 -26*x^4 + 88*x^3 + 2520*x^2 -22176*x + 41504)*(x + 14)^2*(x^3 + 2*x^2 -212*x + 1048)^2; T[159,97]=(x^4 -6*x^3 -73*x^2 + 502*x -431)*(x^5 + 16*x^4 -245*x^3 -3232*x^2 + 15797*x + 148286)*(x -1)^2*(x^3 + x^2 -133*x -137)^2; T[160,2]=(x )^17; T[160,3]=(x^2 -8)*(x -2)^3*(x + 2)^5*(x )^7; T[160,5]=(x^2 + 2*x + 5)*(x -1)^7*(x + 1)^8; T[160,7]=(x^2 -8)*(x -4)^2*(x )^2*(x + 2)^3*(x + 4)^3*(x -2)^5; T[160,11]=(x^2 -32)*(x + 4)^3*(x -4)^4*(x )^8; T[160,13]=(x + 6)^2*(x -6)^2*(x -2)^6*(x + 2)^7; T[160,17]=(x + 6)^6*(x -2)^11; T[160,19]=(x -8)*(x + 8)*(x )^4*(x -4)^5*(x + 4)^6; T[160,23]=(x^2 -8)*(x + 4)^2*(x )^2*(x + 6)^3*(x -4)^3*(x -6)^5; T[160,29]=(x + 10)^2*(x + 2)^7*(x -6)^8; T[160,31]=(x^2 -32)*(x -8)^2*(x )^2*(x + 8)^3*(x -4)^3*(x + 4)^5; T[160,37]=(x + 10)^2*(x + 2)^2*(x -6)^5*(x -2)^8; T[160,41]=(x -2)^2*(x + 10)^2*(x -10)^2*(x + 6)^5*(x -6)^6; T[160,43]=(x -2)*(x + 2)*(x^2 -72)*(x -10)^2*(x -8)^2*(x )^2*(x + 8)^3*(x + 10)^4; T[160,47]=(x -2)*(x + 2)*(x^2 -8)*(x -6)^2*(x + 4)^2*(x )^2*(x -4)^3*(x + 6)^4; T[160,53]=(x -14)^2*(x -2)^2*(x + 6)^6*(x -6)^7; T[160,59]=(x^2 -128)*(x + 12)^2*(x -4)^2*(x + 4)^3*(x -12)^4*(x )^4; T[160,61]=(x + 10)^2*(x + 2)^7*(x -2)^8; T[160,67]=(x + 6)*(x -6)*(x^2 -8)*(x + 2)^2*(x + 8)^2*(x )^2*(x -8)^3*(x -2)^4; T[160,71]=(x^2 -32)*(x -12)^3*(x + 12)^5*(x )^7; T[160,73]=(x -10)^2*(x -2)^6*(x + 6)^9; T[160,79]=(x^2 -128)*(x + 8)^3*(x -8)^5*(x )^7; T[160,83]=(x -10)*(x + 10)*(x^2 -8)*(x -16)^2*(x + 6)^2*(x )^2*(x + 16)^3*(x -6)^4; T[160,89]=(x -10)^4*(x + 6)^13; T[160,97]=(x -18)^2*(x -10)^2*(x + 14)^5*(x -2)^8; T[161,2]=(x + 1)*(x^3 + x^2 -5*x -1)*(x^5 -2*x^4 -9*x^3 + 17*x^2 + 16*x -27)*(x^2 + x -1)^3; T[161,3]=(x^3 -2*x^2 -2*x + 2)*(x^5 -13*x^3 + 38*x + 10)*(x )*(x + 1)^2*(x^2 -5)^2; T[161,5]=(x -2)*(x^3 -2*x^2 -2*x + 2)*(x^5 + 4*x^4 -14*x^3 -54*x^2 + 52*x + 168)*(x^2 + 2*x -4)^3; T[161,7]=(x^4 -2*x^3 + 10*x^2 -14*x + 49)*(x + 1)^5*(x -1)^6; T[161,11]=(x -4)*(x^2 -20)*(x^3 -4*x^2 + 4)*(x^5 + 4*x^4 -28*x^3 -148*x^2 -160*x -48)*(x^2 + 6*x + 4)^2; T[161,13]=(x -6)*(x^2 + 4*x -1)*(x^3 -2*x^2 -12*x + 8)*(x^5 + 6*x^4 -9*x^3 -46*x^2 + 12*x + 56)*(x -3)^4; T[161,17]=(x + 2)*(x^3 -4*x^2 + 2*x + 2)*(x^5 + 12*x^4 + 6*x^3 -386*x^2 -1504*x -1536)*(x^2 -6*x + 4)^2*(x )^2; T[161,19]=(x -4)*(x^2 + 10*x + 20)*(x^3 -8*x^2 -16*x + 160)*(x^5 -6*x^4 -28*x^3 + 96*x^2 + 320*x + 128)*(x + 2)^4; T[161,23]=(x -1)^7*(x + 1)^8; T[161,29]=(x + 2)*(x^2 -6*x -11)*(x^3 + 2*x^2 -8*x + 4)*(x^5 + 4*x^4 -111*x^3 -250*x^2 + 2464*x -1452)*(x + 3)^4; T[161,31]=(x + 4)*(x^3 -16*x^2 + 26*x + 338)*(x^5 -30*x^4 + 347*x^3 -1926*x^2 + 5114*x -5206)*(x + 9)^2*(x^2 -45)^2; T[161,37]=(x + 2)*(x^3 + 6*x^2 -4*x -40)*(x^2 -2*x -44)*(x^5 -4*x^4 -76*x^3 + 376*x^2 -128*x -32)*(x^2 -2*x -4)^2; T[161,41]=(x + 6)*(x^2 -5)*(x^3 + 14*x^2 + 12*x -152)*(x^5 -6*x^4 -29*x^3 + 146*x^2 + 52*x -456)*(x^2 -2*x -19)^2; T[161,43]=(x -12)*(x^2 + 4*x -16)*(x^3 + 8*x^2 -40*x -304)*(x^5 + 12*x^4 -24*x^3 -368*x^2 + 832*x + 256)*(x )^4; T[161,47]=(x + 12)*(x^2 -2*x -19)*(x^3 -16*x^2 + 62*x -10)*(x^5 -10*x^4 -125*x^3 + 1918*x^2 -8074*x + 11142)*(x^2 -5)^2; T[161,53]=(x + 10)*(x^2 -18*x + 76)*(x^3 -6*x^2 -52*x + 248)*(x^5 -16*x^4 + 52*x^3 + 152*x^2 -416*x -480)*(x^2 + 8*x -4)^2; T[161,59]=(x^2 + 12*x + 16)*(x^3 + 10*x^2 -102*x -970)*(x^5 -22*x^4 + 118*x^3 -2*x^2 -1096*x + 1440)*(x )*(x^2 -4*x -16)^2; T[161,61]=(x -2)*(x^2 -180)*(x^3 -10*x^2 -46*x + 494)*(x^5 + 18*x^4 + 34*x^3 -438*x^2 + 312*x + 56)*(x^2 -4*x -76)^2; T[161,67]=(x -12)*(x^2 + 2*x -124)*(x^3 -16*x^2 -8*x + 676)*(x^5 + 2*x^4 -300*x^3 -740*x^2 + 22200*x + 61936)*(x^2 + 10*x + 20)^2; T[161,71]=(x -8)*(x^2 + 16*x + 59)*(x^3 -4*x^2 -80*x + 64)*(x^5 -4*x^4 -101*x^3 + 276*x^2 + 1936*x -5184)*(x^2 -20*x + 95)^2; T[161,73]=(x + 14)*(x^2 -45)*(x^3 + 6*x^2 -108*x -216)*(x^5 + 2*x^4 -197*x^3 + 362*x^2 + 8028*x -27656)*(x^2 -22*x + 101)^2; T[161,79]=(x -8)*(x^2 + 10*x + 20)*(x^3 -16*x^2 + 8*x + 428)*(x^5 -30*x^4 + 308*x^3 -1196*x^2 + 968*x + 1936)*(x^2 + 4*x -76)^2; T[161,83]=(x + 4)*(x^2 -4*x -16)*(x^3 -20*x^2 -104*x + 2672)*(x^5 -8*x^4 -56*x^3 + 432*x^2 + 832*x -5376)*(x^2 + 22*x + 116)^2; T[161,89]=(x -6)*(x^2 -80)*(x^3 -4*x^2 -114*x -278)*(x^5 + 20*x^4 + 66*x^3 -698*x^2 -4160*x -4704)*(x^2 + 12*x + 16)^2; T[161,97]=(x + 10)*(x^2 + 6*x -36)*(x^3 -6*x^2 -22*x -2)*(x^5 + 12*x^4 -114*x^3 -1362*x^2 + 516*x + 4120)*(x^2 -22*x + 76)^2; T[162,2]=(x^4 + x^2 + 4)*(x^2 + 2)^2*(x -1)^4*(x + 1)^4; T[162,3]=(x )^16; T[162,5]=(x^2 -3)^2*(x + 3)^3*(x -3)^3*(x )^6; T[162,7]=(x + 4)^2*(x -2)^6*(x + 1)^8; T[162,11]=(x^2 -12)^2*(x + 3)^3*(x -3)^3*(x )^6; T[162,13]=(x -2)^2*(x -5)^4*(x + 4)^4*(x + 1)^6; T[162,17]=(x -3)^2*(x + 3)^2*(x^2 -27)^2*(x )^8; T[162,19]=(x + 1)^2*(x + 4)^2*(x + 7)^4*(x -2)^8; T[162,23]=(x^2 -12)^2*(x -6)^3*(x + 6)^3*(x )^6; T[162,29]=(x + 9)*(x -9)*(x^2 -3)^2*(x -6)^3*(x + 6)^3*(x )^4; T[162,31]=(x -8)^4*(x -5)^4*(x + 4)^8; T[162,37]=(x + 1)^2*(x + 4)^2*(x -2)^4*(x -11)^4*(x + 7)^4; T[162,41]=(x -9)*(x + 9)*(x^2 -48)^2*(x -6)^3*(x + 6)^3*(x )^4; T[162,43]=(x + 1)^2*(x + 10)^4*(x -2)^4*(x -8)^6; T[162,47]=(x + 12)*(x -12)*(x^2 -48)^2*(x + 6)^3*(x -6)^3*(x )^4; T[162,53]=(x -12)*(x + 6)*(x + 12)*(x -6)*(x + 9)^2*(x -9)^2*(x )^8; T[162,59]=(x + 3)*(x -3)*(x -12)^2*(x + 12)^2*(x^2 -192)^2*(x )^6; T[162,61]=(x + 7)^4*(x + 1)^6*(x -8)^6; T[162,67]=(x + 4)^2*(x + 10)^4*(x -14)^4*(x -5)^6; T[162,71]=(x -12)^2*(x + 12)^2*(x^2 -108)^2*(x )^8; T[162,73]=(x -11)^4*(x + 7)^12; T[162,79]=(x + 16)^2*(x + 4)^2*(x -2)^4*(x -8)^4*(x -17)^4; T[162,83]=(x -12)^2*(x + 3)^2*(x + 12)^2*(x -3)^2*(x^2 -192)^2*(x )^4; T[162,89]=(x + 6)*(x + 3)*(x -6)*(x -3)*(x -18)^2*(x + 18)^2*(x^2 -27)^2*(x )^4; T[162,97]=(x -5)^2*(x + 19)^4*(x + 1)^4*(x -2)^6; T[163,2]=(x^5 + 5*x^4 + 3*x^3 -15*x^2 -16*x + 3)*(x^7 -3*x^6 -5*x^5 + 19*x^4 -23*x^2 + 4*x + 6)*(x ); T[163,3]=(x^5 + 5*x^4 + x^3 -23*x^2 -28*x -9)*(x^7 -x^6 -11*x^5 + 13*x^4 + 26*x^3 -39*x^2 + 16*x -2)*(x ); T[163,5]=(x + 4)*(x^5 + 9*x^4 + 23*x^3 + 12*x^2 -x -1)*(x^7 -11*x^6 + 41*x^5 -44*x^4 -73*x^3 + 199*x^2 -136*x + 24); T[163,7]=(x -2)*(x^5 + 6*x^4 -5*x^3 -48*x^2 + 18*x -1)*(x^7 -21*x^5 -18*x^4 + 104*x^3 + 115*x^2 -136*x -158); T[163,11]=(x + 6)*(x^5 -2*x^4 -26*x^3 + 57*x^2 -32*x + 3)*(x^7 -2*x^6 -20*x^5 + 67*x^4 -34*x^3 -49*x^2 + 20*x + 12); T[163,13]=(x -4)*(x^5 + 14*x^4 + 73*x^3 + 173*x^2 + 179*x + 61)*(x^7 -10*x^6 + 11*x^5 + 149*x^4 -493*x^3 + 311*x^2 + 402*x -334); T[163,17]=(x^5 + 21*x^4 + 169*x^3 + 651*x^2 + 1196*x + 831)*(x^7 -13*x^6 + 47*x^5 -3*x^4 -224*x^3 + 285*x^2 -4*x -90)*(x ); T[163,19]=(x + 6)*(x^5 -7*x^4 -44*x^3 + 347*x^2 -113*x -1011)*(x^7 + 5*x^6 -42*x^5 -101*x^4 + 347*x^3 + 723*x^2 -458*x -962); T[163,23]=(x -6)*(x^5 + 8*x^4 -55*x^3 -554*x^2 -1234*x -813)*(x^7 -2*x^6 -43*x^5 + 26*x^4 + 444*x^3 -21*x^2 -1268*x -564); T[163,29]=(x + 4)*(x^5 + 13*x^4 + 46*x^3 -2*x^2 -175*x -43)*(x^7 -7*x^6 -76*x^5 + 572*x^4 + 1457*x^3 -12935*x^2 -6278*x + 83922); T[163,31]=(x + 6)*(x^5 -7*x^4 -74*x^3 + 233*x^2 + 1333*x + 1305)*(x^7 + 11*x^6 -76*x^5 -1057*x^4 -1059*x^3 + 9235*x^2 + 11218*x -16738); T[163,37]=(x + 8)*(x^5 + x^4 -23*x^3 -50*x^2 + 39*x + 107)*(x^7 -3*x^6 -165*x^5 + 260*x^4 + 6759*x^3 + 2283*x^2 -12006*x + 1286); T[163,41]=(x -3)*(x^5 + 9*x^4 -63*x^3 -665*x^2 -1504*x -783)*(x^7 -17*x^6 -4*x^5 + 1330*x^4 -5937*x^3 -3488*x^2 + 32558*x + 30237); T[163,43]=(x -7)*(x^5 + 4*x^4 -49*x^3 -16*x^2 + 580*x -841)*(x^7 + 10*x^6 -160*x^5 -1518*x^4 + 4939*x^3 + 45395*x^2 -822*x -31793); T[163,47]=(x -1)*(x^5 + 3*x^4 -25*x^3 -29*x^2 + 132*x + 53)*(x^7 -11*x^6 -286*x^5 + 3416*x^4 + 18017*x^3 -272340*x^2 + 275450*x + 2048493); T[163,53]=(x + 9)*(x^5 + 16*x^4 + 59*x^3 -139*x^2 -913*x -687)*(x^7 -18*x^6 + 4*x^5 + 1719*x^4 -11908*x^3 + 22024*x^2 + 29177*x -93987); T[163,59]=(x + 2)*(x^5 + 3*x^4 -185*x^3 + 120*x^2 + 5127*x -1679)*(x^7 -11*x^6 -161*x^5 + 1960*x^4 + 2481*x^3 -79867*x^2 + 268342*x -269034); T[163,61]=(x -3)*(x^5 + 10*x^4 -25*x^3 -562*x^2 -1930*x -1917)*(x^7 -4*x^6 -240*x^5 + 954*x^4 + 11485*x^3 -52427*x^2 + 36192*x + 12119); T[163,67]=(x + 2)*(x^5 + 2*x^4 -87*x^3 + 117*x^2 + 459*x -405)*(x^7 + 18*x^6 -67*x^5 -2287*x^4 -1207*x^3 + 87051*x^2 + 90584*x -839836); T[163,71]=(x + 5)*(x^5 -31*x^4 + 206*x^3 + 1438*x^2 -12559*x -18143)*(x^7 + 3*x^6 -319*x^5 -485*x^4 + 20635*x^3 + 18433*x^2 -15133*x -13023); T[163,73]=(x + 2)*(x^5 + 14*x^4 -94*x^3 -1985*x^2 -5452*x + 10537)*(x^7 -2*x^6 -148*x^5 -471*x^4 + 1784*x^3 + 5555*x^2 -3228*x -2554); T[163,79]=(x + 8)*(x^5 + 14*x^4 -93*x^3 -1571*x^2 -2027*x + 919)*(x^7 -353*x^5 -121*x^4 + 29485*x^3 -46789*x^2 -511720*x + 1197688); T[163,83]=(x -5)*(x^5 + 12*x^4 -31*x^3 -277*x^2 + 27*x + 349)*(x^7 -18*x^6 -70*x^5 + 2945*x^4 -14646*x^3 -12542*x^2 + 136717*x + 62745); T[163,89]=(x + 14)*(x^5 -295*x^3 + 1530*x^2 + 7598*x -36545)*(x^7 -18*x^6 -5*x^5 + 1222*x^4 -4578*x^3 -4221*x^2 + 26908*x + 2340); T[163,97]=(x + 11)*(x^5 -23*x^4 -71*x^3 + 5628*x^2 -48787*x + 125863)*(x^7 -21*x^6 -240*x^5 + 7343*x^4 -13106*x^3 -597283*x^2 + 4271847*x -8371133); T[164,2]=(x + 1)*(x^6 + x^5 + x^4 + 3*x^3 + 2*x^2 + 4*x + 8)*(x -1)^2*(x )^10; T[164,3]=(x^4 -2*x^3 -10*x^2 + 22*x -2)*(x + 2)^2*(x^2 -2)^2*(x^3 -4*x + 2)^3; T[164,5]=(x^4 -4*x^3 -8*x^2 + 44*x -36)*(x + 2)^2*(x^2 -8)^2*(x^3 + 2*x^2 -4*x -4)^3; T[164,7]=(x^4 -22*x^2 + 26*x + 38)*(x + 4)^2*(x^2 + 4*x + 2)^2*(x^3 -6*x^2 + 8*x -2)^3; T[164,11]=(x^4 -4*x^3 -18*x^2 + 18*x + 54)*(x + 2)^2*(x^2 -18)^2*(x^3 -2*x^2 -20*x + 50)^3; T[164,13]=(x^4 -40*x^2 -48*x + 144)*(x -4)^2*(x^3 + 2*x^2 -12*x -8)^3*(x )^4; T[164,17]=(x^4 + 4*x^3 -48*x^2 -80*x + 432)*(x^2 -4*x -28)^2*(x + 2)^11; T[164,19]=(x^4 -6*x^3 -14*x^2 + 134*x -186)*(x -6)^2*(x^2 + 8*x + 14)^2*(x^3 -4*x^2 -16*x -10)^3; T[164,23]=(x^4 + 12*x^3 + 16*x^2 -128*x -192)*(x + 8)^2*(x^2 -8*x + 8)^2*(x^3 -4*x^2 -32*x -32)^3; T[164,29]=(x^4 + 4*x^3 -40*x^2 + 144)*(x^2 -8*x -16)^2*(x )^2*(x^3 + 6*x^2 -4*x -40)^3; T[164,31]=(x^4 + 8*x^3 -32*x^2 -32*x + 64)*(x + 8)^2*(x^2 + 8*x + 8)^2*(x^3 -16*x^2 + 64*x -32)^3; T[164,37]=(x^4 -16*x^3 + 64*x^2 + 36*x -324)*(x -2)^2*(x^2 -72)^2*(x^3 + 6*x^2 -36*x -108)^3; T[164,41]=(x -1)^9*(x + 1)^10; T[164,43]=(x^4 -4*x^3 -48*x^2 + 272*x -288)*(x + 12)^2*(x^2 -8*x -16)^2*(x^3 + 4*x^2 -8*x -16)^3; T[164,47]=(x^4 + 6*x^3 -62*x^2 -206*x + 1182)*(x -4)^2*(x^2 + 4*x -46)^2*(x^3 -120*x -502)^3; T[164,53]=(x^4 + 16*x^3 -720*x -1296)*(x + 4)^2*(x^3 -6*x^2 -4*x + 8)^3*(x -12)^4; T[164,59]=(x^4 -12*x^3 + 16*x^2 + 128*x -192)*(x -8)^2*(x^2 + 8*x + 8)^2*(x^3 + 8*x^2 -16*x -160)^3; T[164,61]=(x^4 -24*x^3 + 176*x^2 -432*x + 288)*(x + 14)^2*(x^3 -2*x^2 -52*x + 184)^3*(x -6)^4; T[164,67]=(x^4 -28*x^3 + 270*x^2 -1010*x + 1094)*(x + 2)^2*(x^2 + 8*x -2)^2*(x^3 + 2*x^2 -20*x -50)^3; T[164,71]=(x^4 + 2*x^3 -186*x^2 -694*x -426)*(x -8)^2*(x^2 + 4*x + 2)^2*(x^3 -20*x^2 + 84*x + 134)^3; T[164,73]=(x^4 -8*x^3 -80*x^2 + 692*x -404)*(x -10)^2*(x^2 + 16*x + 32)^2*(x^3 + 2*x^2 -180*x + 244)^3; T[164,79]=(x^4 + 18*x^3 + 50*x^2 -42*x -18)*(x -4)^2*(x^2 + 12*x + 18)^2*(x^3 -32*x^2 + 328*x -1090)^3; T[164,83]=(x^4 + 12*x^3 -80*x^2 -1344*x -3456)*(x -12)^2*(x^2 -24*x + 112)^2*(x^3 -64*x -128)^3; T[164,89]=(x^4 -4*x^3 -128*x^2 + 272*x + 4272)*(x + 14)^2*(x^2 + 12*x + 4)^2*(x^3 + 6*x^2 -148*x -920)^3; T[164,97]=(x^4 -16*x^3 -120*x^2 + 1280*x + 4944)*(x -6)^2*(x^2 + 4*x -28)^2*(x^3 -6*x^2 -52*x + 248)^3; T[165,2]=(x^2 -3)*(x^2 + 2*x -1)*(x^3 + x^2 -5*x -1)*(x + 1)^2*(x^2 -2*x -1)^2*(x + 2)^4*(x -1)^4; T[165,3]=(x^2 + 3)*(x^4 -2*x^2 + 9)*(x^2 + x + 3)^2*(x -1)^5*(x + 1)^6; T[165,5]=(x^2 + 2*x + 5)*(x^2 -x + 5)^2*(x -1)^7*(x + 1)^8; T[165,7]=(x^2 + 4*x -4)*(x^3 -16*x + 16)*(x -2)^2*(x -4)^2*(x )^4*(x + 2)^8; T[165,11]=(x^2 + 4*x + 11)*(x + 1)^6*(x -1)^13; T[165,13]=(x^2 -4*x -8)*(x^3 + 2*x^2 -12*x -8)*(x^2 -32)*(x -2)^2*(x^2 + 8*x + 8)^2*(x -4)^4*(x + 2)^4; T[165,17]=(x^2 + 8*x + 8)*(x^3 + 2*x^2 -52*x -184)*(x -6)^2*(x -2)^2*(x^2 -8*x + 8)^2*(x )^2*(x + 2)^6; T[165,19]=(x^2 -4*x -8)*(x^2 + 8*x + 8)*(x^3 -8*x^2 -16*x + 160)*(x + 4)^2*(x -4)^2*(x )^10; T[165,23]=(x^2 -48)*(x^3 -64*x -128)*(x -4)^2*(x + 4)^2*(x -8)^2*(x^2 -8)^2*(x )^2*(x + 1)^4; T[165,29]=(x^2 + 4*x -4)*(x^2 -12)*(x^3 + 10*x^2 + 12*x -40)*(x + 2)^2*(x + 6)^2*(x -6)^2*(x^2 -4*x -28)^2*(x )^4; T[165,31]=(x^2 + 8*x -32)*(x^3 -8*x^2 -32*x + 128)*(x + 8)^4*(x -7)^4*(x )^8; T[165,37]=(x^2 -4*x -44)*(x^2 -12*x + 4)*(x -6)^2*(x + 10)^2*(x^2 + 4*x -28)^2*(x -3)^4*(x + 2)^5; T[165,41]=(x^2 -12)*(x^3 + 14*x^2 + 44*x + 8)*(x^2 -4*x -4)*(x -2)^2*(x -10)^2*(x + 2)^2*(x -6)^4*(x + 8)^4; T[165,43]=(x^2 -4*x -44)*(x^3 -4*x^2 -80*x + 400)*(x^2 + 12*x + 28)*(x )^2*(x -4)^4*(x + 6)^8; T[165,47]=(x^2 -48)*(x^3 + 8*x^2 -32*x -128)*(x + 12)^2*(x + 4)^2*(x^2 -8)^2*(x -8)^8; T[165,53]=(x^2 + 12*x -12)*(x^2 + 4*x -124)*(x^3 + 6*x^2 -52*x + 8)*(x + 2)^2*(x -6)^2*(x + 10)^2*(x^2 -12*x + 4)^2*(x + 6)^4; T[165,59]=(x^2 -48)*(x^3 -12*x^2 -16*x + 320)*(x -4)^2*(x^2 + 8*x -16)^2*(x -5)^4*(x + 4)^6; T[165,61]=(x^2 + 12*x + 4)*(x^3 + 6*x^2 -52*x -248)*(x -2)^2*(x + 10)^2*(x + 2)^2*(x -6)^2*(x^2 -4*x -124)^2*(x -12)^4; T[165,67]=(x^2 -32)*(x^3 + 4*x^2 -48*x -64)*(x -8)^2*(x + 4)^2*(x + 16)^2*(x -12)^2*(x^2 -8*x -56)^2*(x + 7)^4; T[165,71]=(x^2 -192)*(x^2 -16*x + 32)*(x^3 -8*x^2 -32*x + 128)*(x -8)^2*(x + 8)^2*(x^2 -128)^2*(x )^2*(x + 3)^4; T[165,73]=(x^2 -4*x -104)*(x^3 + 14*x^2 + 4*x -344)*(x^2 -128)*(x -10)^2*(x -14)^2*(x + 14)^2*(x^2 + 8*x + 8)^2*(x -4)^4; T[165,79]=(x^2 + 20*x + 88)*(x^3 -12*x^2 -64*x + 800)*(x^2 -72)*(x -8)^2*(x + 4)^2*(x )^2*(x + 10)^4*(x -4)^4; T[165,83]=(x^2 -24*x + 132)*(x^3 -120*x + 16)*(x + 4)^2*(x + 10)^2*(x -12)^4*(x + 6)^8; T[165,89]=(x^2 + 12*x -12)*(x^2 + 4*x -28)*(x^3 + 10*x^2 -52*x -200)*(x -10)^2*(x^2 + 4*x -124)^2*(x -15)^4*(x + 6)^4; T[165,97]=(x^2 -12*x + 4)*(x^3 -22*x^2 + 108*x -8)*(x -10)^2*(x + 10)^2*(x^2 + 4*x -28)^2*(x -2)^4*(x + 7)^4; T[166,2]=(x^2 + x + 2)*(x^12 -x^11 + 3*x^10 -3*x^9 + 8*x^8 -10*x^7 + 16*x^6 -20*x^5 + 32*x^4 -24*x^3 + 48*x^2 -32*x + 64)*(x -1)^3*(x + 1)^3; T[166,3]=(x^2 + 2*x -4)*(x^3 -x^2 -6*x + 4)*(x^6 -x^5 -10*x^4 + 5*x^3 + 30*x^2 -4*x -25)^2*(x + 1)^3; T[166,5]=(x^2 -3*x + 1)*(x^3 + x^2 -5*x + 2)*(x^6 -2*x^5 -20*x^4 + 28*x^3 + 104*x^2 -64*x -160)^2*(x + 2)^3; T[166,7]=(x -1)*(x^2 + 3*x + 1)*(x^3 -2*x^2 -14*x -13)*(x + 3)^2*(x^6 -3*x^5 -22*x^4 + 55*x^3 + 154*x^2 -228*x -409)^2; T[166,11]=(x + 5)*(x^2 -6*x + 4)*(x^3 -5*x^2 + 2*x + 4)*(x -3)^2*(x^6 + 3*x^5 -26*x^4 -83*x^3 + 66*x^2 + 156*x -113)^2; T[166,13]=(x + 2)*(x^2 -3*x + 1)*(x^3 + 9*x^2 + 23*x + 14)*(x + 6)^2*(x^6 -14*x^5 + 44*x^4 + 108*x^3 -488*x^2 -288*x + 992)^2; T[166,17]=(x + 3)*(x^2 -7*x + 11)*(x^3 + 4*x^2 -26*x -31)*(x -5)^2*(x^6 + 5*x^5 -20*x^4 -77*x^3 + 162*x^2 + 188*x -275)^2; T[166,19]=(x + 2)*(x^2 + x -1)*(x^3 + 5*x^2 -67*x -358)*(x -2)^2*(x^6 + 4*x^5 -68*x^4 -300*x^3 + 976*x^2 + 5648*x + 6176)^2; T[166,23]=(x -4)*(x^2 -3*x -9)*(x^3 -7*x^2 + 11*x -4)*(x + 4)^2*(x^6 + 5*x^5 -61*x^4 -377*x^3 + 608*x^2 + 7024*x + 10912)^2; T[166,29]=(x + 3)*(x^3 -13*x^2 + 44*x -16)*(x + 7)^2*(x -4)^2*(x^6 + x^5 -88*x^4 -181*x^3 + 578*x^2 -192*x -55)^2; T[166,31]=(x -1)*(x^2 + 9*x + 19)*(x^3 + 4*x^2 -26*x -31)*(x -5)^2*(x^6 -3*x^5 -66*x^4 -93*x^3 + 390*x^2 + 608*x -313)^2; T[166,37]=(x -1)*(x^2 + 4*x -76)*(x^3 + 19*x^2 + 108*x + 164)*(x + 11)^2*(x^6 -39*x^5 + 576*x^4 -3785*x^3 + 7934*x^2 + 22268*x -91499)^2; T[166,41]=(x -6)*(x^2 + 3*x -29)*(x^3 -11*x^2 + x + 182)*(x + 2)^2*(x^6 + x^5 -47*x^4 -x^3 + 482*x^2 -516*x -248)^2; T[166,43]=(x -8)*(x^2 -x -31)*(x^3 -3*x^2 -43*x -8)*(x + 8)^2*(x^6 + 8*x^5 -44*x^4 -456*x^3 -192*x^2 + 4224*x + 6400)^2; T[166,47]=(x -12)*(x^2 -10*x -20)*(x^3 -2*x^2 -76*x + 256)*(x^6 + 12*x^5 -96*x^4 -1812*x^3 -6648*x^2 + 992*x + 25952)^2*(x )^2; T[166,53]=(x + 14)*(x^2 -7*x -19)*(x^3 + 9*x^2 -73*x -398)*(x -6)^2*(x^6 -14*x^5 -64*x^4 + 1064*x^3 + 448*x^2 -10048*x -64)^2; T[166,59]=(x + 3)*(x^2 -6*x -116)*(x^3 -7*x^2 -74*x + 316)*(x -5)^2*(x^6 + 17*x^5 + 10*x^4 -493*x^3 -1018*x^2 + 1768*x + 3527)^2; T[166,61]=(x + 7)*(x^2 -8*x -64)*(x^3 + 15*x^2 -28*x -784)*(x -5)^2*(x^6 + 5*x^5 -208*x^4 -565*x^3 + 10086*x^2 + 1436*x -47347)^2; T[166,67]=(x -2)*(x^2 + 21*x + 109)*(x^3 -15*x^2 -x + 458)*(x + 2)^2*(x^6 -16*x^5 -128*x^4 + 3240*x^3 -10464*x^2 -57376*x + 264256)^2; T[166,71]=(x + 14)*(x^2 -180)*(x^6 + 26*x^5 + 168*x^4 -216*x^3 -2688*x^2 + 1344*x + 7232)^2*(x -2)^5; T[166,73]=(x + 4)*(x^2 -18*x + 76)*(x^3 -6*x^2 -172*x -64)*(x^6 + 6*x^5 -268*x^4 -1484*x^3 + 17920*x^2 + 94416*x -39136)^2*(x )^2; T[166,79]=(x + 6)*(x^2 -2*x -124)*(x^3 -12*x^2 + 32*x -8)*(x -14)^2*(x^6 + 12*x^5 -12*x^4 -268*x^3 + 112*x^2 + 304*x -160)^2; T[166,83]=(x + 1)^6*(x -1)^14; T[166,89]=(x -4)*(x^2 -20)*(x^3 -4*x^2 -44*x -32)*(x^6 + 22*x^5 -28*x^4 -2424*x^3 -3232*x^2 + 56960*x + 144896)^2*(x )^2; T[166,97]=(x -12)*(x^2 + 10*x -20)*(x^3 + 10*x^2 -92*x -448)*(x + 8)^2*(x^6 -6*x^5 -300*x^4 + 1176*x^3 + 19296*x^2 + 9984*x -101120)^2; T[167,2]=(x^2 + x -1)*(x^12 -2*x^11 -17*x^10 + 33*x^9 + 103*x^8 -189*x^7 -277*x^6 + 447*x^5 + 363*x^4 -433*x^3 -205*x^2 + 120*x + 9); T[167,3]=(x^2 + x -1)*(x^12 -3*x^11 -22*x^10 + 71*x^9 + 145*x^8 -552*x^7 -243*x^6 + 1577*x^5 -122*x^4 -1737*x^3 + 384*x^2 + 599*x -91); T[167,5]=(x^12 -4*x^11 -41*x^10 + 152*x^9 + 648*x^8 -2136*x^7 -4816*x^6 + 13568*x^5 + 15616*x^4 -37632*x^3 -12544*x^2 + 33792*x -9216)*(x + 1)^2; T[167,7]=(x^2 + 5*x + 5)*(x^12 -11*x^11 + 4*x^10 + 335*x^9 -965*x^8 -2308*x^7 + 11629*x^6 -1491*x^5 -39468*x^4 + 30443*x^3 + 38438*x^2 -37689*x -1557); T[167,11]=(x^12 -77*x^10 -12*x^9 + 2080*x^8 + 500*x^7 -24675*x^6 -6388*x^5 + 127975*x^4 + 29620*x^3 -237953*x^2 -23960*x + 86192)*(x )^2; T[167,13]=(x^2 + 5*x + 5)*(x^12 -9*x^11 -47*x^10 + 642*x^9 -396*x^8 -12320*x^7 + 32400*x^6 + 35904*x^5 -180288*x^4 + 58880*x^3 + 179456*x^2 -38912*x -37888); T[167,17]=(x^2 + 5*x + 5)*(x^12 -3*x^11 -115*x^10 + 290*x^9 + 4240*x^8 -6768*x^7 -58928*x^6 + 23552*x^5 + 219648*x^4 + 53504*x^3 -235520*x^2 -182784*x -37888); T[167,19]=(x^2 -20)*(x^12 -105*x^10 -44*x^9 + 4048*x^8 + 2472*x^7 -71895*x^6 -45996*x^5 + 577911*x^4 + 278492*x^3 -1586817*x^2 + 92764*x + 53116); T[167,23]=(x^2 -x -1)*(x^12 -x^11 -165*x^10 + 270*x^9 + 9080*x^8 -21544*x^7 -187296*x^6 + 605312*x^5 + 929280*x^4 -4542720*x^3 + 2064640*x^2 + 3611648*x -846848); T[167,29]=(x^2 -8*x + 11)*(x^12 + 6*x^11 -136*x^10 -832*x^9 + 5035*x^8 + 28810*x^7 -80377*x^6 -386642*x^5 + 593524*x^4 + 1948164*x^3 -1746118*x^2 -1951914*x + 1467907); T[167,31]=(x^2 -6*x + 4)*(x^12 -2*x^11 -157*x^10 + 130*x^9 + 9384*x^8 + 3080*x^7 -255355*x^6 -351630*x^5 + 2807731*x^4 + 6418902*x^3 -5090641*x^2 -19199886*x -9529468); T[167,37]=(x^2 + 12*x + 31)*(x^12 -34*x^11 + 277*x^10 + 2844*x^9 -56708*x^8 + 186392*x^7 + 1840160*x^6 -16164384*x^5 + 32550592*x^4 + 77875840*x^3 -381885440*x^2 + 413890560*x -84354048); T[167,41]=(x^2 -2*x -79)*(x^12 + 14*x^11 -153*x^10 -2726*x^9 + 5716*x^8 + 192088*x^7 + 135232*x^6 -5840384*x^5 -11570752*x^4 + 66094080*x^3 + 170291200*x^2 -57360896*x -65094656); T[167,43]=(x^2 + 6*x -71)*(x^12 -6*x^11 -261*x^10 + 1090*x^9 + 22636*x^8 -37728*x^7 -815344*x^6 -488992*x^5 + 8852928*x^4 + 11935360*x^3 -26916864*x^2 -43177472*x + 2249728); T[167,47]=(x^12 -2*x^11 -228*x^10 + 690*x^9 + 15823*x^8 -52612*x^7 -403911*x^6 + 1078270*x^5 + 4764260*x^4 -6143054*x^3 -22830058*x^2 -6376254*x + 5029119)*(x -7)^2; T[167,53]=(x^2 + 10*x + 20)*(x^12 -10*x^11 -220*x^10 + 1864*x^9 + 17536*x^8 -106080*x^7 -704704*x^6 + 2355712*x^5 + 13545216*x^4 -22157824*x^3 -117528576*x^2 + 74051584*x + 363016192); T[167,59]=(x^2 + 2*x -4)*(x^12 + 28*x^11 -40*x^10 -7976*x^9 -60432*x^8 + 511232*x^7 + 7857600*x^6 + 11692672*x^5 -231181568*x^4 -1003786752*x^3 + 1004135424*x^2 + 11749515264*x + 16274108416); T[167,61]=(x^2 -5)*(x^12 -2*x^11 -296*x^10 + 304*x^9 + 31167*x^8 -3190*x^7 -1410501*x^6 -732102*x^5 + 26197676*x^4 + 18400300*x^3 -142676914*x^2 -5972514*x + 52291179); T[167,67]=(x^2 + 4*x -1)*(x^12 -28*x^11 + 45*x^10 + 5286*x^9 -43572*x^8 -217376*x^7 + 3612768*x^6 -5480128*x^5 -74165888*x^4 + 277654400*x^3 + 30137088*x^2 -956012032*x + 742796288); T[167,71]=(x^2 + 11*x -1)*(x^12 + 9*x^11 -285*x^10 -1718*x^9 + 26540*x^8 + 68856*x^7 -834336*x^6 -1274592*x^5 + 10718336*x^4 + 12128640*x^3 -50588672*x^2 -45652992*x + 30477312); T[167,73]=(x^2 + 19*x + 79)*(x^12 -61*x^11 + 1387*x^10 -12470*x^9 -13540*x^8 + 989344*x^7 -4496864*x^6 -17026144*x^5 + 151099520*x^4 -21136512*x^3 -1422816768*x^2 + 864962048*x + 4539186176); T[167,79]=(x^2 -2*x -19)*(x^12 -521*x^10 -1180*x^9 + 94976*x^8 + 364800*x^7 -7023232*x^6 -31040192*x^5 + 227270656*x^4 + 962447744*x^3 -3216951808*x^2 -9841861632*x + 16330576896); T[167,83]=(x^2 + 2*x -79)*(x^12 + 16*x^11 -345*x^10 -5600*x^9 + 41380*x^8 + 733800*x^7 -1774304*x^6 -44322368*x^5 -8948544*x^4 + 1181787520*x^3 + 2077619200*x^2 -9710987776*x -23933785088); T[167,89]=(x^2 + 2*x -124)*(x^12 + 12*x^11 -371*x^10 -5068*x^9 + 35136*x^8 + 666364*x^7 + 347635*x^6 -27249188*x^5 -106569273*x^4 + 57136816*x^3 + 785601361*x^2 + 758079950*x -347261236); T[167,97]=(x^2 + 21*x + 99)*(x^12 -73*x^11 + 1846*x^10 -9211*x^9 -444479*x^8 + 9243110*x^7 -55446501*x^6 -307055419*x^5 + 5942712174*x^4 -24664344089*x^3 -39346347616*x^2 + 552469534459*x -1132990973381); T[168,2]=(x -1)*(x^2 + x + 2)*(x + 1)^2*(x )^20; T[168,3]=(x^2 -2*x + 3)*(x^2 + 3)*(x^2 + 2*x + 3)^3*(x -1)^7*(x + 1)^8; T[168,5]=(x -4)^2*(x + 4)^2*(x -2)^4*(x )^8*(x + 2)^9; T[168,7]=(x^2 + 7)*(x -1)^11*(x + 1)^12; T[168,11]=(x + 6)^2*(x -2)^2*(x + 4)^5*(x -4)^6*(x )^10; T[168,13]=(x + 6)^2*(x )^2*(x -2)^4*(x -6)^4*(x + 4)^6*(x + 2)^7; T[168,17]=(x + 4)^2*(x )^2*(x + 2)^3*(x -2)^5*(x + 6)^6*(x -6)^7; T[168,19]=(x + 2)^2*(x -8)^2*(x -4)^5*(x -2)^6*(x + 4)^10; T[168,23]=(x + 4)^2*(x + 8)^2*(x + 6)^2*(x -2)^2*(x -8)^5*(x )^12; T[168,29]=(x + 10)*(x -2)^2*(x + 6)^6*(x -6)^7*(x + 2)^9; T[168,31]=(x + 8)^2*(x -4)^2*(x + 4)^6*(x -8)^6*(x )^9; T[168,37]=(x + 6)^2*(x + 2)^2*(x + 10)^4*(x -6)^7*(x -2)^10; T[168,41]=(x + 10)*(x -12)^2*(x )^2*(x + 2)^3*(x + 6)^5*(x -2)^6*(x -6)^6; T[168,43]=(x -12)*(x -4)^2*(x -8)^8*(x + 4)^14; T[168,47]=(x -8)*(x + 4)^2*(x + 8)^3*(x -12)^4*(x + 12)^6*(x )^9; T[168,53]=(x + 2)^2*(x + 10)^3*(x + 6)^4*(x -6)^16; T[168,59]=(x + 8)^2*(x -6)^2*(x )^4*(x -12)^5*(x -4)^6*(x + 6)^6; T[168,61]=(x + 6)^2*(x -4)^2*(x + 10)^3*(x -6)^5*(x -8)^6*(x + 2)^7; T[168,67]=(x + 12)^2*(x + 8)^2*(x -8)^2*(x -12)^2*(x -4)^7*(x + 4)^10; T[168,71]=(x + 12)*(x -4)*(x -14)^2*(x -6)^2*(x + 8)^2*(x -8)^5*(x )^12; T[168,73]=(x + 10)^2*(x + 2)^2*(x + 14)^3*(x + 6)^4*(x -10)^7*(x -2)^7; T[168,79]=(x -12)^2*(x + 4)^2*(x -16)^2*(x )^3*(x + 16)^4*(x + 8)^5*(x -8)^7; T[168,83]=(x -12)*(x -4)*(x -6)^2*(x -8)^2*(x + 6)^6*(x + 12)^6*(x + 4)^7; T[168,89]=(x + 2)*(x -6)*(x -10)^2*(x -12)^2*(x )^2*(x + 14)^4*(x + 6)^13; T[168,97]=(x -2)^2*(x + 6)^2*(x -10)^2*(x + 14)^3*(x -18)^4*(x + 2)^4*(x + 10)^8; T[169,2]=(x^2 -3)*(x^3 + 2*x^2 -x -1)*(x^3 -2*x^2 -x + 1); T[169,3]=(x -2)^2*(x^3 + 2*x^2 -x -1)^2; T[169,5]=(x^2 -3)*(x^3 + 4*x^2 + 3*x -1)*(x^3 -4*x^2 + 3*x + 1); T[169,7]=(x^3 + 3*x^2 -4*x -13)*(x^3 -3*x^2 -4*x + 13)*(x )^2; T[169,11]=(x^3 + 8*x^2 + 19*x + 13)*(x^3 -8*x^2 + 19*x -13)*(x )^2; T[169,13]=(x )^8; T[169,17]=(x -3)^2*(x^3 + 2*x^2 -15*x + 13)^2; T[169,19]=(x^2 -12)*(x^3 -4*x^2 -11*x + 1)*(x^3 + 4*x^2 -11*x -1); T[169,23]=(x -6)^2*(x^3 + 5*x^2 -x -13)^2; T[169,29]=(x -3)^2*(x^3 + x^2 -44*x + 83)^2; T[169,31]=(x^2 -12)*(x^3 -5*x^2 -36*x + 167)*(x^3 + 5*x^2 -36*x -167); T[169,37]=(x^2 -75)*(x^3 + 12*x^2 + 41*x + 29)*(x^3 -12*x^2 + 41*x -29); T[169,41]=(x^2 -27)*(x^3 -7*x^2 -49*x -49)*(x^3 + 7*x^2 -49*x + 49); T[169,43]=(x + 8)^2*(x^3 -13*x^2 + 40*x + 13)^2; T[169,47]=(x^2 -12)*(x^3 -18*x^2 + 101*x -167)*(x^3 + 18*x^2 + 101*x + 167); T[169,53]=(x + 3)^2*(x^3 -x^2 -86*x + 337)^2; T[169,59]=(x^2 -48)*(x^3 + 19*x^2 + 83*x + 1)*(x^3 -19*x^2 + 83*x -1); T[169,61]=(x -1)^2*(x^3 -4*x^2 -67*x + 239)^2; T[169,67]=(x^2 -12)*(x^3 -x^2 -72*x -41)*(x^3 + x^2 -72*x + 41); T[169,71]=(x^2 -12)*(x^3 -27*x^2 + 222*x -547)*(x^3 + 27*x^2 + 222*x + 547); T[169,73]=(x^2 -3)*(x^3 -9*x^2 -120*x + 911)*(x^3 + 9*x^2 -120*x -911); T[169,79]=(x -4)^2*(x^3 + 5*x^2 -162*x + 127)^2; T[169,83]=(x^2 -192)*(x^3 + 7*x^2 -140*x + 203)*(x^3 -7*x^2 -140*x -203); T[169,89]=(x^2 -48)*(x^3 -11*x^2 -74*x + 281)*(x^3 + 11*x^2 -74*x -281); T[169,97]=(x^2 -48)*(x^3 -7*x^2 -84*x + 301)*(x^3 + 7*x^2 -84*x -301); T[170,2]=(x^4 + 2*x^3 + 3*x^2 + 4*x + 4)*(x^2 -x + 2)*(x^4 + x^2 + 4)*(x^2 + x + 2)^2*(x + 1)^4*(x -1)^5; T[170,3]=(x -3)*(x^2 + x -4)*(x -2)^2*(x -1)^2*(x^2 -2*x -2)^2*(x^2 + 4*x + 2)^2*(x + 2)^4*(x )^4; T[170,5]=(x^2 + 5)*(x^2 + 2*x + 5)^2*(x -1)^8*(x + 1)^9; T[170,7]=(x^2 -2*x -16)*(x + 4)^2*(x^2 + 4*x + 2)^2*(x^2 + 2*x -2)^2*(x + 2)^3*(x -2)^4*(x -4)^4; T[170,11]=(x + 2)*(x -2)^2*(x^2 + 8*x + 14)^2*(x^2 -6*x + 6)^2*(x -6)^3*(x + 4)^3*(x )^6; T[170,13]=(x + 3)*(x + 6)*(x -5)*(x + 1)*(x^2 -5*x + 2)*(x^2 -8)^2*(x + 2)^4*(x + 4)^4*(x -2)^5; T[170,17]=(x -1)^11*(x + 1)^12; T[170,19]=(x -8)*(x + 8)*(x -3)*(x^2 + x -4)*(x + 1)^2*(x^2 -4*x -8)^2*(x^2 -8)^2*(x )^2*(x + 4)^6; T[170,23]=(x + 2)*(x^2 + 2*x -16)*(x^2 + 6*x -18)^2*(x^2 + 4*x + 2)^2*(x )^2*(x -6)^3*(x + 6)^3*(x -4)^4; T[170,29]=(x + 9)*(x -9)*(x + 3)*(x^2 -x -38)*(x^2 -12)^2*(x^2 + 4*x -4)^2*(x )^2*(x + 6)^3*(x -6)^5; T[170,31]=(x + 2)*(x -5)*(x -2)*(x + 1)*(x + 3)*(x^2 + 9*x + 16)*(x + 10)^2*(x + 4)^2*(x^2 -18)^2*(x^2 -10*x + 22)^2*(x -4)^4; T[170,37]=(x -8)*(x + 8)*(x -6)*(x^2 + 6*x -8)*(x^2 + 8*x + 4)^2*(x^2 + 4*x -68)^2*(x -2)^3*(x + 4)^3*(x + 2)^4; T[170,41]=(x -2)*(x^2 + 8*x -52)*(x -10)^2*(x^2 -12)^2*(x^2 -4*x -68)^2*(x -6)^3*(x + 6)^7; T[170,43]=(x -2)*(x + 10)*(x -6)*(x^2 -6*x -8)*(x + 4)^2*(x -8)^2*(x^2 + 8*x + 4)^2*(x^2 -4*x -28)^2*(x -4)^6; T[170,47]=(x + 13)*(x + 3)*(x + 9)*(x -4)*(x^2 -9*x + 16)*(x^2 -12*x -12)^2*(x^2 + 4*x -4)^2*(x -12)^3*(x )^6; T[170,53]=(x + 3)*(x^2 -3*x -2)*(x + 9)^2*(x + 6)^2*(x^2 -12*x + 4)^2*(x + 10)^3*(x -6)^9; T[170,59]=(x -15)*(x^2 + 13*x + 4)*(x -3)^2*(x -8)^2*(x^2 + 24*x + 136)^2*(x^2 -12*x + 24)^2*(x + 12)^4*(x )^4; T[170,61]=(x -11)*(x -7)*(x + 7)*(x -2)*(x^2 -19*x + 86)*(x + 4)^2*(x + 14)^2*(x^2 -4*x -28)^2*(x^2 -4*x -44)^2*(x + 10)^5; T[170,67]=(x -2)*(x -14)*(x + 2)*(x^2 + 10*x + 8)*(x^2 + 12*x + 28)^2*(x + 10)^4*(x -4)^4*(x -8)^6; T[170,71]=(x -14)*(x + 6)*(x -3)*(x^2 + 21*x + 72)*(x -9)^2*(x + 2)^2*(x^2 -18)^2*(x^2 -6*x -66)^2*(x )^2*(x + 4)^4; T[170,73]=(x -10)*(x + 3)*(x^2 -7*x -94)*(x + 14)^2*(x -11)^2*(x^2 + 4*x -4)^2*(x^2 + 8*x -92)^2*(x -2)^3*(x + 6)^4; T[170,79]=(x + 10)*(x^2 + 2*x -242)^2*(x^2 -8*x + 14)^2*(x + 14)^3*(x )^3*(x -12)^4*(x -8)^4; T[170,83]=(x + 12)*(x^2 -4*x -64)*(x -12)^2*(x -4)^2*(x^2 -24*x + 132)^2*(x^2 + 4*x -124)^2*(x )^3*(x + 4)^5; T[170,89]=(x -15)*(x^2 + 7*x -26)*(x + 9)^2*(x + 6)^2*(x^2 + 16*x + 32)^2*(x^2 + 12*x -72)^2*(x -10)^4*(x -6)^4; T[170,97]=(x -7)*(x + 14)*(x^2 -9*x -18)*(x -14)^2*(x + 7)^2*(x^2 -4*x -44)^2*(x^2 + 4*x -28)^2*(x -2)^7; T[171,2]=(x + 1)*(x^4 -9*x^2 + 12)*(x -1)^2*(x -2)^2*(x + 2)^4*(x )^4; T[171,3]=(x + 1)*(x^2 + 2*x + 3)*(x -1)^2*(x )^12; T[171,5]=(x -2)*(x + 1)*(x^4 -15*x^2 + 48)*(x -1)^2*(x + 2)^2*(x + 3)^3*(x -3)^4; T[171,7]=(x^2 -x -8)^2*(x + 5)^3*(x -3)^3*(x )^3*(x + 1)^4; T[171,11]=(x + 1)*(x^4 -27*x^2 + 108)*(x -1)^2*(x + 3)^3*(x )^3*(x -3)^4; T[171,13]=(x -6)^3*(x + 6)^3*(x + 4)^4*(x -2)^7; T[171,17]=(x -1)*(x -6)*(x^4 -15*x^2 + 48)*(x + 1)^2*(x + 6)^2*(x -3)^3*(x + 3)^4; T[171,19]=(x -1)^8*(x + 1)^9; T[171,23]=(x^4 -48*x^2 + 48)*(x + 4)^4*(x )^4*(x -4)^5; T[171,29]=(x + 6)*(x -10)*(x^4 -48*x^2 + 48)*(x + 10)^2*(x + 2)^3*(x -2)^3*(x -6)^3; T[171,31]=(x^2 + 2*x -32)^2*(x -8)^3*(x -2)^3*(x + 6)^3*(x + 4)^4; T[171,37]=(x^2 -10*x -8)^2*(x -8)^3*(x + 10)^3*(x )^3*(x -2)^4; T[171,41]=(x -6)*(x -8)*(x -2)*(x^4 -36*x^2 + 192)*(x + 8)^2*(x + 2)^2*(x + 6)^3*(x )^3; T[171,43]=(x^2 + 5*x -68)^2*(x + 4)^3*(x + 1)^10; T[171,47]=(x + 12)*(x -9)*(x^4 -99*x^2 + 1452)*(x + 9)^2*(x -12)^2*(x -3)^3*(x + 3)^4; T[171,53]=(x + 12)*(x + 10)*(x^4 -240*x^2 + 13872)*(x -10)^2*(x -6)^2*(x -12)^3*(x + 6)^4; T[171,59]=(x -8)*(x -6)*(x -12)*(x^4 -144*x^2 + 3072)*(x + 12)^2*(x + 8)^2*(x + 6)^3*(x )^3; T[171,61]=(x^2 -7*x -62)^2*(x + 2)^3*(x -7)^3*(x + 1)^7; T[171,67]=(x -8)^6*(x + 4)^11; T[171,71]=(x + 6)*(x^4 -192*x^2 + 768)*(x -12)^3*(x + 12)^3*(x -6)^3*(x )^3; T[171,73]=(x^2 -7*x -62)^2*(x -10)^3*(x + 7)^4*(x + 11)^6; T[171,79]=(x -16)^3*(x + 4)^4*(x -8)^4*(x )^6; T[171,83]=(x + 16)*(x + 4)*(x^4 -144*x^2 + 432)*(x -16)^2*(x + 12)^2*(x -4)^2*(x -12)^5; T[171,89]=(x -2)*(x + 10)*(x -6)*(x + 12)*(x^4 -240*x^2 + 13872)*(x -10)^2*(x + 6)^2*(x + 2)^2*(x -12)^3; T[171,97]=(x^2 + 8*x -116)^2*(x -10)^3*(x + 2)^3*(x + 10)^3*(x -8)^4; T[172,2]=(x^2 + 2*x + 2)*(x^4 + 2*x^2 + 4)*(x + 1)^2*(x -1)^2*(x )^10; T[172,3]=(x^2 -4*x + 2)*(x^2 + x -5)^2*(x^2 -x -1)^2*(x^2 -2)^3*(x + 2)^4; T[172,5]=(x^2 -2)*(x )*(x^2 + 3*x + 1)^2*(x^2 -3*x -3)^2*(x + 4)^3*(x^2 -4*x + 2)^3; T[172,7]=(x + 4)*(x^2 -2)*(x^2 -20)^2*(x^2 + 4*x + 2)^3*(x )^3*(x -2)^4; T[172,11]=(x + 3)*(x^2 -2*x -7)*(x^2 + 4*x -16)^2*(x -3)^3*(x^2 + 2*x -7)^3*(x )^4; T[172,13]=(x + 1)*(x^2 + 6*x + 1)*(x^2 -20)^2*(x + 5)^3*(x^2 -2*x -7)^3*(x -2)^4; T[172,17]=(x^2 -2*x -7)*(x^2 + x -1)^2*(x^2 + 9*x + 15)^2*(x^2 -10*x + 17)^3*(x + 3)^4; T[172,19]=(x -2)*(x^2 -11*x + 29)^2*(x^2 -x -47)^2*(x + 2)^3*(x^2 + 4*x -4)^4; T[172,23]=(x + 3)*(x -3)^2*(x^2 -3*x -9)^2*(x^2 + 9*x + 15)^2*(x + 1)^3*(x^2 -2*x -31)^3; T[172,29]=(x -6)*(x^2 + 4*x -14)*(x^2 -3*x -3)^2*(x^2 + 7*x + 1)^2*(x + 6)^3*(x^2 -18)^3; T[172,31]=(x -5)*(x^2 + 2*x -31)*(x^2 -x -47)^2*(x^2 -13*x + 41)^2*(x + 1)^3*(x + 3)^6; T[172,37]=(x -8)*(x^2 + 8*x + 8)*(x^2 -x -47)^2*(x^2 + 5*x + 5)^2*(x^2 -72)^3*(x )^3; T[172,41]=(x + 3)*(x^2 + 2*x -71)*(x^2 + 5*x -5)^2*(x^2 -3*x -45)^2*(x -5)^3*(x^2 + 2*x -7)^3; T[172,43]=(x + 1)^9*(x -1)^11; T[172,47]=(x + 12)*(x^2 -12*x + 4)*(x^2 + 9*x -27)^2*(x^2 -3*x -59)^2*(x -4)^3*(x -6)^6; T[172,53]=(x + 9)*(x^2 + 10*x + 17)*(x^2 -6*x -12)^2*(x^2 + 10*x + 20)^2*(x + 5)^3*(x^2 -22*x + 113)^3; T[172,59]=(x^2 -4*x -4)*(x^2 -16*x + 44)^2*(x^2 + 4*x -4)^3*(x + 12)^4*(x -6)^4; T[172,61]=(x + 10)*(x^2 -4*x -94)*(x^2 -4*x -76)^2*(x^2 -8*x -2)^3*(x -2)^7; T[172,67]=(x -11)*(x^2 + 2*x -71)*(x + 3)^3*(x^2 -2*x -71)^3*(x + 10)^4*(x -2)^4; T[172,71]=(x -6)*(x^2 -20*x + 92)*(x^2 + 16*x + 44)^2*(x^2 -84)^2*(x -2)^3*(x^2 + 12*x + 28)^3; T[172,73]=(x + 10)*(x^2 -4*x + 2)*(x^2 -4*x -76)^2*(x -2)^3*(x^2 + 24*x + 126)^3*(x -14)^4; T[172,79]=(x -8)*(x^2 + 4*x -4)*(x^2 + x -1)^2*(x^2 + 5*x -41)^2*(x + 8)^3*(x^2 -4*x -4)^3; T[172,83]=(x + 15)*(x -7)^2*(x^2 + 6*x -12)^2*(x^2 + 10*x -20)^2*(x -15)^3*(x^2 -18*x + 49)^3; T[172,89]=(x^2 -8*x -2)*(x )*(x^2 -2*x -44)^2*(x^2 -6*x -12)^2*(x + 4)^3*(x^2 + 12*x + 18)^3; T[172,97]=(x + 1)*(x^2 -22*x + 113)*(x^2 + 11*x -1)^2*(x^2 + 11*x -17)^2*(x -7)^3*(x^2 + 2*x -7)^3; T[173,2]=(x^4 + x^3 -3*x^2 -x + 1)*(x^10 -x^9 -16*x^8 + 16*x^7 + 85*x^6 -80*x^5 -175*x^4 + 136*x^3 + 138*x^2 -71*x -25); T[173,3]=(x^4 + 6*x^3 + 10*x^2 + 3*x -1)*(x^10 -8*x^9 + 11*x^8 + 59*x^7 -165*x^6 -55*x^5 + 484*x^4 -202*x^3 -390*x^2 + 169*x + 113); T[173,5]=(x^4 + x^3 -5*x^2 -7*x -1)*(x^10 -x^9 -29*x^8 + 41*x^7 + 253*x^6 -452*x^5 -548*x^4 + 1344*x^3 -544*x^2 -128*x + 64); T[173,7]=(x^4 + 9*x^3 + 27*x^2 + 31*x + 11)*(x^10 -11*x^9 + 20*x^8 + 168*x^7 -704*x^6 + 235*x^5 + 2126*x^4 -1607*x^3 -2023*x^2 + 1319*x + 577); T[173,11]=(x^4 + 5*x^3 -11*x^2 -65*x -31)*(x^10 -5*x^9 -34*x^8 + 188*x^7 + 194*x^6 -1935*x^5 + 1554*x^4 + 2983*x^3 -2373*x^2 -1687*x -25); T[173,13]=(x^4 + 5*x^3 -30*x^2 -200*x -275)*(x^10 -x^9 -63*x^8 + 59*x^7 + 1259*x^6 -1496*x^5 -9134*x^4 + 13207*x^3 + 14308*x^2 -19944*x + 5285); T[173,17]=(x^4 -2*x^3 -42*x^2 + 23*x + 331)*(x^10 + 2*x^9 -96*x^8 -223*x^7 + 2377*x^6 + 7604*x^5 -7004*x^4 -43200*x^3 -37216*x^2 + 1728*x + 6464); T[173,19]=(x^4 + 7*x^3 -5*x^2 -101*x -131)*(x^10 -7*x^9 -30*x^8 + 206*x^7 + 278*x^6 -1771*x^5 -1198*x^4 + 4849*x^3 + 2195*x^2 -2815*x + 7); T[173,23]=(x^4 + 11*x^3 + 22*x^2 -86*x -229)*(x^10 -5*x^9 -62*x^8 + 170*x^7 + 1091*x^6 -1852*x^5 -6116*x^4 + 6064*x^3 + 7584*x^2 -3072*x -832); T[173,29]=(x^4 -9*x^3 + 12*x^2 + 34*x -19)*(x^10 + 5*x^9 -97*x^8 -169*x^7 + 3029*x^6 -2570*x^5 -16026*x^4 + 13917*x^3 + 18606*x^2 -18894*x + 4141); T[173,31]=(x^4 -3*x^3 -32*x^2 -58*x -29)*(x^10 -3*x^9 -144*x^8 + 134*x^7 + 6715*x^6 + 1088*x^5 -123724*x^4 -92288*x^3 + 770064*x^2 + 659840*x -583744); T[173,37]=(x^4 + 14*x^3 -5*x^2 -618*x -1691)*(x^10 -8*x^9 -112*x^8 + 920*x^7 + 3950*x^6 -34894*x^5 -47832*x^4 + 515624*x^3 + 27177*x^2 -2472986*x + 2245561); T[173,41]=(x^4 -9*x^3 -98*x^2 + 834*x + 101)*(x^10 + 21*x^9 -59*x^8 -4045*x^7 -19545*x^6 + 176226*x^5 + 1630986*x^4 + 486953*x^3 -30978968*x^2 -96942550*x -74423567); T[173,43]=(x^4 + 24*x^3 + 190*x^2 + 537*x + 359)*(x^10 -48*x^9 + 810*x^8 -3363*x^7 -64405*x^6 + 905684*x^5 -3213692*x^4 -16233296*x^3 + 181186064*x^2 -599227200*x + 710485184); T[173,47]=(x^4 + 6*x^3 + 10*x^2 + 3*x -1)*(x^10 + 18*x^9 -158*x^8 -4285*x^7 -1401*x^6 + 314728*x^5 + 950132*x^4 -7279024*x^3 -27205616*x^2 + 23986048*x + 1469120); T[173,53]=(x^4 -4*x^3 -50*x^2 -92*x -31)*(x^10 -6*x^9 -304*x^8 + 1770*x^7 + 28955*x^6 -150276*x^5 -1035068*x^4 + 4379488*x^3 + 10008832*x^2 -29829312*x + 10368704); T[173,59]=(x^4 + 10*x^3 -60*x^2 -600*x -400)*(x^10 + 2*x^9 -271*x^8 -1176*x^7 + 20268*x^6 + 133604*x^5 -200739*x^4 -2736450*x^3 -2574556*x^2 + 13217816*x + 22113776); T[173,61]=(x^4 + 3*x^3 -146*x^2 -388*x -209)*(x^10 + 3*x^9 -226*x^8 -300*x^7 + 16857*x^6 -7212*x^5 -411476*x^4 + 836096*x^3 -244752*x^2 -197952*x + 60224); T[173,67]=(x^4 + 34*x^3 + 335*x^2 + 362*x -5731)*(x^10 -62*x^9 + 1635*x^8 -23834*x^7 + 208221*x^6 -1095940*x^5 + 3224908*x^4 -3785248*x^3 -3680336*x^2 + 12313920*x -5737408); T[173,71]=(x^10 -6*x^9 -290*x^8 + 1652*x^7 + 28180*x^6 -148774*x^5 -1011866*x^4 + 4433694*x^3 + 9080443*x^2 -11062120*x + 2198771)*(x^2 -9*x -41)^2; T[173,73]=(x^4 -x^3 -183*x^2 + 81*x + 7901)*(x^10 -7*x^9 -244*x^8 + 2352*x^7 + 11992*x^6 -195801*x^5 + 379526*x^4 + 2583679*x^3 -8863077*x^2 -7568607*x + 39229645); T[173,79]=(x^4 + 7*x^3 -140*x^2 -196*x -61)*(x^10 -17*x^9 -401*x^8 + 8041*x^7 + 36489*x^6 -1154444*x^5 + 439314*x^4 + 65444429*x^3 -159934854*x^2 -1275180248*x + 4525919897); T[173,83]=(x^4 + 8*x^3 -206*x^2 -688*x + 10021)*(x^10 -4*x^9 -398*x^8 + 1100*x^7 + 37361*x^6 -101568*x^5 -875996*x^4 + 1405088*x^3 + 5659744*x^2 -5829120*x -5440448); T[173,89]=(x^4 -6*x^3 -120*x^2 + 847*x -931)*(x^10 + 20*x^9 -147*x^8 -4733*x^7 -7035*x^6 + 302225*x^5 + 1244904*x^4 -4653382*x^3 -24091534*x^2 + 21012731*x + 124693673); T[173,97]=(x^4 -7*x^3 -272*x^2 + 1068*x + 7921)*(x^10 + x^9 -780*x^8 -602*x^7 + 201419*x^6 + 173076*x^5 -19687636*x^4 -21063680*x^3 + 568879360*x^2 + 213226368*x -3716511808); T[174,2]=(x^4 -x^3 + 3*x^2 -2*x + 4)*(x^6 -2*x^5 + 2*x^4 -x^3 + 4*x^2 -8*x + 8)*(x^4 + 2*x^3 + 3*x^2 + 4*x + 4)^2*(x -1)^4*(x + 1)^5; T[174,3]=(x^2 + x + 3)*(x^2 + 3*x + 3)*(x^4 -2*x^3 + 5*x^2 -6*x + 9)^2*(x -1)^7*(x + 1)^8; T[174,5]=(x -3)*(x -2)*(x^2 -2*x -4)^2*(x^3 -16*x + 8)^2*(x + 3)^3*(x -1)^3*(x + 1)^9; T[174,7]=(x + 3)*(x -5)*(x )*(x -1)^2*(x^2 + 4*x -1)^2*(x^3 -4*x^2 -x + 8)^2*(x + 2)^4*(x^2 -8)^4; T[174,11]=(x + 4)*(x + 2)*(x + 1)^2*(x + 3)^2*(x^2 -4*x -1)^2*(x^3 + 8*x^2 + 15*x + 4)^2*(x -6)^3*(x^2 -2*x -1)^4; T[174,13]=(x -6)*(x -3)^2*(x + 1)^2*(x + 4)^2*(x^2 + 2*x -19)^2*(x^3 -4*x^2 -7*x + 26)^2*(x )^2*(x^2 + 2*x -7)^4; T[174,17]=(x + 3)*(x -7)*(x + 2)*(x + 7)*(x -8)^2*(x + 4)^2*(x^3 -4*x^2 -27*x + 94)^2*(x^2 + 4*x -4)^4*(x -3)^5; T[174,19]=(x -5)*(x + 3)*(x -4)*(x + 8)^2*(x + 1)^2*(x^2 + 10*x + 20)^2*(x^3 + 2*x^2 -20*x + 16)^2*(x )^2*(x -6)^8; T[174,23]=(x + 8)*(x + 4)*(x^2 + 2*x -44)^2*(x^3 -6*x^2 -4*x + 32)^2*(x -4)^3*(x^2 + 4*x -28)^4*(x )^4; T[174,29]=(x + 1)^11*(x -1)^16; T[174,31]=(x -4)*(x + 8)*(x )*(x -3)^2*(x + 4)^2*(x + 3)^2*(x^2 + 6*x -36)^2*(x^3 -6*x^2 -4*x + 32)^2*(x^2 -6*x -41)^4; T[174,37]=(x + 6)*(x + 3)*(x + 7)*(x + 1)*(x -3)*(x -8)^2*(x + 8)^2*(x^2 -6*x + 4)^2*(x^3 -8*x^2 + 8)^2*(x + 4)^8; T[174,41]=(x + 7)*(x + 5)*(x + 9)*(x -6)*(x -5)*(x + 2)^2*(x^3 + 2*x^2 -100*x + 56)^2*(x^2 -8*x -56)^4*(x -2)^6; T[174,43]=(x -9)*(x + 12)*(x + 5)*(x + 7)*(x -3)*(x + 11)^2*(x -7)^2*(x^3 + 4*x^2 -96*x -256)^2*(x -4)^4*(x^2 -10*x + 23)^4; T[174,47]=(x + 1)*(x + 3)*(x + 5)*(x + 8)*(x -9)*(x -13)^2*(x -11)^2*(x^2 + 4*x -41)^2*(x^3 + 12*x^2 -9*x -216)^2*(x^2 -2*x -17)^4; T[174,53]=(x -10)*(x + 11)^2*(x + 6)^2*(x -1)^2*(x + 2)^2*(x^2 -18*x + 76)^2*(x^3 -8*x^2 -104*x + 248)^2*(x^2 -2*x -71)^4; T[174,59]=(x -8)*(x + 3)*(x + 11)*(x + 4)^2*(x -3)^2*(x^2 -20)^2*(x^3 + 20*x^2 + 108*x + 112)^2*(x )^2*(x^2 -4*x -28)^4; T[174,61]=(x + 10)*(x -6)*(x + 6)*(x + 8)^2*(x -4)^2*(x -10)^2*(x^2 + 6*x + 4)^2*(x^3 -4*x^2 -16*x + 56)^2*(x^2 + 4*x -4)^4; T[174,67]=(x -12)*(x + 12)^2*(x^2 + 4*x -121)^2*(x^3 -57*x + 52)^2*(x )^2*(x + 4)^4*(x^2 -32)^4; T[174,71]=(x -12)*(x + 8)*(x -16)*(x + 4)*(x )*(x + 2)^2*(x -2)^2*(x^2 + 6*x + 4)^2*(x^3 + 14*x^2 -60*x -416)^2*(x^2 + 12*x + 28)^4; T[174,73]=(x -10)*(x + 12)^2*(x -2)^2*(x + 10)^2*(x^2 -18*x + 76)^2*(x^3 + 8*x^2 -8)^2*(x -4)^10; T[174,79]=(x + 6)*(x -4)*(x -10)*(x + 2)*(x -14)*(x -15)^2*(x + 7)^2*(x^2 + 30*x + 220)^2*(x^3 + 2*x^2 -60*x -224)^2*(x^2 + 2*x -1)^4; T[174,83]=(x -16)*(x -4)^2*(x^2 + 12*x -44)^2*(x^3 + 8*x^2 -28*x -208)^2*(x^2 -4*x -28)^4*(x )^6; T[174,89]=(x -6)*(x -14)*(x -10)*(x^3 + 8*x^2 -131*x -74)^2*(x + 6)^3*(x + 10)^3*(x -5)^4*(x^2 + 8*x -56)^4; T[174,97]=(x -8)*(x -18)*(x + 8)*(x + 6)^2*(x + 2)^2*(x^2 -6*x -236)^2*(x^3 -4*x^2 -72*x -104)^2*(x )^2*(x^2 + 8*x -56)^4; T[175,2]=(x -2)*(x + 2)*(x^2 -x -4)*(x^2 -x -1)*(x^2 + x -1)*(x^2 + x -4)^2*(x )^3; T[175,3]=(x^2 -x -4)*(x^2 + 2*x -4)*(x^2 -2*x -4)*(x + 1)^2*(x^2 + x -4)^2*(x -1)^3; T[175,5]=(x + 1)*(x -1)^2*(x )^12; T[175,7]=(x -1)^7*(x + 1)^8; T[175,11]=(x^2 -4*x -1)^2*(x^2 -x -4)^3*(x + 3)^5; T[175,13]=(x -1)*(x + 5)*(x + 1)*(x^2 -2*x -4)*(x^2 + 2*x -4)*(x^2 + 5*x + 2)*(x -5)^2*(x^2 -5*x + 2)^2; T[175,17]=(x + 3)*(x -7)*(x + 7)*(x^2 + 4*x -16)*(x^2 -4*x -16)*(x^2 -5*x + 2)*(x -3)^2*(x^2 + 5*x + 2)^2; T[175,19]=(x^2 -20)^2*(x )^2*(x -2)^3*(x^2 + 6*x -8)^3; T[175,23]=(x^2 + 8*x + 11)*(x^2 -8*x + 11)*(x^2 -2*x -16)*(x -6)^2*(x^2 + 2*x -16)^2*(x + 6)^3; T[175,29]=(x + 5)^2*(x -3)^3*(x^2 -x -38)^3*(x -5)^4; T[175,31]=(x -2)^2*(x^2 + 6*x -36)^2*(x + 4)^3*(x )^6; T[175,37]=(x + 3)^2*(x + 2)^2*(x + 6)^2*(x -3)^2*(x -2)^3*(x -6)^4; T[175,41]=(x -2)^2*(x^2 -14*x + 44)^2*(x + 12)^3*(x^2 -2*x -16)^3; T[175,43]=(x -4)*(x -10)*(x + 4)*(x^2 -8*x + 11)*(x^2 + 10*x + 8)*(x^2 + 8*x + 11)*(x + 10)^2*(x^2 -10*x + 8)^2; T[175,47]=(x + 3)*(x + 9)*(x -3)*(x^2 -5*x -32)*(x + 2)^2*(x -2)^2*(x -9)^2*(x^2 + 5*x -32)^2; T[175,53]=(x + 12)*(x + 6)*(x -6)*(x^2 -8*x -4)*(x^2 -2*x -16)*(x^2 + 8*x -4)*(x -12)^2*(x^2 + 2*x -16)^2; T[175,59]=(x -10)^2*(x^2 -10*x -20)^2*(x )^3*(x + 4)^6; T[175,61]=(x + 8)^2*(x^2 + 6*x -36)^2*(x -8)^3*(x^2 -6*x -144)^3; T[175,67]=(x + 2)*(x -2)*(x -4)*(x^2 -4*x -1)*(x^2 + 4*x -1)*(x^2 + 4*x -64)*(x + 4)^2*(x^2 -4*x -64)^2; T[175,71]=(x + 8)^2*(x^2 -4*x -41)^2*(x )^3*(x -8)^6; T[175,73]=(x + 2)*(x + 6)*(x -6)*(x^2 -8*x -52)*(x^2 + 22*x + 116)*(x^2 -22*x + 116)*(x -2)^2*(x^2 + 8*x -52)^2; T[175,79]=(x + 5)^2*(x^2 -125)^2*(x + 1)^3*(x^2 + 9*x + 16)^3; T[175,83]=(x + 12)*(x^2 -2*x -44)*(x^2 + 2*x -44)*(x -12)^2*(x + 4)^3*(x -4)^5; T[175,89]=(x^2 -30*x + 220)^2*(x )^2*(x + 12)^3*(x^2 -6*x -8)^3; T[175,97]=(x -7)*(x -1)*(x + 7)*(x^2 -6*x + 4)*(x^2 + 6*x + 4)*(x^2 -9*x -86)*(x + 1)^2*(x^2 + 9*x -86)^2; T[176,2]=(x^2 + 2*x + 2)*(x )^17; T[176,3]=(x -3)*(x^2 + x -4)*(x + 3)^2*(x^2 -x -4)^2*(x -1)^4*(x + 1)^6; T[176,5]=(x^2 -3*x -2)^3*(x -1)^6*(x + 3)^7; T[176,7]=(x^2 -2*x -16)*(x^2 + 2*x -16)^2*(x -2)^5*(x + 2)^8; T[176,11]=(x -1)^9*(x + 1)^10; T[176,13]=(x^2 + 2*x -16)^3*(x )^3*(x + 4)^4*(x -4)^6; T[176,17]=(x + 6)^3*(x -6)^4*(x + 2)^6*(x -2)^6; T[176,19]=(x + 8)*(x -8)^3*(x -4)^4*(x + 4)^5*(x )^6; T[176,23]=(x -3)*(x^2 + 9*x + 16)*(x^2 -9*x + 16)^2*(x + 3)^3*(x -1)^3*(x + 1)^6; T[176,29]=(x + 8)^3*(x^2 + 2*x -16)^3*(x )^10; T[176,31]=(x + 5)*(x^2 -7*x + 8)*(x^2 + 7*x + 8)^2*(x + 7)^3*(x -5)^3*(x -7)^6; T[176,37]=(x^2 + 11*x + 26)^3*(x -3)^6*(x + 1)^7; T[176,41]=(x -4)^3*(x^2 -6*x -8)^3*(x )^4*(x + 8)^6; T[176,43]=(x -10)*(x^2 -6*x -8)*(x^2 + 6*x -8)^2*(x -6)^3*(x + 10)^3*(x + 6)^6; T[176,47]=(x )^4*(x + 8)^5*(x -8)^10; T[176,53]=(x -2)^3*(x^2 -8*x -52)^3*(x + 6)^10; T[176,59]=(x + 3)*(x -1)*(x + 5)*(x^2 -5*x -100)*(x + 1)^2*(x^2 + 5*x -100)^2*(x -3)^3*(x -5)^5; T[176,61]=(x -4)^3*(x^2 + 6*x -8)^3*(x + 4)^4*(x -12)^6; T[176,67]=(x -5)*(x -1)*(x -7)*(x^2 + 15*x + 52)*(x + 5)^2*(x^2 -15*x + 52)^2*(x + 1)^3*(x + 7)^5; T[176,71]=(x + 15)*(x^2 -5*x -32)*(x^2 + 5*x -32)^2*(x -15)^3*(x -3)^3*(x + 3)^6; T[176,73]=(x -16)^3*(x^2 -2*x -16)^3*(x + 4)^4*(x -4)^6; T[176,79]=(x -10)*(x^2 -14*x + 32)*(x + 2)^2*(x^2 + 14*x + 32)^2*(x + 10)^5*(x -2)^5; T[176,83]=(x -2)*(x^2 + 10*x + 8)*(x + 2)^2*(x^2 -10*x + 8)^2*(x -6)^4*(x + 6)^6; T[176,89]=(x^2 + 7*x -26)^3*(x + 9)^4*(x -15)^9; T[176,97]=(x^2 -27*x + 178)^3*(x + 7)^13; T[177,2]=(x^2 + x -1)*(x^2 -x -1)*(x^2 + 3*x + 1)*(x^3 -4*x -1)*(x^5 -9*x^3 + 2*x^2 + 16*x -8)^2; T[177,3]=(x^10 + 2*x^9 + 7*x^8 + 13*x^7 + 31*x^6 + 41*x^5 + 93*x^4 + 117*x^3 + 189*x^2 + 162*x + 243)*(x -1)^4*(x + 1)^5; T[177,5]=(x^2 -5)*(x^3 + 2*x^2 -5*x -2)*(x -1)^2*(x + 3)^2*(x^5 -2*x^4 -14*x^3 + 23*x^2 + 19*x + 1)^2; T[177,7]=(x^2 -x -1)*(x^3 -9*x^2 + 23*x -16)*(x^2 + 7*x + 11)^2*(x^5 -2*x^4 -16*x^3 + 43*x^2 + 13*x -71)^2; T[177,11]=(x^2 -5)*(x^2 + 2*x -19)*(x^2 -4*x -1)*(x^3 + 2*x^2 -11*x + 4)*(x^5 + 2*x^4 -24*x^3 -24*x^2 + 128*x -64)^2; T[177,13]=(x^2 + 8*x + 11)*(x^2 -45)*(x^3 -4*x^2 -7*x + 26)*(x + 1)^2*(x^5 -8*x^4 + 88*x^2 -48*x -224)^2; T[177,17]=(x^2 -x -11)*(x^2 + 3*x -9)*(x^2 + 3*x + 1)*(x^3 -3*x^2 -43*x + 98)*(x^5 + x^4 -45*x^3 -81*x^2 + 224*x + 412)^2; T[177,19]=(x^2 + 5*x -25)*(x^3 -7*x^2 + 11*x -4)*(x^2 + 5*x -5)^2*(x^5 -6*x^4 -28*x^3 + 217*x^2 -167*x -469)^2; T[177,23]=(x^2 + 5*x + 5)*(x^2 + 7*x + 11)*(x^2 -3*x -9)*(x^3 -x^2 -27*x + 64)*(x^5 + 8*x^4 -88*x^2 -112*x -32)^2; T[177,29]=(x^2 -15*x + 55)*(x^2 -5*x + 5)*(x^2 + 11*x + 29)*(x^3 + 11*x^2 + 9*x -74)*(x^5 -14*x^4 + 10*x^3 + 389*x^2 -485*x -1757)^2; T[177,31]=(x^2 + 7*x + 11)*(x^2 + x -11)*(x^2 + x -101)*(x^3 -13*x^2 + 37*x + 28)*(x^5 -116*x^3 + 56*x^2 + 1280*x + 256)^2; T[177,37]=(x^2 + x -31)*(x^2 + 9*x + 19)*(x^2 + 7*x + 1)*(x^3 + 5*x^2 -19*x + 14)*(x^5 -18*x^4 + 80*x^3 + 64*x^2 -592*x + 32)^2; T[177,41]=(x^2 -5*x -25)*(x^3 + x^2 -39*x + 74)*(x^2 + x -31)^2*(x^5 + 10*x^4 -70*x^3 -693*x^2 -93*x + 217)^2; T[177,43]=(x^2 -12*x -9)*(x^2 + 4*x -41)*(x^2 + 2*x -79)*(x^3 -6*x^2 -91*x + 592)*(x^5 + 4*x^4 -28*x^3 -56*x^2 + 256*x -128)^2; T[177,47]=(x^2 -11*x + 29)*(x^2 + 15*x + 45)*(x^2 + 3*x -9)*(x^3 -11*x^2 -37*x + 496)*(x^5 + 20*x^4 + 124*x^3 + 192*x^2 -320*x -256)^2; T[177,53]=(x^2 + 2*x -79)*(x^2 -8*x + 11)*(x^2 -2*x -19)*(x^3 -2*x^2 -89*x -58)*(x^5 + 10*x^4 -22*x^3 -77*x^2 + 91*x + 73)^2; T[177,59]=(x + 1)^4*(x -1)^15; T[177,61]=(x^2 + x -11)*(x^2 -13*x + 11)*(x^2 + 13*x + 31)*(x^3 + x^2 -101*x + 98)*(x^5 -22*x^4 + 56*x^3 + 1368*x^2 -8448*x + 11072)^2; T[177,67]=(x^2 -6*x -71)*(x^2 + 4*x -1)*(x^2 -8*x -29)*(x^3 -10*x^2 -119*x + 784)*(x^5 -188*x^3 -200*x^2 + 5472*x -8896)^2; T[177,71]=(x^2 -4*x -41)*(x^2 -2*x -79)*(x^2 -4*x -1)*(x^3 -26*x^2 + 193*x -424)*(x^5 -3*x^4 -77*x^3 + 15*x^2 + 1696*x + 3424)^2; T[177,73]=(x^2 -5*x -25)*(x^2 -3*x + 1)*(x^2 + 5*x -5)*(x^3 -7*x^2 -141*x + 718)*(x^5 + 8*x^4 -120*x^3 -1128*x^2 -336*x + 9952)^2; T[177,79]=(x^2 -10*x -55)*(x^3 -2*x^2 -31*x -32)*(x^5 -10*x^4 -60*x^3 + 1005*x^2 -3631*x + 3923)^2*(x + 3)^4; T[177,83]=(x^2 + x -1)*(x^2 -13*x + 31)*(x^2 + 9*x + 9)*(x^3 + 3*x^2 -199*x -148)*(x^5 -6*x^4 -260*x^3 + 848*x^2 + 15296*x + 29152)^2; T[177,89]=(x^2 + 3*x -149)*(x^2 + 5*x -25)*(x^2 -x -31)*(x^3 + 23*x^2 + 91*x -278)*(x^5 -10*x^4 -80*x^3 + 600*x^2 + 1984*x -1984)^2; T[177,97]=(x^2 + 10*x + 5)*(x^2 + 4*x -41)*(x^3 -14*x^2 -25*x + 202)*(x -3)^2*(x^5 + 22*x^4 + 60*x^3 -576*x^2 -352*x + 2656)^2; T[178,2]=(x^2 -x + 2)*(x^2 + x + 2)*(x^10 + x^9 -2*x^7 + x^6 + x^5 + 2*x^4 -8*x^3 + 16*x + 32)*(x + 1)^3*(x -1)^4; T[178,3]=(x -1)*(x^2 + 2*x -1)*(x^3 -x^2 -8*x + 4)*(x + 1)^2*(x^5 + 3*x^4 -4*x^3 -16*x^2 -9*x -1)^2*(x -2)^3; T[178,5]=(x -2)*(x -3)*(x^2 + 2*x -7)*(x^3 + x^2 -8*x -4)*(x + 2)^2*(x + 1)^2*(x^5 + x^4 -14*x^3 -14*x^2 + 29*x + 13)^2; T[178,7]=(x^3 -10*x + 8)*(x )*(x -2)^2*(x + 2)^2*(x^5 -8*x^4 + 10*x^3 + 36*x^2 -68*x + 28)^2*(x + 4)^3; T[178,11]=(x + 6)*(x^2 + 4*x -4)*(x )*(x + 4)^2*(x + 2)^2*(x^5 -6*x^4 -20*x^3 + 112*x^2 + 80*x -112)^2*(x -2)^3; T[178,13]=(x + 4)*(x^3 + 2*x^2 -18*x -44)*(x + 2)^2*(x^5 -28*x^3 -56*x^2 + 16)^2*(x -2)^5; T[178,17]=(x -2)*(x^2 + 6*x + 1)*(x^3 + 5*x^2 -16*x -64)*(x -6)^2*(x^5 + 13*x^4 + 34*x^3 -154*x^2 -791*x -883)^2*(x -3)^3; T[178,19]=(x -5)*(x^2 -2*x -1)*(x^3 + 11*x^2 + 32*x + 20)*(x + 5)^2*(x^5 -13*x^4 + 42*x^3 + 42*x^2 -297*x + 199)^2*(x + 2)^3; T[178,23]=(x + 3)*(x -8)*(x^2 + 14*x + 47)*(x^3 -5*x^2 -54*x + 122)*(x -7)^2*(x -2)^2*(x^5 -x^4 -62*x^3 + 150*x^2 + 631*x -1657)^2; T[178,29]=(x^2 -32)*(x^3 -4*x^2 -74*x + 160)*(x + 6)^2*(x^5 -2*x^4 -72*x^3 + 312*x^2 -48*x -784)^2*(x )^4; T[178,31]=(x -5)*(x^2 -6*x + 7)*(x^3 + 19*x^2 + 114*x + 218)*(x )*(x -6)^2*(x + 9)^2*(x^5 -19*x^4 + 102*x^3 -114*x^2 + 13*x + 7)^2; T[178,37]=(x + 10)*(x^2 -12*x + 4)*(x^3 -10*x^2 + 14*x -4)*(x )*(x + 2)^2*(x -10)^2*(x^5 + 14*x^4 + 8*x^3 -336*x^2 + 80*x + 1120)^2; T[178,41]=(x + 10)*(x^2 -32)*(x^3 + 4*x^2 -20*x -64)*(x + 6)^2*(x^5 + 2*x^4 -60*x^3 -24*x^2 + 800*x -1072)^2*(x )^3; T[178,43]=(x + 2)*(x + 1)*(x^2 -6*x -41)*(x^3 + 9*x^2 -16*x -44)*(x -2)^2*(x + 7)^2*(x^5 -x^4 -68*x^3 -56*x^2 + 877*x + 1573)^2; T[178,47]=(x + 8)*(x^3 -12*x^2 + 8*x + 32)*(x + 12)^2*(x^5 + 4*x^4 -44*x^3 + 32*x^2 + 112*x -16)^2*(x )^2*(x -12)^3; T[178,53]=(x -6)*(x -9)*(x^2 + 10*x -7)*(x^3 -21*x^2 + 56*x + 628)*(x + 6)^2*(x + 3)^2*(x^5 + 11*x^4 -6*x^3 -342*x^2 -547*x + 1319)^2; T[178,59]=(x -10)*(x -12)*(x^2 + 4*x -124)*(x^3 + 8*x^2 -12*x -80)*(x -4)^2*(x + 10)^2*(x^5 -118*x^3 + 784*x^2 -1900*x + 1580)^2; T[178,61]=(x + 10)*(x + 4)*(x^2 -12*x + 4)*(x^3 -2*x^2 -50*x -100)*(x + 6)^2*(x -6)^2*(x^5 -4*x^4 -8*x^3 + 24*x^2 + 16*x -16)^2; T[178,67]=(x + 4)*(x + 8)*(x^2 + 16*x + 32)*(x^3 -16*x^2 + 52*x + 16)*(x^5 -4*x^4 -136*x^3 + 240*x^2 + 4800*x + 2000)^2*(x -12)^4; T[178,71]=(x + 6)*(x -8)*(x^2 + 4*x -68)*(x^3 -10*x^2 -88*x + 848)*(x + 10)^2*(x -4)^2*(x^5 + 2*x^4 -280*x^3 -624*x^2 + 19280*x + 47008)^2; T[178,73]=(x + 2)*(x + 1)*(x^2 + 2*x -127)*(x^3 + x^2 -128*x + 512)*(x -10)^2*(x -7)^2*(x^5 + 25*x^4 + 186*x^3 + 234*x^2 -1595*x -3475)^2; T[178,79]=(x -8)*(x + 10)*(x^2 + 12*x + 28)*(x^3 + 10*x^2 + 8*x -80)*(x + 6)^2*(x + 12)^2*(x^5 -54*x^4 + 1096*x^3 -10352*x^2 + 45392*x -74464)^2; T[178,83]=(x + 12)*(x -14)*(x^2 -4*x -124)*(x^3 -172*x + 464)*(x -12)^2*(x + 6)^2*(x^5 + 20*x^4 + 78*x^3 -244*x^2 -172*x + 196)^2; T[178,89]=(x + 1)^8*(x -1)^13; T[178,97]=(x -17)*(x + 2)*(x^2 + 2*x -199)*(x^3 + 19*x^2 -8*x -4)*(x + 18)^2*(x -9)^2*(x^5 -13*x^4 -130*x^3 + 2750*x^2 -13859*x + 21599)^2; T[179,2]=(x -2)*(x^3 + x^2 -2*x -1)*(x^11 + 3*x^10 -14*x^9 -45*x^8 + 59*x^7 + 225*x^6 -58*x^5 -427*x^4 -76*x^3 + 240*x^2 + 56*x -16); T[179,3]=(x^3 + 2*x^2 -x -1)*(x^11 -25*x^9 + 5*x^8 + 219*x^7 -98*x^6 -781*x^5 + 589*x^4 + 901*x^3 -1000*x^2 + 185*x -9)*(x ); T[179,5]=(x -3)*(x^3 + 4*x^2 + 3*x -1)*(x^11 -3*x^10 -28*x^9 + 65*x^8 + 310*x^7 -499*x^6 -1680*x^5 + 1613*x^4 + 4325*x^3 -1977*x^2 -4019*x + 663); T[179,7]=(x + 4)*(x^3 + 4*x^2 + 3*x -1)*(x^11 -8*x^10 -19*x^9 + 281*x^8 -202*x^7 -2904*x^6 + 4160*x^5 + 12464*x^4 -18560*x^3 -26624*x^2 + 25728*x + 27392); T[179,11]=(x -4)*(x^3 + 3*x^2 -4*x + 1)*(x^11 + 9*x^10 -24*x^9 -359*x^8 + 4*x^7 + 5052*x^6 + 2592*x^5 -32352*x^4 -15552*x^3 + 94144*x^2 + 21504*x -95488); T[179,13]=(x + 1)*(x^3 + 11*x^2 + 38*x + 41)*(x^11 -24*x^10 + 206*x^9 -583*x^8 -1712*x^7 + 14840*x^6 -30091*x^5 + 2233*x^4 + 47058*x^3 -11030*x^2 -30872*x -7499); T[179,17]=(x -1)*(x^3 -2*x^2 -43*x + 127)*(x^11 -7*x^10 -96*x^9 + 805*x^8 + 1944*x^7 -27517*x^6 + 30516*x^5 + 231223*x^4 -638875*x^3 + 439149*x^2 -66785*x -4981); T[179,19]=(x + 3)*(x^3 + 9*x^2 + 6*x -29)*(x^11 -20*x^10 + 100*x^9 + 383*x^8 -4298*x^7 + 4108*x^6 + 41581*x^5 -77559*x^4 -111868*x^3 + 220520*x^2 + 90194*x -171723); T[179,23]=(x -6)*(x^3 -9*x^2 + 6*x + 43)*(x^11 + 9*x^10 -92*x^9 -961*x^8 + 1564*x^7 + 30088*x^6 + 30024*x^5 -262416*x^4 -548928*x^3 -24960*x^2 + 315904*x + 113664); T[179,29]=(x -3)*(x^3 + x^2 -58*x + 13)*(x^11 -6*x^10 -228*x^9 + 1115*x^8 + 17466*x^7 -52516*x^6 -579673*x^5 + 358935*x^4 + 7408874*x^3 + 9821980*x^2 -7414748*x -13759239); T[179,31]=(x + 8)*(x^3 + x^2 -58*x + 13)*(x^11 -13*x^10 -84*x^9 + 1381*x^8 + 931*x^7 -39311*x^6 + 28090*x^5 + 324335*x^4 -426833*x^3 + 15077*x^2 + 109600*x -25063); T[179,37]=(x -2)*(x^3 + 2*x^2 -85*x -337)*(x^11 -161*x^9 -105*x^8 + 8216*x^7 + 8376*x^6 -147336*x^5 -134928*x^4 + 736576*x^3 -44416*x^2 -266752*x -44032); T[179,41]=(x -12)*(x^3 -x^2 -44*x -83)*(x^11 + 17*x^10 -72*x^9 -2367*x^8 -6252*x^7 + 58960*x^6 + 255992*x^5 -220480*x^4 -2035136*x^3 -1133312*x^2 + 4046464*x + 4086528); T[179,43]=(x + 11)*(x^3 -10*x^2 + 3*x + 97)*(x^11 -15*x^10 -36*x^9 + 1511*x^8 -7566*x^7 + 4997*x^6 + 44864*x^5 -63639*x^4 -104583*x^3 + 117809*x^2 + 134681*x + 19759); T[179,47]=(x -1)*(x^3 -13*x^2 + 40*x -29)*(x^11 -x^10 -274*x^9 -7*x^8 + 23393*x^7 + 10005*x^6 -753528*x^5 -387301*x^4 + 9203424*x^3 + 704544*x^2 -38439424*x + 22950656); T[179,53]=(x^3 + 10*x^2 -11*x -223)*(x^11 + 10*x^10 -181*x^9 -2219*x^8 + 6744*x^7 + 153552*x^6 + 273208*x^5 -3101648*x^4 -14468288*x^3 -13472640*x^2 + 23959040*x + 32504832)*(x ); T[179,59]=(x + 5)*(x^3 + 3*x^2 -81*x -139)*(x^11 + 8*x^10 -135*x^9 -754*x^8 + 6261*x^7 + 19185*x^6 -107703*x^5 -141278*x^4 + 497447*x^3 + 310636*x^2 -231223*x + 29467); T[179,61]=(x -14)*(x^3 + 32*x^2 + 332*x + 1112)*(x^11 -64*x^10 + 1674*x^9 -22088*x^8 + 133151*x^7 + 80712*x^6 -6089158*x^5 + 32270440*x^4 -41755759*x^3 -117705640*x^2 + 212838996*x + 187333336); T[179,67]=(x + 9)*(x^3 -12*x^2 -85*x + 769)*(x^11 -15*x^10 -246*x^9 + 3357*x^8 + 23650*x^7 -256447*x^6 -984832*x^5 + 8103725*x^4 + 15758763*x^3 -96823617*x^2 -78695095*x + 350960499); T[179,71]=(x^3 + x^2 -114*x -421)*(x^11 + 25*x^10 -94*x^9 -5665*x^8 -13010*x^7 + 390428*x^6 + 1706216*x^5 -7504480*x^4 -46138336*x^3 -13691840*x^2 + 169387264*x + 135247104)*(x ); T[179,73]=(x -10)*(x^3 + 3*x^2 -214*x -1399)*(x^11 + 13*x^10 -266*x^9 -3535*x^8 + 20850*x^7 + 273708*x^6 -747464*x^5 -7766672*x^4 + 12136256*x^3 + 73580672*x^2 -67933696*x -128201728); T[179,79]=(x -10)*(x^3 + 12*x^2 -99*x -1021)*(x^11 + 12*x^10 -225*x^9 -3003*x^8 + 11498*x^7 + 220236*x^6 + 85608*x^5 -5339120*x^4 -12196672*x^3 + 16404864*x^2 + 51256832*x + 10611712); T[179,83]=(x -17)*(x^3 + x^2 -72*x + 41)*(x^11 + 8*x^10 -342*x^9 -3801*x^8 + 29830*x^7 + 523964*x^6 + 476515*x^5 -20842409*x^4 -85838780*x^3 + 141690578*x^2 + 1378827160*x + 2069302267); T[179,89]=(x + 1)*(x^3 -12*x^2 -43*x + 587)*(x^11 + 5*x^10 -306*x^9 -1093*x^8 + 27380*x^7 + 49539*x^6 -821396*x^5 -687149*x^4 + 8098447*x^3 + 1132839*x^2 -24780817*x + 11430107); T[179,97]=(x + 14)*(x^3 + 8*x^2 -205*x -1681)*(x^11 -20*x^10 -459*x^9 + 12383*x^8 + 4032*x^7 -1948468*x^6 + 14474496*x^5 + 13633968*x^4 -532162432*x^3 + 1981373440*x^2 -1699558400*x -1934823424); T[180,2]=(x^2 -x + 2)*(x -1)^2*(x^2 + x + 2)^2*(x + 1)^3*(x )^14; T[180,3]=(x^2 + 2*x + 3)*(x -1)^2*(x + 1)^3*(x )^18; T[180,5]=(x^2 + 5)*(x -1)^11*(x + 1)^12; T[180,7]=(x -2)^8*(x + 4)^8*(x )^9; T[180,11]=(x + 6)^2*(x -6)^2*(x -4)^3*(x + 4)^6*(x )^12; T[180,13]=(x + 4)^4*(x + 2)^9*(x -2)^12; T[180,17]=(x )^2*(x + 2)^3*(x -2)^6*(x + 6)^7*(x -6)^7; T[180,19]=(x -8)^2*(x -4)^9*(x + 4)^14; T[180,23]=(x + 6)*(x -6)^3*(x )^21; T[180,29]=(x )^2*(x -2)^3*(x + 2)^6*(x + 6)^7*(x -6)^7; T[180,31]=(x -8)^6*(x )^9*(x + 4)^10; T[180,37]=(x -8)^4*(x -2)^10*(x + 10)^11; T[180,41]=(x + 10)^3*(x -6)^5*(x + 6)^5*(x -10)^6*(x )^6; T[180,43]=(x + 10)^4*(x -8)^6*(x + 4)^6*(x -4)^9; T[180,47]=(x -6)*(x + 8)^3*(x + 6)^3*(x -8)^6*(x )^12; T[180,53]=(x )^2*(x -10)^3*(x -6)^5*(x + 10)^6*(x + 6)^9; T[180,59]=(x + 12)*(x + 6)^2*(x -6)^2*(x -12)^3*(x -4)^3*(x + 4)^6*(x )^8; T[180,61]=(x -14)^2*(x + 10)^6*(x -2)^8*(x + 2)^9; T[180,67]=(x + 16)^2*(x -2)^4*(x -12)^9*(x + 4)^10; T[180,71]=(x -8)^3*(x -12)^3*(x + 12)^5*(x + 8)^6*(x )^8; T[180,73]=(x + 10)^6*(x -10)^9*(x -2)^10; T[180,79]=(x + 4)^6*(x )^9*(x -8)^10; T[180,83]=(x + 6)*(x )^2*(x -6)^3*(x + 12)^7*(x -12)^12; T[180,89]=(x + 18)^2*(x -12)^2*(x + 12)^2*(x )^2*(x -6)^4*(x -18)^4*(x + 6)^9; T[180,97]=(x -14)^2*(x -2)^23; T[181,2]=(x^5 + 3*x^4 -x^3 -7*x^2 -2*x + 1)*(x^9 -3*x^8 -9*x^7 + 29*x^6 + 23*x^5 -84*x^4 -23*x^3 + 89*x^2 + 8*x -27); T[181,3]=(x^5 + 5*x^4 + 5*x^3 -6*x^2 -9*x -1)*(x^9 -3*x^8 -15*x^7 + 46*x^6 + 63*x^5 -213*x^4 -32*x^3 + 272*x^2 -144*x + 16); T[181,5]=(x^5 + 5*x^4 -5*x^3 -55*x^2 -88*x -43)*(x^9 -x^8 -24*x^7 + 28*x^6 + 170*x^5 -181*x^4 -441*x^3 + 340*x^2 + 326*x -3); T[181,7]=(x^5 + 2*x^4 -19*x^3 -42*x^2 + 66*x + 149)*(x^9 -2*x^8 -26*x^7 + 42*x^6 + 152*x^5 -195*x^4 -331*x^3 + 259*x^2 + 268*x -31); T[181,11]=(x^5 + 20*x^4 + 153*x^3 + 554*x^2 + 936*x + 575)*(x^9 -24*x^8 + 221*x^7 -898*x^6 + 832*x^5 + 5259*x^4 -15404*x^3 + 5356*x^2 + 22256*x -19056); T[181,13]=(x^5 + 2*x^4 -40*x^3 -53*x^2 + 222*x + 293)*(x^9 + 8*x^8 -17*x^7 -333*x^6 -1035*x^5 -252*x^4 + 4742*x^3 + 10438*x^2 + 9148*x + 2993); T[181,17]=(x^5 + 5*x^4 -x^3 -27*x^2 -24*x -1)*(x^9 + x^8 -117*x^7 -317*x^6 + 4386*x^5 + 20151*x^4 -33452*x^3 -355684*x^2 -741488*x -503952); T[181,19]=(x^5 + 6*x^4 -25*x^3 -85*x^2 + 201*x -97)*(x^9 -4*x^8 -70*x^7 + 295*x^6 + 1293*x^5 -6874*x^4 -1978*x^3 + 44230*x^2 -54325*x + 5575); T[181,23]=(x^5 + 6*x^4 -25*x^3 -34*x^2 + 98*x -47)*(x^9 -14*x^8 -18*x^7 + 670*x^6 + 422*x^5 -10811*x^4 -16489*x^3 + 33179*x^2 + 71626*x + 32553); T[181,29]=(x^5 + 17*x^4 + 91*x^3 + 118*x^2 -329*x -725)*(x^9 -13*x^8 -32*x^7 + 873*x^6 -2177*x^5 -5530*x^4 + 18646*x^3 + 5*x^2 -19415*x -1245); T[181,31]=(x^5 -5*x^4 -59*x^3 + 327*x^2 -278*x -353)*(x^9 + 7*x^8 -150*x^7 -1346*x^6 + 4532*x^5 + 66591*x^4 + 58679*x^3 -929800*x^2 -2565510*x -1174577); T[181,37]=(x^5 -2*x^4 -118*x^3 + 403*x^2 + 804*x -2623)*(x^9 + 20*x^8 + 61*x^7 -717*x^6 -3095*x^5 + 5728*x^4 + 36382*x^3 + 8430*x^2 -117474*x -118307); T[181,41]=(x^5 -2*x^4 -133*x^3 -82*x^2 + 4602*x + 12643)*(x^9 -10*x^8 -47*x^7 + 704*x^6 -502*x^5 -11437*x^4 + 22476*x^3 + 41828*x^2 -85456*x -43344); T[181,43]=(x^5 + 5*x^4 -84*x^3 -21*x^2 + 691*x -107)*(x^9 + 5*x^8 -216*x^7 -601*x^6 + 14803*x^5 + 18441*x^4 -283456*x^3 -452164*x^2 + 674176*x + 516752); T[181,47]=(x^5 -4*x^4 -37*x^3 + 78*x^2 + 180*x + 53)*(x^9 + 2*x^8 -206*x^7 -200*x^6 + 12938*x^5 + 4467*x^4 -278549*x^3 + 168945*x^2 + 1851254*x -2500083); T[181,53]=(x^5 -3*x^4 -181*x^3 + 331*x^2 + 7514*x -12427)*(x^9 + x^8 -195*x^7 + 345*x^6 + 10938*x^5 -40891*x^4 -127536*x^3 + 645576*x^2 + 177760*x -2156208); T[181,59]=(x^5 + 24*x^4 + 88*x^3 -893*x^2 -2484*x -1579)*(x^9 -24*x^8 + 44*x^7 + 2627*x^6 -16196*x^5 -47695*x^4 + 459572*x^3 -33460*x^2 -3083440*x + 3673680); T[181,61]=(x^5 + 20*x^4 + 8*x^3 -1529*x^2 -4974*x + 9175)*(x^9 + 16*x^8 -116*x^7 -3097*x^6 -12692*x^5 + 30855*x^4 + 231000*x^3 + 18392*x^2 -877664*x + 103472); T[181,67]=(x^5 -13*x^4 -176*x^3 + 2303*x^2 -2455*x -21403)*(x^9 -9*x^8 -264*x^7 + 2123*x^6 + 11089*x^5 -31991*x^4 -73320*x^3 + 168872*x^2 -24256*x -11584); T[181,71]=(x^5 + 29*x^4 + 162*x^3 -1126*x^2 -4867*x + 18505)*(x^9 -21*x^8 + 41*x^7 + 1501*x^6 -6598*x^5 -33850*x^4 + 166413*x^3 + 307809*x^2 -1193137*x -1005903); T[181,73]=(x^5 -17*x^4 -87*x^3 + 2113*x^2 -1254*x -38375)*(x^9 + 5*x^8 -214*x^7 -1682*x^6 + 6086*x^5 + 83337*x^4 + 159751*x^3 -268152*x^2 -536452*x + 488789); T[181,79]=(x^5 + 6*x^4 -126*x^3 -837*x^2 + 2106*x + 14337)*(x^9 -10*x^8 -94*x^7 + 1095*x^6 + 1410*x^5 -30847*x^4 + 29912*x^3 + 145200*x^2 -93120*x -148160); T[181,83]=(x^5 + 21*x^4 -223*x^3 -6416*x^2 -17531*x + 140345)*(x^9 -23*x^8 -206*x^7 + 6089*x^6 + 12849*x^5 -476334*x^4 -414336*x^3 + 10316185*x^2 -158255*x -52184619); T[181,89]=(x^5 -5*x^4 -85*x^3 + 89*x^2 + 954*x + 955)*(x^9 + x^8 -415*x^7 -1569*x^6 + 51956*x^5 + 306343*x^4 -1499628*x^3 -10393820*x^2 + 4062800*x + 36027600); T[181,97]=(x^5 -11*x^4 -135*x^3 + 1182*x^2 + 5075*x -20879)*(x^9 + 3*x^8 -403*x^7 + 260*x^6 + 38755*x^5 -93395*x^4 -966552*x^3 + 2673624*x^2 + 2473072*x + 478352); T[182,2]=(x^2 + 2)*(x^6 -x^5 + 2*x^4 -2*x^3 + 4*x^2 -4*x + 8)*(x^2 + 2*x + 2)*(x^4 + 2*x^2 + 4)*(x -1)^5*(x + 1)^6; T[182,3]=(x -3)^2*(x + 3)^2*(x^2 -2)^2*(x^3 + 2*x^2 -6*x -8)^2*(x )^3*(x + 2)^4*(x -1)^4; T[182,5]=(x -4)*(x + 4)*(x -2)*(x + 1)^2*(x^2 -6*x + 7)^2*(x^3 -2*x^2 -3*x + 2)^2*(x )^4*(x + 3)^6; T[182,7]=(x^2 -x + 7)*(x^2 + x + 7)*(x -1)^10*(x + 1)^11; T[182,11]=(x + 3)*(x -1)*(x + 1)*(x + 5)*(x -4)*(x + 2)^2*(x -6)^2*(x + 6)^2*(x^2 -18)^2*(x^3 -2*x^2 -6*x + 8)^2*(x )^4; T[182,13]=(x^2 + 4*x + 13)*(x + 1)^11*(x -1)^12; T[182,17]=(x + 4)*(x -6)^2*(x^2 -2)^2*(x^3 -4*x^2 -10*x -4)^2*(x )^2*(x + 6)^3*(x -4)^3*(x + 3)^4; T[182,19]=(x + 6)*(x )*(x -5)^2*(x + 7)^2*(x -6)^2*(x^2 + 6*x -9)^2*(x^3 + 4*x^2 + x -4)^2*(x -2)^7; T[182,23]=(x -8)*(x -5)*(x + 3)*(x + 4)^2*(x + 7)^2*(x^2 + 6*x + 1)^2*(x^3 -10*x^2 + x + 136)^2*(x -3)^4*(x )^4; T[182,29]=(x + 10)*(x + 8)*(x -4)*(x + 4)*(x )*(x -6)^2*(x + 9)^2*(x -2)^2*(x + 6)^2*(x + 5)^2*(x^2 -6*x + 1)^2*(x^3 -24*x^2 + 185*x -454)^2; T[182,31]=(x -3)*(x + 8)*(x -7)*(x -1)*(x + 3)^2*(x -4)^2*(x^2 + 2*x -17)^2*(x^3 + 4*x^2 -19*x + 16)^2*(x -5)^3*(x + 4)^4; T[182,37]=(x -6)*(x -9)*(x -3)^2*(x -7)^2*(x + 4)^2*(x^2 + 4*x -14)^2*(x^3 -58*x -124)^2*(x + 7)^3*(x -2)^4; T[182,41]=(x -3)*(x + 7)*(x + 3)*(x + 9)*(x -6)^2*(x^2 -12*x + 28)^2*(x^3 -2*x^2 -28*x -8)^2*(x )^4*(x + 6)^5; T[182,43]=(x + 8)*(x + 12)*(x -4)^2*(x^3 -10*x^2 -71*x + 628)^2*(x -8)^3*(x + 1)^6*(x + 5)^6; T[182,47]=(x + 8)*(x + 3)*(x + 7)*(x + 12)^2*(x -13)^2*(x^2 -6*x + 7)^2*(x^3 + 8*x^2 -79*x -544)^2*(x -7)^3*(x -3)^5; T[182,53]=(x + 12)*(x + 4)*(x -12)^2*(x^2 + 6*x + 1)^2*(x^3 -8*x^2 -35*x -22)^2*(x -6)^3*(x + 9)^4*(x )^4; T[182,59]=(x -6)*(x^2 -12*x + 4)^2*(x^3 + 4*x^2 -156*x -688)^2*(x )^2*(x -8)^3*(x + 10)^3*(x + 6)^6; T[182,61]=(x -10)*(x + 13)*(x -1)*(x + 1)*(x -13)*(x + 8)^2*(x + 10)^4*(x -8)^4*(x -6)^4*(x + 2)^6; T[182,67]=(x -5)*(x -7)*(x -11)*(x -1)*(x -4)*(x + 2)^2*(x + 4)^2*(x + 6)^2*(x^2 + 12*x -36)^2*(x^3 + 12*x^2 -124*x -976)^2*(x -14)^4; T[182,71]=(x -4)*(x -12)*(x -16)*(x + 5)^2*(x + 6)^2*(x + 3)^2*(x^2 + 12*x -14)^2*(x^3 + 6*x^2 -22*x + 16)^2*(x + 8)^3*(x )^3; T[182,73]=(x -9)*(x -5)*(x -7)*(x + 13)^2*(x + 10)^2*(x^2 + 10*x + 7)^2*(x^3 + 10*x^2 -99*x -274)^2*(x -11)^3*(x -2)^5; T[182,79]=(x -11)*(x + 17)*(x + 13)*(x -3)^2*(x + 4)^2*(x^2 -14*x -23)^2*(x^3 + 14*x^2 + 5*x -16)^2*(x + 1)^3*(x -8)^5; T[182,83]=(x + 16)*(x -4)*(x + 6)^2*(x -3)^2*(x -15)^2*(x^2 -18*x + 63)^2*(x^3 + 12*x^2 -271*x -3268)^2*(x -12)^3*(x )^4; T[182,89]=(x + 18)*(x -14)*(x -18)*(x -6)^2*(x -15)^2*(x -3)^2*(x^2 -6*x + 7)^2*(x^3 -2*x^2 -95*x + 422)^2*(x + 6)^6; T[182,97]=(x -2)*(x -11)*(x -17)*(x -5)*(x -14)^2*(x -7)^2*(x^2 + 2*x -161)^2*(x^3 + 10*x^2 + 29*x + 22)^2*(x + 1)^3*(x + 10)^4; T[183,2]=(x^2 + 2*x -1)*(x^6 -11*x^4 + 2*x^3 + 31*x^2 -10*x -17)*(x + 1)^2*(x^3 -x^2 -3*x + 1)^3; T[183,3]=(x^2 + 2*x + 3)*(x^6 -2*x^5 + 5*x^4 -8*x^3 + 15*x^2 -18*x + 27)*(x + 1)^5*(x -1)^6; T[183,5]=(x^6 -2*x^5 -23*x^4 + 28*x^3 + 144*x^2 -80*x -144)*(x + 1)^2*(x + 3)^2*(x^3 + x^2 -9*x -13)^2*(x -2)^3; T[183,7]=(x^2 + 2*x -1)*(x^3 -16*x -16)*(x^6 -2*x^5 -25*x^4 + 60*x^3 + 128*x^2 -432*x + 288)*(x -1)^2*(x^3 + 3*x^2 -x -1)^2; T[183,11]=(x^2 + 2*x -1)*(x^3 -2*x^2 -4*x + 4)*(x^6 + 8*x^5 -5*x^4 -110*x^3 -68*x^2 + 8*x + 4)*(x + 5)^2*(x^3 -13*x^2 + 53*x -67)^2; T[183,13]=(x^3 -6*x^2 -4*x + 40)*(x^6 -6*x^5 -23*x^4 + 116*x^3 + 168*x^2 -464*x -608)*(x + 3)^2*(x -1)^2*(x^3 + 9*x^2 + 11*x -37)^2; T[183,17]=(x^3 -12*x^2 + 20*x + 100)*(x^6 -10*x^5 -12*x^4 + 368*x^3 -684*x^2 -2352*x + 5968)*(x + 6)^2*(x -4)^2*(x^3 + 2*x^2 -8*x + 4)^2; T[183,19]=(x^2 -4*x -28)*(x^3 + 8*x^2 + 8*x -16)*(x^6 -8*x^5 -60*x^4 + 656*x^3 -592*x^2 -7232*x + 15808)*(x + 4)^2*(x^3 -48*x -20)^2; T[183,23]=(x^2 + 2*x -17)*(x^3 -2*x^2 -44*x + 20)*(x^6 -45*x^4 + 2*x^3 + 420*x^2 + 208*x -204)*(x + 9)^2*(x^3 -5*x^2 + 5*x + 1)^2; T[183,29]=(x^2 -32)*(x^6 + 10*x^5 -56*x^4 -832*x^3 -1740*x^2 + 4032*x + 10368)*(x + 6)^2*(x^3 -4*x^2 -4*x + 20)^3; T[183,31]=(x^2 -4*x -28)*(x^3 + 8*x^2 -32*x -272)*(x^6 -108*x^4 + 256*x^3 + 2016*x^2 -8128*x + 7296)*(x^3 + 2*x^2 -76*x + 116)^2*(x )^2; T[183,37]=(x^2 + 4*x -4)*(x^3 + 6*x^2 -52*x + 8)*(x^6 + 4*x^5 -124*x^4 -416*x^3 + 2096*x^2 + 5184*x -7488)*(x -8)^2*(x^3 + 6*x^2 -36*x -108)^2; T[183,41]=(x^2 + 6*x + 1)*(x^3 -2*x^2 -36*x + 104)*(x^6 + 10*x^5 -55*x^4 -700*x^3 -144*x^2 + 7568*x + 2864)*(x -5)^2*(x^3 -3*x^2 -61*x + 191)^2; T[183,43]=(x^2 -12*x + 4)*(x^3 -120*x + 16)*(x^6 -4*x^5 -52*x^4 + 176*x^3 + 512*x^2 -1728*x + 1152)*(x + 8)^2*(x^3 + 14*x^2 + 56*x + 68)^2; T[183,47]=(x^2 + 8*x -56)*(x^3 -4*x^2 -48*x + 64)*(x^6 + 4*x^5 -104*x^4 -32*x^3 + 2048*x^2 -9216)*(x -4)^2*(x^3 + 4*x^2 -88*x + 16)^2; T[183,53]=(x^2 + 4*x -68)*(x^3 -12*x^2 -36*x + 540)*(x^6 + 2*x^5 -172*x^4 -208*x^3 + 4612*x^2 + 5680*x -22416)*(x -6)^2*(x^3 + 2*x^2 -12*x -8)^2; T[183,59]=(x^2 + 10*x + 7)*(x^3 -6*x^2 -172*x + 1268)*(x^6 + 16*x^5 + 35*x^4 -614*x^3 -3892*x^2 -7376*x -4332)*(x -9)^2*(x^3 -29*x^2 + 231*x -325)^2; T[183,61]=(x -1)^9*(x + 1)^10; T[183,67]=(x^2 -6*x -41)*(x^3 -136*x -496)*(x^6 + 2*x^5 -241*x^4 -64*x^3 + 14152*x^2 -9008*x -51104)*(x + 7)^2*(x^3 -9*x^2 -85*x + 559)^2; T[183,71]=(x^3 -14*x^2 + 20*x + 100)*(x^6 + 18*x^5 + 12*x^4 -984*x^3 -2292*x^2 + 11632*x + 27952)*(x -6)^2*(x + 8)^2*(x^3 -14*x^2 -12*x + 92)^2; T[183,73]=(x^2 + 10*x -47)*(x^3 + 2*x^2 -148*x + 536)*(x^6 -30*x^5 + 281*x^4 -664*x^3 -1784*x^2 + 4480*x + 2192)*(x + 11)^2*(x^3 + x^2 -45*x -25)^2; T[183,79]=(x^2 + 2*x -1)*(x^3 + 12*x^2 -88*x + 16)*(x^6 -6*x^5 -73*x^4 + 720*x^3 -1848*x^2 + 656*x + 1632)*(x -3)^2*(x^3 -13*x^2 -51*x + 625)^2; T[183,83]=(x^2 + 8*x + 8)*(x^6 + 12*x^5 -264*x^4 -2592*x^3 + 18944*x^2 + 110080*x -228352)*(x -4)^2*(x^3 + 8*x^2 -64*x -256)^3; T[183,89]=(x^2 + 16*x + 32)*(x^3 + 4*x^2 -108*x -52)*(x^6 -26*x^5 + 16*x^4 + 3584*x^3 -20188*x^2 -4672*x + 22144)*(x + 4)^2*(x^3 + 4*x^2 -56*x + 80)^2; T[183,97]=(x^2 + 12*x + 4)*(x^3 -18*x^2 + 92*x -104)*(x^6 -16*x^5 -180*x^4 + 2208*x^3 + 4864*x^2 -22976*x + 16768)*(x + 14)^2*(x^3 -10*x^2 -116*x + 1096)^2; T[184,2]=(x + 1)*(x^4 + x^3 + 3*x^2 + 2*x + 4)*(x )^16; T[184,3]=(x -3)*(x^2 + x -4)*(x + 3)^2*(x -1)^2*(x + 1)^2*(x^2 -5)^4*(x )^4; T[184,5]=(x + 4)*(x -2)^2*(x + 2)^3*(x -4)^3*(x^2 + 2*x -4)^4*(x )^4; T[184,7]=(x -4)*(x + 2)*(x )^2*(x -2)^3*(x^2 -2*x -4)^4*(x + 4)^6; T[184,11]=(x + 4)*(x + 2)*(x -6)*(x^2 -2*x -16)*(x )^3*(x^2 + 6*x + 4)^4*(x -2)^5; T[184,13]=(x -7)*(x^2 -5*x + 2)*(x + 1)^2*(x + 2)^4*(x + 5)^4*(x -3)^8; T[184,17]=(x + 4)*(x -6)*(x^2 -2*x -16)*(x -4)^2*(x + 6)^3*(x + 2)^4*(x^2 -6*x + 4)^4; T[184,19]=(x^2 -2*x -16)*(x -6)^2*(x -2)^2*(x + 6)^2*(x + 2)^13; T[184,23]=(x + 1)^5*(x -1)^16; T[184,29]=(x -9)*(x + 6)*(x -5)*(x -1)*(x^2 -3*x -2)*(x + 7)^2*(x -2)^3*(x + 3)^10; T[184,31]=(x + 9)*(x^2 + 9*x + 16)*(x + 3)^2*(x -3)^2*(x -5)^2*(x^2 -45)^4*(x )^4; T[184,37]=(x^2 -68)*(x + 8)^2*(x -8)^2*(x -2)^3*(x + 4)^4*(x^2 -2*x -4)^4; T[184,41]=(x^2 -x -106)*(x + 9)^3*(x -6)^4*(x -3)^4*(x^2 -2*x -19)^4; T[184,43]=(x + 2)*(x -10)^3*(x -8)^4*(x + 8)^5*(x )^8; T[184,47]=(x + 5)*(x -7)*(x + 8)*(x + 1)*(x^2 -11*x -8)*(x )^3*(x -9)^4*(x^2 -5)^4; T[184,53]=(x + 6)*(x + 2)*(x + 8)*(x -6)^3*(x + 4)^3*(x -2)^4*(x^2 + 8*x -4)^4; T[184,59]=(x + 4)*(x + 8)*(x^2 -4*x -64)*(x + 12)^2*(x -4)^2*(x )^2*(x -12)^3*(x^2 -4*x -16)^4; T[184,61]=(x + 4)*(x^2 -8*x -52)*(x -14)^2*(x + 2)^2*(x + 10)^3*(x + 8)^3*(x^2 -4*x -76)^4; T[184,67]=(x + 4)*(x^2 + 2*x -16)*(x -2)^2*(x -14)^2*(x -8)^3*(x + 10)^3*(x^2 + 10*x + 20)^4; T[184,71]=(x -7)*(x + 5)*(x + 8)*(x + 13)*(x^2 -23*x + 128)*(x + 3)^2*(x + 15)^2*(x )^3*(x^2 -20*x + 95)^4; T[184,73]=(x -9)*(x + 15)*(x^2 + 17*x + 34)*(x + 7)^2*(x + 3)^3*(x -6)^4*(x^2 -22*x + 101)^4; T[184,79]=(x -12)*(x -6)*(x^2 + 2*x -16)*(x + 10)^2*(x + 12)^3*(x + 6)^4*(x^2 + 4*x -76)^4; T[184,83]=(x -10)*(x + 14)*(x^2 -12*x -32)*(x )*(x -8)^2*(x -14)^3*(x -6)^3*(x^2 + 22*x + 116)^4; T[184,89]=(x + 4)*(x -10)*(x + 8)*(x -16)*(x^2 + 2*x -152)*(x -12)^2*(x )^2*(x + 6)^3*(x^2 + 12*x + 16)^4; T[184,97]=(x + 8)*(x -10)*(x + 18)*(x^2 + 2*x -152)*(x + 10)^2*(x )^2*(x -6)^4*(x^2 -22*x + 76)^4; T[185,2]=(x -1)*(x^5 -2*x^4 -8*x^3 + 14*x^2 + 11*x -12)*(x^5 -8*x^3 + 2*x^2 + 11*x -2)*(x + 2)^3*(x )^3; T[185,3]=(x + 2)*(x + 1)*(x^5 -3*x^4 -6*x^3 + 20*x^2 + 4*x -22)*(x^5 + x^4 -8*x^3 -4*x^2 + 4*x + 2)*(x + 3)^2*(x -1)^3; T[185,5]=(x^2 + 2*x + 5)*(x^2 + 5)*(x -1)^6*(x + 1)^7; T[185,7]=(x + 3)*(x + 5)*(x + 2)*(x^5 -7*x^4 + 6*x^3 + 24*x^2 -2)*(x^5 -11*x^4 + 32*x^3 + 32*x^2 -268*x + 302)*(x + 1)^4; T[185,11]=(x^5 + 5*x^4 -8*x^3 -48*x^2 + 16*x + 96)*(x^5 -7*x^4 -12*x^3 + 144*x^2 -176*x -32)*(x )*(x -3)^3*(x + 5)^3; T[185,13]=(x -4)*(x^5 -2*x^4 -20*x^3 + 20*x^2 + 76*x -88)*(x^5 -4*x^4 -28*x^3 + 60*x^2 + 148*x -256)*(x + 4)^2*(x + 2)^4; T[185,17]=(x -2)*(x^5 -52*x^3 + 12*x^2 + 356*x + 192)*(x^5 + 8*x^4 + 12*x^3 -36*x^2 -92*x -32)*(x + 4)^2*(x -6)^2*(x )^2; T[185,19]=(x + 8)*(x + 4)*(x^5 -14*x^4 + 26*x^3 + 362*x^2 -1782*x + 2224)*(x^5 + 4*x^4 -38*x^3 -66*x^2 + 78*x -8)*(x )^2*(x -2)^3; T[185,23]=(x + 2)*(x + 8)*(x -4)*(x^5 -2*x^4 -56*x^3 + 880*x + 1504)*(x^5 -4*x^4 -72*x^3 + 208*x^2 + 784*x + 192)*(x -6)^2*(x -2)^2; T[185,29]=(x -4)*(x^5 + 4*x^4 -32*x^3 -48*x^2 + 304*x -192)*(x^5 -2*x^4 -80*x^3 + 272*x^2 -176*x + 32)*(x -2)^2*(x -6)^2*(x + 6)^2; T[185,31]=(x -2)*(x + 6)*(x^5 -8*x^4 -38*x^3 + 314*x^2 + 346*x -3016)*(x^5 -8*x^4 -30*x^3 + 342*x^2 -702*x + 324)*(x )*(x + 4)^4; T[185,37]=(x -1)^8*(x + 1)^9; T[185,41]=(x + 5)*(x -10)*(x -7)*(x^5 + 5*x^4 -8*x^3 -48*x^2 + 16*x + 96)*(x^5 + 9*x^4 -64*x^3 -304*x^2 + 1488*x -928)*(x + 9)^4; T[185,43]=(x + 6)*(x + 4)*(x + 10)*(x^5 -14*x^4 -16*x^3 + 560*x^2 -432*x -1312)*(x^5 -10*x^4 -80*x^3 + 752*x^2 + 336*x -2528)*(x -2)^2*(x -8)^2; T[185,47]=(x + 10)*(x -11)*(x -9)*(x^5 + 5*x^4 -114*x^3 + 128*x^2 + 1740*x -3994)*(x^5 -7*x^4 -92*x^3 + 592*x^2 -520*x -978)*(x + 9)^2*(x -3)^2; T[185,53]=(x -3)*(x + 6)*(x^5 + x^4 -144*x^3 -40*x^2 + 4816*x + 528)*(x^5 + 15*x^4 + 64*x^3 + 40*x^2 -112*x -16)*(x -1)^2*(x + 3)^3; T[185,59]=(x + 6)*(x + 8)*(x^5 -12*x^4 -94*x^3 + 526*x^2 + 3842*x + 5456)*(x^5 + 30*x^4 + 302*x^3 + 1134*x^2 + 998*x -576)*(x )*(x -8)^2*(x -12)^2; T[185,61]=(x + 4)*(x + 10)*(x -2)*(x^5 + 14*x^4 -8*x^3 -432*x^2 -112*x + 3296)*(x^5 -12*x^4 -32*x^3 + 176*x^2 + 240*x -512)*(x + 8)^2*(x -8)^2; T[185,67]=(x -16)*(x + 14)*(x^5 -24*x^4 + 94*x^3 + 1314*x^2 -9486*x + 10952)*(x^5 + 2*x^4 -174*x^3 -70*x^2 + 7166*x -7568)*(x -8)^2*(x + 4)^3; T[185,71]=(x -5)*(x^5 -13*x^4 -348*x^3 + 4176*x^2 + 28352*x -291136)*(x^5 + 7*x^4 -132*x^3 -1632*x^2 -6016*x -7104)*(x )*(x -9)^2*(x + 15)^3; T[185,73]=(x -2)*(x + 15)*(x^5 + 5*x^4 -68*x^3 -336*x^2 + 16*x + 176)*(x^5 -5*x^4 -192*x^3 -200*x^2 + 2592*x + 368)*(x + 1)^2*(x -11)^3; T[185,79]=(x + 6)*(x + 12)*(x + 14)*(x^5 -28*x^4 + 134*x^3 + 1562*x^2 -8542*x -19508)*(x^5 -36*x^4 + 430*x^3 -1938*x^2 + 1594*x + 5912)*(x + 10)^2*(x -4)^2; T[185,83]=(x -11)*(x -18)*(x + 3)*(x^5 -27*x^4 + 178*x^3 + 376*x^2 -4820*x + 4818)*(x^5 + 9*x^4 -104*x^3 -1040*x^2 -1828*x + 314)*(x -9)^2*(x + 15)^2; T[185,89]=(x + 4)*(x -2)*(x + 2)*(x^5 -6*x^4 -248*x^3 + 528*x^2 + 16400*x + 22944)*(x^5 + 16*x^4 -240*x^3 -5136*x^2 -21008*x + 1856)*(x -6)^2*(x -4)^2; T[185,97]=(x -10)*(x + 10)*(x^5 + 26*x^4 -88*x^3 -7184*x^2 -63680*x -166976)*(x^5 -464*x^3 + 496*x^2 + 44384*x -193408)*(x -4)^2*(x -8)^3; T[186,2]=(x^4 + 3*x^3 + 5*x^2 + 6*x + 4)*(x^6 + 2*x^4 + x^3 + 4*x^2 + 8)*(x^4 -x^3 + 3*x^2 -2*x + 4)^2*(x -1)^5*(x + 1)^6; T[186,3]=(x^2 + 3)*(x^4 -2*x^3 + 4*x^2 -6*x + 9)*(x^4 + 2*x^3 + 2*x^2 + 6*x + 9)^2*(x + 1)^7*(x -1)^8; T[186,5]=(x + 1)*(x -3)*(x^2 -3*x -2)*(x + 2)^2*(x^2 + 4*x -1)^2*(x^2 -12)^2*(x^3 + 2*x^2 -5*x -2)^2*(x -1)^9; T[186,7]=(x^2 -2*x -16)*(x + 2)^2*(x^3 -4*x^2 -x + 8)^2*(x )^2*(x -2)^5*(x^2 + 4*x -1)^6; T[186,11]=(x -3)*(x -5)*(x + 3)*(x^2 + x -4)*(x^2 + 6*x + 4)^2*(x^2 + 6*x + 6)^2*(x^3 + 2*x^2 -20*x + 16)^2*(x )^2*(x -2)^8; T[186,13]=(x + 7)*(x + 1)*(x -3)*(x^2 -3*x -2)*(x -2)^2*(x^2 + 2*x -26)^2*(x^3 -4*x^2 -16*x + 56)^2*(x^2 + 2*x -4)^6; T[186,17]=(x -3)*(x -1)*(x + 1)*(x^2 + x -38)*(x + 6)^2*(x^2 + 4*x -16)^2*(x^2 -12)^2*(x^3 + 2*x^2 -24*x -32)^2*(x^2 -6*x + 4)^4; T[186,19]=(x + 5)*(x^2 + x -4)*(x -7)^2*(x -4)^2*(x^2 + 8*x + 11)^2*(x^3 -4*x^2 -45*x + 196)^2*(x + 4)^4*(x^2 -5)^4; T[186,23]=(x + 8)^2*(x -4)^2*(x -8)^2*(x^2 -2*x -4)^2*(x^3 + 6*x^2 -4*x -32)^2*(x^2 + 2*x -44)^4*(x )^5; T[186,29]=(x + 8)*(x -4)*(x^2 + 6*x -8)*(x )*(x -2)^2*(x^2 + 6*x -18)^2*(x^2 -2*x -4)^2*(x^3 + 8*x^2 -56*x -392)^2*(x^2 -10*x + 20)^4; T[186,31]=(x -1)^14*(x + 1)^15; T[186,37]=(x + 10)*(x + 6)*(x^2 -68)*(x -10)^2*(x^2 -10*x -2)^2*(x^2 -2*x -44)^2*(x^3 -16*x + 8)^2*(x + 2)^9; T[186,41]=(x + 2)*(x -2)*(x^2 + 8*x -52)*(x^2 -12*x + 24)^2*(x^2 -45)^2*(x^3 + 10*x^2 -17*x -262)^2*(x + 6)^3*(x -7)^8; T[186,43]=(x + 10)*(x + 6)*(x -6)*(x^2 + 10*x + 8)*(x -8)^2*(x^2 + 2*x -26)^2*(x^2 + 6*x -36)^2*(x^3 -14*x^2 + 4*x + 368)^2*(x^2 + 2*x -4)^4; T[186,47]=(x + 1)*(x + 5)*(x + 7)*(x^2 -5*x -32)*(x + 8)^2*(x^2 -4*x -16)^2*(x^3 -12*x^2 -16*x + 256)^2*(x -6)^4*(x^2 + 4*x -16)^4; T[186,53]=(x -14)*(x -6)*(x + 6)^2*(x^2 -80)^2*(x^2 -6*x + 6)^2*(x^3 + 10*x^2 -16*x -32)^2*(x + 2)^3*(x^2 + 12*x + 16)^4; T[186,59]=(x -10)*(x -6)*(x + 10)*(x^2 -6*x -8)*(x + 12)^2*(x^2 + 12*x + 24)^2*(x^3 -26*x^2 + 213*x -556)^2*(x + 3)^4*(x^2 -5)^4; T[186,61]=(x -7)*(x -1)*(x -3)*(x^2 -3*x -2)*(x + 6)^2*(x^2 + 2*x -26)^2*(x^3 + 2*x^2 -128*x -512)^2*(x -8)^4*(x^2 + 6*x -116)^4; T[186,67]=(x + 7)*(x^2 -13*x + 4)*(x + 3)^2*(x -4)^6*(x + 12)^6*(x -8)^12; T[186,71]=(x + 3)*(x -7)*(x -3)*(x^2 + 7*x + 8)*(x -8)^2*(x^2 -192)^2*(x^3 + 10*x^2 -147*x -712)^2*(x -9)^4*(x^2 -4*x -121)^4; T[186,73]=(x -14)*(x + 6)*(x^2 -2*x -4)^2*(x^3 + 12*x^2 -96*x -728)^2*(x -10)^4*(x^2 -8*x -4)^4*(x + 10)^5; T[186,79]=(x + 1)*(x + 11)*(x -15)*(x^2 -5*x -32)*(x + 8)^2*(x^2 -8*x -4)^2*(x^2 -4*x -104)^2*(x^3 -8*x^2 -4*x + 64)^2*(x^2 + 10*x -20)^4; T[186,83]=(x -7)*(x -17)*(x + 1)*(x^2 -5*x -100)*(x -8)^2*(x^2 + 24*x + 124)^2*(x^2 -6*x -66)^2*(x^3 -20*x^2 + 108*x -112)^2*(x^2 + 12*x -44)^4; T[186,89]=(x -10)*(x^2 -16*x -4)*(x^2 + 4*x -76)^2*(x^2 -10*x -20)^4*(x -6)^5*(x + 6)^9; T[186,97]=(x -13)*(x -5)*(x + 3)*(x^2 + 9*x -86)*(x -2)^2*(x^2 -4*x -104)^2*(x^3 -4*x^2 -27*x + 94)^2*(x -9)^4*(x^2 + 14*x -31)^4; T[187,2]=(x^2 + 2*x -2)*(x^3 + 2*x^2 -2*x -2)*(x^4 -x^3 -6*x^2 + 2*x + 2)*(x )*(x + 1)^2*(x + 2)^2*(x -2)^3; T[187,3]=(x -1)*(x^2 + x -4)*(x^2 -3)*(x^3 + 3*x^2 -x -5)*(x^4 -x^3 -11*x^2 + 9*x + 20)*(x + 1)^2*(x )^3; T[187,5]=(x -4)*(x -3)*(x^2 + 4*x + 1)*(x^2 -x -4)*(x^3 + 7*x^2 + 13*x + 5)*(x^4 -3*x^3 -3*x^2 + 9*x -2)*(x -1)^2*(x + 2)^2; T[187,7]=(x -2)*(x + 5)*(x^2 -3*x -2)*(x^3 -16*x + 16)*(x -4)^2*(x + 2)^4*(x )^4; T[187,11]=(x^2 + 11)*(x -1)^7*(x + 1)^8; T[187,13]=(x -2)*(x^2 + 10*x + 22)*(x^3 -30*x -2)*(x^4 + 2*x^3 -28*x^2 -90*x -36)*(x + 2)^2*(x )^2*(x -4)^3; T[187,17]=(x^2 + 2*x + 17)*(x + 1)^6*(x -1)^9; T[187,19]=(x^2 + 2*x -26)*(x^2 + 6*x -8)*(x^3 -6*x^2 -22*x + 122)*(x^4 + 2*x^3 -28*x^2 + 34*x -8)*(x + 4)^2*(x -2)^2*(x )^2; T[187,23]=(x + 3)*(x + 2)*(x^2 -x -38)*(x^2 + 4*x + 1)*(x^3 + 15*x^2 + 71*x + 103)*(x^4 -5*x^3 -19*x^2 + 57*x + 144)*(x -4)^2*(x + 1)^2; T[187,29]=(x + 3)*(x + 6)*(x^2 -15*x + 52)*(x^2 + 6*x + 6)*(x^3 + 14*x^2 + 52*x + 58)*(x^4 -12*x^3 + 38*x^2 -14*x -4)*(x -6)^2*(x )^2; T[187,31]=(x + 7)*(x^2 + x -4)*(x^2 -8*x + 13)*(x^3 + 9*x^2 -7*x -137)*(x^4 + 17*x^3 + 7*x^2 -1071*x -4392)*(x -7)^2*(x -4)^3; T[187,37]=(x + 7)*(x^2 -5*x + 2)*(x^2 + 4*x + 1)*(x^3 + 11*x^2 -53*x -629)*(x^4 -19*x^3 + 107*x^2 -153*x + 18)*(x -3)^2*(x + 2)^3; T[187,41]=(x -12)*(x + 3)*(x^2 + 5*x -32)*(x^2 -12*x + 24)*(x^3 -16*x + 16)*(x^4 -6*x^3 -32*x^2 + 96*x + 288)*(x + 6)^2*(x + 8)^2; T[187,43]=(x + 10)*(x^3 -8*x^2 -64*x + 256)*(x^4 + 4*x^3 -112*x^2 -720*x -576)*(x + 6)^2*(x -4)^2*(x -2)^2*(x + 2)^3; T[187,47]=(x -3)*(x^2 + 5*x -32)*(x^2 + 12*x -12)*(x^3 -16*x^2 + 52*x + 100)*(x^4 -4*x^3 -16*x^2 + 44*x + 64)*(x -8)^2*(x )^3; T[187,53]=(x -9)*(x^2 -11*x + 26)*(x^2 + 12*x + 24)*(x^3 + 30*x^2 + 272*x + 668)*(x^4 -28*x^3 + 272*x^2 -1060*x + 1384)*(x + 6)^2*(x -6)^3; T[187,59]=(x^3 + x^2 -97*x + 163)*(x^4 -15*x^3 -x^2 + 543*x -1028)*(x + 12)^2*(x -5)^2*(x -3)^2*(x + 3)^4; T[187,61]=(x -8)*(x^2 + 8*x -32)*(x^2 + 10*x + 8)*(x^3 + 6*x^2 -4*x -40)*(x^4 -12*x^3 -48*x^2 + 432*x -80)*(x -12)^2*(x + 10)^3; T[187,67]=(x -7)*(x^2 -17)*(x^3 + 13*x^2 -5*x -25)*(x^4 + x^3 -121*x^2 -253*x + 2116)*(x -1)^2*(x -4)^2*(x + 7)^3; T[187,71]=(x + 9)*(x -2)*(x^2 -4*x + 1)*(x^2 -7*x -26)*(x^3 + 3*x^2 -27*x -31)*(x^4 -17*x^3 -161*x^2 + 3975*x -15696)*(x + 3)^2*(x + 4)^2; T[187,73]=(x -2)*(x + 3)*(x^2 -18*x + 54)*(x^2 -11*x -8)*(x^3 + 12*x^2 + 44*x + 46)*(x^4 + 6*x^3 -174*x^2 -1266*x -596)*(x + 6)^2*(x -4)^2; T[187,79]=(x -8)*(x^2 + 6*x -144)*(x^2 + 6*x -18)*(x^3 -14*x^2 + 44*x + 34)*(x^4 + 22*x^3 + 58*x^2 -486*x -720)*(x )*(x + 10)^2*(x -12)^2; T[187,83]=(x -14)*(x -6)*(x^2 -4*x -188)*(x^2 -68)*(x^3 -8*x^2 -32*x + 128)*(x^4 -8*x^3 -288*x^2 + 1744*x + 10688)*(x + 6)^2*(x + 4)^2; T[187,89]=(x -1)*(x^2 + 10*x -23)*(x^2 -8*x -137)*(x^3 -x^2 -93*x -107)*(x^4 + 13*x^3 -243*x^2 -3329*x -7762)*(x -10)^2*(x -15)^3; T[187,97]=(x + 10)*(x -11)*(x^2 + 17*x + 34)*(x^2 -28*x + 193)*(x^3 + 17*x^2 + 75*x + 25)*(x^4 -17*x^3 -45*x^2 + 949*x + 3170)*(x -2)^2*(x + 7)^2; T[188,2]=(x -1)*(x^8 -x^7 + 3*x^6 -x^5 + 3*x^4 -2*x^3 + 12*x^2 -8*x + 16)*(x + 1)^2*(x )^11; T[188,3]=(x^2 -x -3)*(x^2 + 3*x + 1)*(x^2 -8)^2*(x )^2*(x^4 -7*x^2 + 4*x + 1)^3; T[188,5]=(x^2 + 2*x -4)*(x^2 -4*x + 2)^2*(x^4 + 2*x^3 -16*x^2 -16*x + 48)^3*(x )^4; T[188,7]=(x^2 -5*x + 3)*(x^2 + 7*x + 11)*(x^2 + 4*x -4)^2*(x )^2*(x^4 -4*x^3 -7*x^2 + 44*x -43)^3; T[188,11]=(x^2 -2*x -12)*(x^2 + 4*x -16)*(x -2)^2*(x^2 -8*x + 14)^2*(x^4 + 6*x^3 -4*x^2 -56*x -48)^3; T[188,13]=(x^2 + 4*x -16)*(x + 4)^2*(x -2)^2*(x^2 + 4*x + 2)^2*(x^4 -8*x^3 + 56*x + 48)^3; T[188,17]=(x^2 -3*x -9)*(x^2 + 5*x + 3)*(x + 2)^2*(x^4 -6*x^3 -21*x^2 + 74*x + 141)^3*(x )^4; T[188,19]=(x^2 -6*x -4)*(x^2 + 2*x -44)*(x + 2)^2*(x^2 + 8*x -2)^2*(x^4 -16*x^2 -8*x + 16)^3; T[188,23]=(x^2 + 2*x -12)*(x^2 -20)*(x -4)^2*(x^2 -8)^2*(x^4 + 6*x^3 -20*x^2 -40*x -16)^3; T[188,29]=(x^2 + 2*x -12)*(x -4)^2*(x^2 -12*x + 18)^2*(x )^2*(x^4 + 10*x^3 + 20*x^2 -8*x -16)^3; T[188,31]=(x^2 -52)*(x -4)^2*(x^2 -72)^2*(x )^2*(x^4 + 8*x^3 -56*x + 48)^3; T[188,37]=(x^2 -x -29)*(x^2 + 11*x + 19)*(x -2)^2*(x^2 -4*x -68)^2*(x^4 -10*x^3 + 15*x^2 + 34*x + 9)^3; T[188,41]=(x^2 -18*x + 76)*(x + 6)^2*(x -6)^2*(x^2 + 12*x + 28)^2*(x^4 -6*x^3 -8*x^2 + 32*x -16)^3; T[188,43]=(x^2 -2*x -12)*(x + 10)^2*(x -6)^2*(x^2 + 8*x -2)^2*(x^4 -2*x^3 -80*x^2 -112*x + 432)^3; T[188,47]=(x + 1)^4*(x -1)^18; T[188,53]=(x^2 + 7*x -69)*(x^2 + 11*x -1)*(x -2)^2*(x^2 -4*x -4)^2*(x^4 + 6*x^3 -101*x^2 -314*x + 2429)^3; T[188,59]=(x^2 -x -1)*(x^2 + 15*x + 27)*(x -12)^2*(x^2 + 8*x -16)^2*(x^4 -4*x^3 -115*x^2 + 704*x -519)^3; T[188,61]=(x^2 -5*x -5)*(x^2 -x -29)*(x -2)^2*(x^2 + 4*x -68)^2*(x^4 + 6*x^3 -73*x^2 + 10*x + 337)^3; T[188,67]=(x^2 + 14*x + 44)*(x -8)^2*(x -2)^2*(x^2 + 8*x -34)^2*(x^4 -10*x^3 -120*x^2 + 752*x + 3184)^3; T[188,71]=(x^2 -15*x + 25)*(x^2 -11*x -51)*(x -8)^2*(x^2 -12*x + 28)^2*(x^4 + 12*x^3 -19*x^2 -320*x + 657)^3; T[188,73]=(x^2 -6*x -36)*(x^2 -52)*(x + 14)^2*(x^4 -22*x^3 + 60*x^2 + 1368*x -7664)^3*(x -6)^4; T[188,79]=(x^2 + 9*x + 9)*(x^2 -19*x + 61)*(x + 16)^2*(x^4 -20*x^3 + 77*x^2 + 240*x -47)^3*(x )^4; T[188,83]=(x^2 + 4*x -48)*(x^2 -80)*(x + 16)^2*(x^2 -8)^2*(x^4 -20*x^3 + 80*x^2 + 192*x -256)^3; T[188,89]=(x^2 + 3*x -9)*(x^2 -5*x -153)*(x + 10)^2*(x^4 + 6*x^3 -161*x^2 -206*x + 4841)^3*(x )^4; T[188,97]=(x^2 -3*x -1)*(x^2 + 21*x + 99)*(x + 14)^2*(x^4 -30*x^3 + 179*x^2 + 1634*x -14307)^3*(x -6)^4; T[189,2]=(x + 2)*(x -2)*(x^2 -7)*(x -1)^2*(x + 1)^3*(x^2 -3)^3*(x )^4; T[189,3]=(x -1)*(x )^18; T[189,5]=(x -3)*(x -1)*(x + 1)*(x + 3)*(x^2 -7)*(x^2 -3)*(x -2)^2*(x^2 -12)^2*(x )^2*(x + 2)^3; T[189,7]=(x^2 + x + 7)*(x -1)^8*(x + 1)^9; T[189,11]=(x + 6)*(x -6)*(x^2 -7)*(x^2 -3)*(x^2 -12)^2*(x )^2*(x + 4)^3*(x -4)^4; T[189,13]=(x -5)^2*(x + 4)^2*(x -2)^6*(x + 2)^9; T[189,17]=(x^2 -48)*(x -6)^2*(x + 3)^2*(x -3)^2*(x^2 -12)^2*(x + 6)^3*(x )^4; T[189,19]=(x + 8)^2*(x -7)^2*(x -5)^2*(x + 7)^2*(x -2)^2*(x + 4)^4*(x -4)^5; T[189,23]=(x^2 -3)*(x^2 -63)*(x -6)^2*(x + 6)^2*(x^2 -12)^2*(x )^7; T[189,29]=(x -6)*(x + 4)*(x -4)*(x + 6)*(x^2 -108)*(x^2 -28)*(x -2)^2*(x + 2)^3*(x )^6; T[189,31]=(x -6)^2*(x -3)^2*(x -5)^2*(x )^5*(x + 4)^8; T[189,37]=(x -11)^2*(x + 7)^4*(x -2)^4*(x + 3)^4*(x -6)^5; T[189,41]=(x -1)*(x + 3)*(x -3)*(x + 1)*(x^2 -7)*(x^2 -27)*(x + 2)^2*(x^2 -108)^2*(x )^2*(x -2)^3; T[189,43]=(x -11)^2*(x + 1)^2*(x -8)^4*(x + 4)^11; T[189,47]=(x + 9)^2*(x -9)^2*(x^2 -48)^3*(x )^9; T[189,53]=(x^2 -192)*(x^2 -48)^2*(x + 6)^4*(x )^4*(x -6)^5; T[189,59]=(x + 9)*(x -9)*(x + 15)*(x -15)*(x + 12)^2*(x -12)^3*(x^2 -48)^3*(x )^4; T[189,61]=(x + 8)^2*(x -8)^2*(x -4)^2*(x + 1)^2*(x + 2)^5*(x + 10)^6; T[189,67]=(x + 2)^2*(x -5)^2*(x + 8)^2*(x -14)^2*(x -4)^5*(x + 4)^6; T[189,71]=(x -12)*(x + 12)*(x^2 -63)*(x^2 -27)*(x^2 -108)^2*(x )^9; T[189,73]=(x -6)^2*(x -2)^2*(x + 4)^2*(x + 7)^2*(x )^2*(x -14)^4*(x + 6)^5; T[189,79]=(x + 4)^2*(x -17)^2*(x + 1)^4*(x + 16)^5*(x -8)^6; T[189,83]=(x -3)*(x + 3)*(x -9)*(x + 9)*(x^2 -252)*(x^2 -108)*(x -12)^2*(x + 12)^3*(x )^6; T[189,89]=(x + 6)*(x + 2)*(x -6)*(x -2)*(x^2 -75)*(x^2 -343)*(x -14)^2*(x^2 -12)^2*(x )^2*(x + 14)^3; T[189,97]=(x + 10)^2*(x + 19)^2*(x -12)^2*(x + 4)^2*(x + 12)^2*(x -14)^4*(x -18)^5; T[190,2]=(x^6 -x^5 + 3*x^4 -3*x^3 + 6*x^2 -4*x + 8)*(x^8 + 2*x^7 + 2*x^6 + 4*x^5 + 9*x^4 + 8*x^3 + 8*x^2 + 16*x + 16)*(x^2 + 2)^2*(x -1)^4*(x + 1)^5; T[190,3]=(x + 3)*(x^2 + x -4)*(x^3 -2*x^2 -4*x + 4)^2*(x^4 -2*x^3 -8*x^2 + 16*x -4)^2*(x + 1)^3*(x -1)^3*(x + 2)^4; T[190,5]=(x^2 + 5)*(x^2 + 4*x + 5)*(x^2 -3*x + 5)^2*(x -1)^9*(x + 1)^10; T[190,7]=(x + 5)*(x^2 + x -4)*(x -3)^2*(x^3 -16*x + 16)^2*(x^4 -4*x^3 -16*x^2 + 48*x + 32)^2*(x + 1)^8; T[190,11]=(x + 4)*(x -4)^2*(x + 6)^2*(x -2)^2*(x^3 + 8*x^2 + 8*x -16)^2*(x^4 -4*x^3 -16*x^2 + 32*x + 48)^2*(x )^2*(x -3)^4; T[190,13]=(x + 3)*(x^2 + x -38)*(x -5)^2*(x^3 -8*x^2 + 12*x -4)^2*(x^4 -2*x^3 -24*x^2 + 32*x + 20)^2*(x + 4)^4*(x + 1)^4; T[190,17]=(x + 7)*(x^2 -11*x + 26)*(x^3 -2*x^2 -36*x + 104)^2*(x^4 -4*x^3 -32*x^2 + 16*x + 48)^2*(x -3)^4*(x + 3)^6; T[190,19]=(x + 1)^11*(x -1)^16; T[190,23]=(x -7)*(x + 5)*(x^2 -3*x -36)*(x + 1)^2*(x^3 + 4*x^2 -8*x -16)^2*(x^4 + 8*x^3 -24*x^2 -176*x + 288)^2*(x -3)^3*(x )^4; T[190,29]=(x^2 -x -38)*(x + 3)^2*(x -9)^2*(x^3 + 10*x^2 + 12*x -40)^2*(x^4 -4*x^3 -32*x^2 + 16*x + 48)^2*(x + 5)^3*(x -6)^4; T[190,31]=(x -2)*(x -10)*(x + 2)*(x^2 + 2*x -16)*(x + 8)^2*(x^3 -4*x^2 -48*x + 64)^2*(x^4 -4*x^3 -80*x^2 + 512*x -640)^2*(x + 4)^6; T[190,37]=(x + 10)*(x + 6)^2*(x^3 -20*x^2 + 124*x -244)^2*(x^4 + 6*x^3 -24*x^2 -40*x + 4)^2*(x + 2)^3*(x -2)^7; T[190,41]=(x -6)*(x -2)*(x^2 -8*x -52)*(x + 8)^2*(x^3 + 2*x^2 -36*x -104)^2*(x^4 -16*x^3 + 56*x^2 + 32*x -240)^2*(x )^2*(x + 6)^5; T[190,43]=(x -2)*(x^2 + 14*x + 32)*(x -6)^2*(x -4)^2*(x -8)^2*(x^3 + 4*x^2 -144*x -592)^2*(x^4 -4*x^3 -16*x^2 + 48*x + 32)^2*(x + 1)^4; T[190,47]=(x^2 + 4*x -64)*(x -8)^2*(x^3 -16*x + 16)^2*(x^4 + 12*x^3 -64*x^2 -656*x + 1056)^2*(x + 3)^4*(x )^5; T[190,53]=(x + 13)*(x -9)*(x -3)*(x^2 + 5*x + 2)*(x + 1)^2*(x + 3)^2*(x^3 -16*x^2 + 76*x -92)^2*(x^4 + 10*x^3 -184*x -348)^2*(x -12)^4; T[190,59]=(x + 9)*(x + 7)*(x -3)*(x^2 -x -4)*(x -9)^2*(x -15)^2*(x^3 + 20*x^2 + 112*x + 160)^2*(x^4 -64*x^2 -224*x -192)^2*(x + 6)^4; T[190,61]=(x + 4)*(x + 12)*(x -8)*(x^2 -14*x + 32)*(x -2)^2*(x + 10)^2*(x^3 + 2*x^2 -84*x + 232)^2*(x^4 -20*x^3 + 56*x^2 + 688*x -2656)^2*(x + 1)^4; T[190,67]=(x + 3)*(x + 7)*(x -7)*(x^2 + x -4)*(x -5)^2*(x -3)^2*(x^3 -2*x^2 -76*x -116)^2*(x^4 + 18*x^3 + 8*x^2 -488*x -1076)^2*(x + 4)^4; T[190,71]=(x -12)*(x^2 -4*x -64)*(x + 6)^2*(x -2)^2*(x^3 + 4*x^2 -80*x -64)^2*(x^4 + 20*x^3 + 32*x^2 -1024*x -4224)^2*(x )^2*(x -6)^4; T[190,73]=(x + 9)*(x + 13)*(x -11)*(x^2 -9*x -18)*(x -9)^2*(x^3 -2*x^2 -20*x + 8)^2*(x^4 -28*x^3 + 256*x^2 -784*x + 176)^2*(x + 7)^6; T[190,79]=(x -14)*(x + 2)*(x^2 + 2*x -16)*(x^3 -192*x -160)^2*(x^4 + 16*x^3 + 32*x^2 -480*x -1856)^2*(x -8)^4*(x + 10)^5; T[190,83]=(x -6)*(x + 2)*(x + 10)*(x^2 -14*x + 32)*(x^3 + 32*x^2 + 328*x + 1072)^2*(x^4 -72*x^2 -112*x + 480)^2*(x -12)^4*(x + 6)^4; T[190,89]=(x + 10)*(x -6)*(x + 12)^2*(x^3 -2*x^2 -132*x + 680)^2*(x^4 -4*x^3 -144*x^2 -176*x + 240)^2*(x )^2*(x -2)^3*(x -12)^4; T[190,97]=(x + 18)*(x -6)^2*(x^3 -20*x^2 -60*x + 1748)^2*(x^4 -30*x^3 + 224*x^2 -8*x -1388)^2*(x + 2)^3*(x + 10)^3*(x -8)^4; T[191,2]=(x^2 + x -1)*(x^14 -23*x^12 + x^11 + 205*x^10 -13*x^9 -895*x^8 + 35*x^7 + 1993*x^6 + 103*x^5 -2135*x^4 -465*x^3 + 853*x^2 + 374*x + 41); T[191,3]=(x^14 -2*x^13 -30*x^12 + 58*x^11 + 334*x^10 -630*x^9 -1667*x^8 + 3160*x^7 + 3418*x^6 -7088*x^5 -1483*x^4 + 5142*x^3 -940*x^2 -122*x + 5)*(x + 1)^2; T[191,5]=(x^2 + x -1)*(x^14 -x^13 -48*x^12 + 63*x^11 + 860*x^10 -1339*x^9 -6923*x^8 + 11842*x^7 + 23938*x^6 -41166*x^5 -31785*x^4 + 51275*x^3 + 6610*x^2 -21509*x + 5527); T[191,7]=(x^2 + x -1)*(x^14 -3*x^13 -71*x^12 + 236*x^11 + 1872*x^10 -7064*x^9 -21808*x^8 + 101248*x^7 + 85248*x^6 -691840*x^5 + 303360*x^4 + 1703424*x^3 -2363392*x^2 + 942080*x -69632); T[191,11]=(x^2 + x -1)*(x^14 + 3*x^13 -103*x^12 -332*x^11 + 3764*x^10 + 13152*x^9 -56816*x^8 -222400*x^7 + 288512*x^6 + 1458688*x^5 + 131840*x^4 -2122240*x^3 -254976*x^2 + 892928*x -167936); T[191,13]=(x^2 + 7*x + 1)*(x^14 -19*x^13 + 62*x^12 + 949*x^11 -7606*x^10 + 503*x^9 + 166303*x^8 -478782*x^7 -645034*x^6 + 5011874*x^5 -6716001*x^4 -1704311*x^3 + 7511848*x^2 -1293835*x -1553539); T[191,17]=(x^14 -14*x^13 -45*x^12 + 1378*x^11 -2555*x^10 -40042*x^9 + 140924*x^8 + 378520*x^7 -1793962*x^6 -827476*x^5 + 5982505*x^4 + 1642426*x^3 -2700939*x^2 -1365804*x -162224)*(x )^2; T[191,19]=(x^14 -20*x^13 + 55*x^12 + 1348*x^11 -10548*x^10 -1720*x^9 + 282224*x^8 -993664*x^7 -375744*x^6 + 10460416*x^5 -29189120*x^4 + 38902784*x^3 -26870784*x^2 + 8589312*x -798720)*(x + 3)^2; T[191,23]=(x^2 + x -1)*(x^14 + 13*x^13 -76*x^12 -1303*x^11 + 2420*x^10 + 51345*x^9 -58289*x^8 -979752*x^7 + 1197522*x^6 + 8844014*x^5 -12897807*x^4 -32496397*x^3 + 51753762*x^2 + 36189057*x -57083181); T[191,29]=(x^2 -5)*(x^14 -6*x^13 -243*x^12 + 992*x^11 + 23012*x^10 -46008*x^9 -1025728*x^8 + 202496*x^7 + 19922176*x^6 + 18331392*x^5 -136512512*x^4 -192888832*x^3 + 189421568*x^2 + 208599040*x -86528000); T[191,31]=(x^2 + 5*x -25)*(x^14 -15*x^13 -137*x^12 + 3126*x^11 -2124*x^10 -197728*x^9 + 823248*x^8 + 3631008*x^7 -29054336*x^6 + 25866496*x^5 + 199140096*x^4 -510331904*x^3 + 246706176*x^2 + 246890496*x -183554048); T[191,37]=(x^2 -2*x -19)*(x^14 + 8*x^13 -213*x^12 -1280*x^11 + 18256*x^10 + 67296*x^9 -768928*x^8 -1316704*x^7 + 15431040*x^6 + 8668416*x^5 -137800448*x^4 -7447040*x^3 + 444389376*x^2 -28053504*x + 233472); T[191,41]=(x^2 + 8*x + 11)*(x^14 -16*x^13 -71*x^12 + 2598*x^11 -9352*x^10 -105336*x^9 + 879616*x^8 -616000*x^7 -15135744*x^6 + 55510016*x^5 -18334976*x^4 -230815232*x^3 + 362406912*x^2 -14364672*x -156094464); T[191,43]=(x^2 -8*x -4)*(x^14 -4*x^13 -275*x^12 + 1192*x^11 + 28205*x^10 -130336*x^9 -1313860*x^8 + 6341152*x^7 + 27162310*x^6 -131581896*x^5 -227542521*x^4 + 968483108*x^3 + 808946725*x^2 -1369384960*x -770211604); T[191,47]=(x^2 -3*x -59)*(x^14 + 25*x^13 -27*x^12 -5106*x^11 -27884*x^10 + 292568*x^9 + 2772720*x^8 -1666592*x^7 -74195904*x^6 -156470784*x^5 + 362220544*x^4 + 1231374336*x^3 + 99470336*x^2 -1600794624*x -685993984); T[191,53]=(x^2 -x -31)*(x^14 + 5*x^13 -243*x^12 -1294*x^11 + 15636*x^10 + 78576*x^9 -351504*x^8 -1551392*x^7 + 2903424*x^6 + 12131712*x^5 -4736768*x^4 -34044928*x^3 -21297152*x^2 + 612352*x + 192512); T[191,59]=(x^2 -12*x -9)*(x^14 -8*x^13 -420*x^12 + 3204*x^11 + 59412*x^10 -440340*x^9 -3215153*x^8 + 25176388*x^7 + 47247070*x^6 -513600316*x^5 + 338002709*x^4 + 1841064056*x^3 -2346256998*x^2 + 190082484*x + 60884595); T[191,61]=(x^2 + 16*x + 44)*(x^14 -44*x^13 + 588*x^12 + 1072*x^11 -93152*x^10 + 649248*x^9 + 2184960*x^8 -45216768*x^7 + 142413312*x^6 + 553457152*x^5 -4630460416*x^4 + 9209772032*x^3 + 3611668480*x^2 -31275163648*x + 26250199040); T[191,67]=(x^2 -45)*(x^14 + 16*x^13 -348*x^12 -4928*x^11 + 49028*x^10 + 535272*x^9 -3314269*x^8 -27006880*x^7 + 115632542*x^6 + 666665756*x^5 -2080186303*x^4 -7404166480*x^3 + 17299550058*x^2 + 26726168780*x -39548104417); T[191,71]=(x^2 -3*x -29)*(x^14 + 25*x^13 -105*x^12 -5778*x^11 -6780*x^10 + 461824*x^9 + 1090832*x^8 -14497344*x^7 -37181504*x^6 + 145217280*x^5 + 400356864*x^4 -62124032*x^3 -563410944*x^2 -99932160*x + 163147776); T[191,73]=(x^14 -58*x^13 + 1128*x^12 -3608*x^11 -155424*x^10 + 1707840*x^9 + 4238784*x^8 -142422144*x^7 + 285433856*x^6 + 5234479616*x^5 -20981831680*x^4 -90520332288*x^3 + 490975883264*x^2 + 595734044672*x -4055098179584)*(x + 10)^2; T[191,79]=(x^2 + 4*x -41)*(x^14 -24*x^13 -292*x^12 + 9956*x^11 + 12384*x^10 -1497316*x^9 + 3079207*x^8 + 100404688*x^7 -325162178*x^6 -3111792248*x^5 + 10320818005*x^4 + 44869429268*x^3 -112977728862*x^2 -251163706404*x + 189779678115); T[191,83]=(x^2 -6*x -11)*(x^14 + 16*x^13 -213*x^12 -3772*x^11 + 15884*x^10 + 321232*x^9 -463824*x^8 -12253280*x^7 + 1367616*x^6 + 212029312*x^5 + 172670208*x^4 -1331686912*x^3 -2336120832*x^2 -206610432*x + 931835904); T[191,89]=(x^2 + 18*x + 61)*(x^14 -14*x^13 -401*x^12 + 4730*x^11 + 65488*x^10 -544640*x^9 -5636128*x^8 + 23089600*x^7 + 256347264*x^6 -83853184*x^5 -4689935872*x^4 -11331404800*x^3 -3568848896*x^2 + 10879055872*x + 5055918080); T[191,97]=(x^2 + 8*x -164)*(x^14 -22*x^13 -213*x^12 + 7746*x^11 -14275*x^10 -784202*x^9 + 4404448*x^8 + 20769252*x^7 -162064738*x^6 -209050520*x^5 + 1917045429*x^4 + 1570513630*x^3 -5189966991*x^2 -4780370452*x -898382620); T[192,2]=(x )^21; T[192,3]=(x^2 + 3)^3*(x -1)^7*(x + 1)^8; T[192,5]=(x -2)^8*(x + 2)^13; T[192,7]=(x -4)^3*(x + 4)^3*(x )^15; T[192,11]=(x )^6*(x + 4)^7*(x -4)^8; T[192,13]=(x + 6)^2*(x -2)^4*(x -6)^4*(x + 2)^11; T[192,17]=(x + 6)^6*(x -2)^15; T[192,19]=(x )^6*(x -4)^7*(x + 4)^8; T[192,23]=(x -8)^4*(x + 8)^5*(x )^12; T[192,29]=(x + 2)^2*(x -10)^2*(x + 6)^2*(x -2)^4*(x + 10)^4*(x -6)^7; T[192,31]=(x + 4)^3*(x -4)^3*(x + 8)^4*(x -8)^5*(x )^6; T[192,37]=(x + 6)^2*(x -2)^4*(x -6)^7*(x + 2)^8; T[192,41]=(x -10)^6*(x -2)^6*(x + 6)^9; T[192,43]=(x )^6*(x + 4)^7*(x -4)^8; T[192,47]=(x -8)^3*(x + 8)^3*(x )^15; T[192,53]=(x + 10)^2*(x -2)^2*(x + 14)^2*(x -14)^4*(x -10)^4*(x + 2)^7; T[192,59]=(x )^6*(x + 4)^7*(x -4)^8; T[192,61]=(x + 6)^2*(x -10)^2*(x -2)^2*(x -6)^4*(x + 10)^4*(x + 2)^7; T[192,67]=(x )^6*(x -4)^7*(x + 4)^8; T[192,71]=(x -16)^3*(x + 16)^3*(x + 8)^4*(x -8)^5*(x )^6; T[192,73]=(x -10)^9*(x + 6)^12; T[192,79]=(x + 4)^3*(x -4)^3*(x -8)^4*(x + 8)^5*(x )^6; T[192,83]=(x -12)^3*(x + 12)^3*(x -4)^4*(x + 4)^5*(x )^6; T[192,89]=(x + 6)^9*(x -10)^12; T[192,97]=(x + 14)^6*(x -18)^6*(x -2)^9; T[193,2]=(x^2 + 3*x + 1)*(x^8 -2*x^7 -9*x^6 + 18*x^5 + 21*x^4 -44*x^3 -11*x^2 + 27*x + 1)*(x^5 + 2*x^4 -5*x^3 -7*x^2 + 7*x + 1); T[193,3]=(x^5 + 5*x^4 -x^3 -27*x^2 -10*x + 23)*(x^8 -5*x^7 -2*x^6 + 40*x^5 -37*x^4 -48*x^3 + 36*x^2 + 31*x + 4)*(x + 1)^2; T[193,5]=(x^2 -5)*(x^8 -8*x^7 + 16*x^6 + 8*x^5 -35*x^4 + x^3 + 16*x^2 -x -2)*(x^5 + 8*x^4 + 15*x^3 -26*x^2 -106*x -83); T[193,7]=(x^5 + 10*x^4 + 27*x^3 + 5*x^2 -25*x -11)*(x^2 + x -11)*(x^8 -5*x^7 -10*x^6 + 62*x^5 -9*x^4 -71*x^3 + 28*x^2 + 17*x -8); T[193,11]=(x^5 + 10*x^4 + 5*x^3 -162*x^2 -162*x + 729)*(x^2 -3*x -9)*(x^8 -9*x^7 + 8*x^6 + 121*x^5 -279*x^4 -301*x^3 + 1067*x^2 -333*x -4); T[193,13]=(x^8 + 4*x^7 -18*x^6 -70*x^5 + 49*x^4 + 307*x^3 + 144*x^2 -199*x -118)*(x^5 -2*x^4 -45*x^3 + 50*x^2 + 350*x -23)*(x + 3)^2; T[193,17]=(x^5 + 9*x^4 -3*x^3 -128*x^2 -9*x + 81)*(x^2 + 6*x + 4)*(x^8 -7*x^7 -45*x^6 + 438*x^5 -247*x^4 -4799*x^3 + 9056*x^2 + 6608*x -15992); T[193,19]=(x^8 -100*x^6 -45*x^5 + 2814*x^4 + 1922*x^3 -17165*x^2 + 549*x -4)*(x^5 -14*x^4 + 55*x^3 -41*x^2 -17*x + 17)*(x + 7)^2; T[193,23]=(x^5 + 20*x^4 + 130*x^3 + 231*x^2 -484*x -1331)*(x^2 + 9*x + 9)*(x^8 -23*x^7 + 191*x^6 -551*x^5 -1211*x^4 + 12028*x^3 -28887*x^2 + 23869*x + 104); T[193,29]=(x^2 -9*x + 19)*(x^8 + 2*x^7 -160*x^6 -627*x^5 + 6387*x^4 + 37772*x^3 + 19674*x^2 -111643*x -30670)*(x^5 + 3*x^4 -90*x^3 -22*x^2 + 2073*x -4109); T[193,31]=(x^5 + 6*x^4 -8*x^3 -121*x^2 -272*x -187)*(x^2 -x -11)*(x^8 -7*x^7 -141*x^6 + 777*x^5 + 6473*x^4 -22104*x^3 -96493*x^2 + 55497*x + 205120); T[193,37]=(x^5 + 6*x^4 -51*x^3 -173*x^2 + 215*x + 121)*(x^2 -x -11)*(x^8 + 13*x^7 -58*x^6 -998*x^5 -211*x^4 + 19635*x^3 + 38156*x^2 -17119*x -52750); T[193,41]=(x^5 + 6*x^4 -60*x^3 -271*x^2 + 764*x + 371)*(x^2 -9*x + 19)*(x^8 + 3*x^7 -185*x^6 + 7*x^5 + 8913*x^4 -20420*x^3 -68415*x^2 + 263923*x -220306); T[193,43]=(x^5 -11*x^4 -83*x^3 + 1012*x^2 + 51*x -8483)*(x^2 + 3*x -9)*(x^8 + 4*x^7 -157*x^6 -354*x^5 + 6354*x^4 + 7710*x^3 -93148*x^2 -47861*x + 451036); T[193,47]=(x^2 + 9*x + 19)*(x^8 -40*x^7 + 523*x^6 -803*x^5 -39310*x^4 + 317968*x^3 -376803*x^2 -4269377*x + 12804416)*(x^5 + 41*x^4 + 639*x^3 + 4651*x^2 + 15404*x + 17941); T[193,53]=(x^2 + 6*x -116)*(x^8 -8*x^7 -184*x^6 + 1345*x^5 + 7732*x^4 -64141*x^3 + 1800*x^2 + 470416*x -300136)*(x^5 -8*x^4 -120*x^3 + 527*x^2 + 2534*x + 683); T[193,59]=(x^5 + 20*x^4 + 53*x^3 -987*x^2 -5697*x -4887)*(x^2 -20)*(x^8 -175*x^6 -191*x^5 + 8211*x^4 + 17729*x^3 -96856*x^2 -269924*x -91856); T[193,61]=(x^5 -x^4 -85*x^3 + 176*x^2 + 467*x + 179)*(x^2 -13*x + 31)*(x^8 + 6*x^7 -441*x^6 -1736*x^5 + 63438*x^4 + 107966*x^3 -3367184*x^2 -1203083*x + 54119770); T[193,67]=(x^5 -89*x^3 -134*x^2 + 2080*x + 5803)*(x^2 + 9*x -81)*(x^8 -3*x^7 -146*x^6 + 485*x^5 + 5351*x^4 -16739*x^3 -48741*x^2 + 93609*x + 161740); T[193,71]=(x^2 + 18*x + 76)*(x^8 -25*x^7 + 125*x^6 + 1535*x^5 -17282*x^4 + 30091*x^3 + 221230*x^2 -840660*x + 531808)*(x^5 -x^4 -149*x^3 + 105*x^2 + 4136*x + 2407); T[193,73]=(x^5 + 23*x^4 + 163*x^3 + 351*x^2 -52*x -23)*(x^2 + 2*x -44)*(x^8 + 9*x^7 -109*x^6 -997*x^5 + 3528*x^4 + 33141*x^3 -34160*x^2 -334432*x + 13016); T[193,79]=(x^5 + 16*x^4 + 34*x^3 -367*x^2 -1086*x + 603)*(x^2 -13*x + 31)*(x^8 + 9*x^7 -327*x^6 -1459*x^5 + 40555*x^4 -16906*x^3 -1760895*x^2 + 7796993*x -9776512); T[193,83]=(x^5 -9*x^4 -273*x^3 + 2791*x^2 -8710*x + 8869)*(x^2 + 21*x + 79)*(x^8 -44*x^7 + 629*x^6 -1641*x^5 -37394*x^4 + 317756*x^3 -526877*x^2 -2318389*x + 6755860); T[193,89]=(x^5 -17*x^4 -185*x^3 + 4660*x^2 -20645*x -193)*(x^2 + 21*x + 99)*(x^8 -24*x^7 -225*x^6 + 10204*x^5 -56262*x^4 -776810*x^3 + 11060572*x^2 -50162063*x + 79682630); T[193,97]=(x^5 + 19*x^4 -197*x^3 -5210*x^2 -15125*x + 81161)*(x^2 -2*x -44)*(x^8 + 11*x^7 -353*x^6 -3630*x^5 + 31335*x^4 + 322937*x^3 -349992*x^2 -7273392*x -12477752); T[194,2]=(x^6 + 4*x^5 + 9*x^4 + 15*x^3 + 18*x^2 + 16*x + 8)*(x^8 -3*x^7 + 7*x^6 -12*x^5 + 19*x^4 -24*x^3 + 28*x^2 -24*x + 16)*(x + 1)^4*(x -1)^5; T[194,3]=(x^4 -2*x^3 -9*x^2 + 18*x -7)*(x^4 -2*x^3 -9*x^2 + 18*x + 1)*(x )*(x^3 + 4*x^2 + 3*x -1)^2*(x^4 -5*x^2 -x + 4)^2; T[194,5]=(x -4)*(x^4 + 2*x^3 -5*x^2 -6*x + 7)*(x^4 + 2*x^3 -15*x^2 -26*x + 27)*(x^3 + 3*x^2 -4*x + 1)^2*(x^4 -x^3 -4*x^2 + x + 2)^2; T[194,7]=(x + 4)*(x^4 -2*x^3 -19*x^2 + 62*x -49)*(x^4 -6*x^3 + 7*x^2 + 10*x -13)*(x^3 + 7*x^2 + 14*x + 7)^2*(x^4 -3*x^3 -6*x^2 + 23*x -16)^2; T[194,11]=(x -4)*(x^4 -2*x^3 -9*x^2 + 2*x + 9)*(x^4 + 2*x^3 -41*x^2 -66*x + 193)*(x^3 + 7*x^2 + 14*x + 7)^2*(x^4 -5*x^3 -14*x^2 + 47*x + 92)^2; T[194,13]=(x + 4)*(x^4 -4*x^3 -20*x^2 + 80*x -16)*(x^4 -4*x^3 -20*x^2 + 48*x + 112)*(x^3 + 2*x^2 -x -1)^2*(x^4 + 6*x^3 -29*x^2 -167*x -122)^2; T[194,17]=(x -6)*(x^4 + 8*x^3 -32*x^2 -320*x -528)*(x^2 + 4*x -4)^2*(x^3 + 3*x^2 -4*x -13)^2*(x^4 -3*x^3 -20*x^2 + 15*x + 74)^2; T[194,19]=(x + 6)*(x^4 -8*x^3 -40*x^2 + 448*x -832)*(x^2 -8)^2*(x^3 -5*x^2 -57*x + 293)^2*(x^4 + 3*x^3 -5*x^2 -11*x + 4)^2; T[194,23]=(x + 4)*(x^4 -10*x^3 -27*x^2 + 526*x -1317)*(x^4 + 10*x^3 + 15*x^2 -34*x -41)*(x^3 + 12*x^2 + 27*x -13)^2*(x^4 -22*x^3 + 151*x^2 -265*x -368)^2; T[194,29]=(x^4 -6*x^3 -95*x^2 + 318*x + 1799)*(x^4 + 6*x^3 -37*x^2 -110*x -69)*(x )*(x^3 -x^2 -65*x + 169)^2*(x^4 -7*x^3 -27*x^2 + 199*x -254)^2; T[194,31]=(x^4 -8*x^3 -72*x^2 + 576*x -448)*(x^4 -8*x^3 -88*x^2 + 576*x + 1216)*(x )*(x^3 + 8*x^2 + 5*x -43)^2*(x^4 + 4*x^3 -67*x^2 -79*x + 592)^2; T[194,37]=(x + 8)*(x^4 + 2*x^3 -97*x^2 -78*x + 1979)*(x^4 -14*x^3 + 21*x^2 + 386*x -1337)*(x^3 + 2*x^2 -71*x + 97)^2*(x^4 + 6*x^3 -27*x^2 -81*x + 162)^2; T[194,41]=(x + 2)*(x^4 -56*x^2 + 64*x + 448)*(x^4 + 16*x^3 + 56*x^2 -128*x -576)*(x^3 -3*x^2 -4*x -1)^2*(x^4 -3*x^3 -158*x^2 + 131*x + 5506)^2; T[194,43]=(x + 8)*(x^4 -10*x^3 -69*x^2 + 430*x + 1657)*(x^4 + 10*x^3 -61*x^2 -446*x -223)*(x^3 -x^2 -16*x + 29)^2*(x^4 -9*x^3 + 20*x^2 + 9*x -44)^2; T[194,47]=(x^4 + 4*x^3 -20*x^2 -16*x + 48)*(x^4 + 28*x^3 + 244*x^2 + 560*x -784)*(x )*(x^3 + 17*x^2 + 59*x -13)^2*(x^4 -19*x^3 + 99*x^2 -161*x + 16)^2; T[194,53]=(x -6)*(x^4 + 4*x^3 -44*x^2 -208*x -112)*(x^4 + 4*x^3 -180*x^2 -784*x -528)*(x^3 -2*x^2 -155*x + 659)^2*(x^4 + 4*x^3 -75*x^2 -123*x + 1262)^2; T[194,59]=(x -6)*(x^4 + 20*x^3 + 108*x^2 + 16*x -752)*(x^4 -4*x^3 -36*x^2 + 16*x + 144)*(x^3 -19*x^2 + 104*x -169)^2*(x^4 -x^3 -98*x^2 + 3*x + 772)^2; T[194,61]=(x -10)*(x^4 + 4*x^3 -148*x^2 + 16*x + 3344)*(x^4 -12*x^3 -196*x^2 + 1968*x + 5392)*(x^3 -3*x^2 -88*x + 377)^2*(x^4 + 7*x^3 -74*x^2 -627*x -1046)^2; T[194,67]=(x -6)*(x^4 -16*x^3 -112*x^2 + 1408*x + 5696)*(x^4 -16*x^3 + 40*x^2 + 320*x -1216)*(x^3 + x^2 -86*x -337)^2*(x^4 + 11*x^3 -86*x^2 -1069*x -1604)^2; T[194,71]=(x^4 -12*x^3 -60*x^2 + 272*x -112)*(x^4 -28*x^3 + 228*x^2 -368*x -816)*(x )*(x^3 + 23*x^2 + 132*x + 13)^2*(x^4 -11*x^3 -24*x^2 + 413*x -656)^2; T[194,73]=(x + 10)*(x^4 -10*x^3 -41*x^2 -22*x + 1)*(x^4 + 6*x^3 -121*x^2 -230*x + 97)*(x^3 + x^2 -2*x -1)^2*(x^4 + 19*x^3 + 4*x^2 -1249*x -3982)^2; T[194,79]=(x -8)*(x^4 -32*x^3 + 320*x^2 -800*x -1936)*(x^2 -4*x -4)^2*(x^3 + 12*x^2 -x -223)^2*(x^4 + 16*x^3 -73*x^2 -1303*x + 1952)^2; T[194,83]=(x + 2)*(x^4 + 12*x^3 -92*x^2 -1680*x -5488)*(x^4 + 20*x^3 + 124*x^2 + 208*x -144)*(x^3 -2*x^2 -148*x + 232)^2*(x^4 -14*x^3 -108*x^2 + 1592*x -4064)^2; T[194,89]=(x -14)*(x^4 -14*x^3 -x^2 + 670*x -2223)*(x^4 + 18*x^3 + 31*x^2 -98*x + 49)*(x^3 -12*x^2 -x + 41)^2*(x^4 + 26*x^3 + 91*x^2 -1449*x -5762)^2; T[194,97]=(x + 1)^11*(x -1)^12; T[195,2]=(x^3 -7*x -2)*(x -1)^2*(x^2 -3)^2*(x -2)^3*(x^2 + 2*x -1)^4*(x + 1)^5; T[195,3]=(x^2 + 2*x + 3)*(x^4 -2*x^3 + 4*x^2 -6*x + 9)*(x^4 + 4*x^2 + 9)*(x -1)^7*(x + 1)^8; T[195,5]=(x^2 -2*x + 5)*(x^4 + 2*x^2 + 25)*(x -1)^9*(x + 1)^10; T[195,7]=(x -3)*(x + 1)*(x + 3)*(x^3 -x^2 -16*x -16)*(x^2 -8)^2*(x^2 -4*x -4)^2*(x )^3*(x -2)^4*(x + 4)^4; T[195,11]=(x -5)*(x + 1)*(x + 5)*(x^3 -x^2 -16*x -16)*(x -2)^2*(x + 4)^2*(x^2 + 6*x + 6)^2*(x^2 -4*x + 2)^2*(x -4)^3*(x + 2)^4; T[195,13]=(x^2 + 2*x + 13)*(x -1)^11*(x + 1)^12; T[195,17]=(x + 7)*(x -5)*(x + 1)*(x^3 + x^2 -32*x -76)*(x^2 -12)^2*(x^2 + 4*x -4)^2*(x^2 -4*x -28)^2*(x -2)^7; T[195,19]=(x + 4)*(x + 2)*(x -2)*(x^3 -6*x^2 -16*x + 64)*(x -4)^2*(x^2 -4*x + 2)^2*(x^2 -8)^2*(x^2 + 2*x -26)^2*(x )^2*(x + 6)^3; T[195,23]=(x -8)*(x -3)*(x + 1)*(x + 3)*(x^3 + 7*x^2 -16*x -128)*(x + 6)^2*(x^2 -2)^2*(x^2 -6*x + 6)^2*(x + 4)^4*(x )^4; T[195,29]=(x -10)*(x + 10)^2*(x^2 + 12*x + 24)^2*(x^2 -32)^2*(x -6)^3*(x + 2)^4*(x -2)^7; T[195,31]=(x + 6)*(x -2)*(x + 8)*(x + 2)*(x^3 -6*x^2 -16*x + 32)*(x + 10)^2*(x -4)^2*(x^2 + 8*x + 8)^2*(x^2 -10*x -2)^2*(x^2 -12*x + 18)^2*(x )^2; T[195,37]=(x -11)*(x -7)*(x + 3)*(x -6)*(x^3 -13*x^2 + 316)*(x + 10)^2*(x^2 -72)^2*(x^2 + 4*x -28)^2*(x + 4)^4*(x + 2)^4; T[195,41]=(x -9)*(x + 9)*(x + 5)*(x^3 -x^2 -32*x + 76)*(x -10)^2*(x -6)^2*(x^2 -16*x + 56)^2*(x^2 + 12*x + 28)^2*(x^2 -12)^2*(x + 6)^3; T[195,43]=(x + 8)*(x^3 -112*x -128)*(x + 4)^2*(x + 12)^2*(x -10)^2*(x^2 + 8*x -34)^2*(x^2 -10*x -2)^2*(x^2 -8*x -16)^2*(x -4)^3; T[195,47]=(x + 8)*(x + 10)*(x^3 + 18*x^2 + 80*x + 64)*(x -10)^2*(x -4)^2*(x -8)^2*(x^2 + 4*x -4)^2*(x^2 + 12*x + 4)^2*(x )^2*(x -6)^4; T[195,53]=(x -11)*(x -9)*(x -5)*(x^3 -11*x^2 + 8*x + 4)*(x + 10)^2*(x -2)^2*(x^2 + 12*x -36)^2*(x^2 -108)^2*(x -6)^3*(x + 2)^4; T[195,59]=(x -8)*(x + 12)*(x^3 + 8*x^2 -48*x -128)*(x -6)^2*(x + 4)^2*(x -12)^2*(x^2 -4*x -28)^2*(x^2 + 6*x -138)^2*(x^2 -12*x + 18)^2*(x )^2; T[195,61]=(x + 11)*(x -5)*(x -13)*(x^3 -9*x^2 -112*x + 844)*(x -2)^2*(x^2 -4*x -124)^2*(x^2 -4*x -104)^2*(x + 8)^4*(x + 2)^5; T[195,67]=(x^3 -4*x^2 -64*x + 128)*(x + 8)^2*(x^2 -8*x + 8)^2*(x^2 + 8*x -92)^2*(x -12)^3*(x + 2)^4*(x + 4)^5; T[195,71]=(x + 5)*(x -9)*(x -15)*(x^3 + 11*x^2 + 24*x -32)*(x + 8)^2*(x -6)^2*(x^2 -6*x + 6)^2*(x^2 -4*x -94)^2*(x )^3*(x -2)^4; T[195,73]=(x -6)*(x^3 + 6*x^2 -100*x -344)*(x -2)^2*(x^2 -72)^2*(x^2 -12*x + 4)^2*(x -10)^3*(x + 6)^4*(x + 4)^4; T[195,79]=(x + 11)*(x -16)*(x^3 -5*x^2 -48*x -64)*(x + 3)^2*(x + 12)^2*(x -8)^2*(x^2 -128)^2*(x^2 -72)^2*(x^2 -4*x -104)^2*(x )^2; T[195,83]=(x + 12)*(x -8)*(x^3 -8*x^2 -48*x + 128)*(x + 4)^2*(x + 16)^2*(x -12)^2*(x -4)^2*(x^2 + 4*x -28)^2*(x^2 + 12*x + 28)^2*(x + 6)^4; T[195,89]=(x + 15)*(x + 11)*(x -11)*(x -10)*(x^3 -11*x^2 + 8*x + 4)*(x + 2)^2*(x -2)^2*(x + 6)^2*(x^2 -24*x + 136)^2*(x^2 + 12*x -12)^2*(x -6)^4; T[195,97]=(x + 9)*(x -18)*(x -17)*(x + 11)*(x^3 + 25*x^2 + 176*x + 244)*(x + 2)^2*(x -10)^2*(x^2 + 4*x -28)^4*(x -2)^6; T[196,2]=(x^2 -x + 2)*(x -1)^2*(x + 1)^3*(x )^10; T[196,3]=(x -1)*(x + 1)*(x^2 -8)*(x -2)^2*(x^2 -2)^2*(x )^3*(x + 2)^4; T[196,5]=(x -3)*(x + 3)*(x^2 -2)*(x^2 -8)^2*(x )^9; T[196,7]=(x -1)^2*(x )^15; T[196,11]=(x + 3)^2*(x + 2)^4*(x -4)^5*(x )^6; T[196,13]=(x + 2)*(x -2)*(x^2 -18)*(x -4)^2*(x + 4)^4*(x )^7; T[196,17]=(x -3)*(x + 3)*(x + 6)^2*(x^2 -2)^3*(x )^3*(x -6)^4; T[196,19]=(x + 1)*(x -1)*(x^2 -8)*(x + 2)^2*(x^2 -50)^2*(x )^3*(x -2)^4; T[196,23]=(x -3)^2*(x -8)^3*(x + 4)^6*(x )^6; T[196,29]=(x -8)^2*(x -2)^7*(x + 6)^8; T[196,31]=(x + 7)*(x -7)*(x -4)^2*(x^2 -72)^2*(x + 4)^4*(x )^5; T[196,37]=(x + 8)^2*(x + 1)^2*(x + 6)^3*(x -10)^4*(x -2)^6; T[196,41]=(x^2 -50)*(x^2 -98)^2*(x + 6)^3*(x )^3*(x -6)^5; T[196,43]=(x + 12)^3*(x + 4)^4*(x -2)^4*(x -8)^6; T[196,47]=(x + 9)*(x -9)*(x^2 -32)*(x -12)^2*(x^2 -8)^2*(x )^3*(x + 12)^4; T[196,53]=(x -3)^2*(x -10)^2*(x + 10)^3*(x + 2)^4*(x -6)^6; T[196,59]=(x -9)*(x + 9)*(x^2 -200)*(x -6)^2*(x^2 -2)^2*(x )^3*(x + 6)^4; T[196,61]=(x + 1)*(x -1)*(x^2 -50)*(x + 8)^2*(x^2 -8)^2*(x )^3*(x -8)^4; T[196,67]=(x + 7)^2*(x )^2*(x -4)^3*(x -12)^4*(x + 4)^6; T[196,71]=(x -16)^3*(x + 12)^4*(x )^10; T[196,73]=(x + 1)*(x -1)*(x^2 -50)*(x + 2)^2*(x^2 -2)^2*(x )^3*(x -2)^4; T[196,79]=(x + 13)^2*(x + 4)^4*(x -8)^11; T[196,83]=(x + 12)*(x -12)*(x^2 -200)*(x -6)^2*(x^2 -98)^2*(x )^3*(x + 6)^4; T[196,89]=(x -15)*(x + 15)*(x -6)^2*(x^2 -50)^3*(x )^3*(x + 6)^4; T[196,97]=(x^2 -2)*(x^2 -98)^2*(x -10)^3*(x )^3*(x + 10)^5; T[197,2]=(x + 2)*(x^5 -5*x^3 + x^2 + 3*x -1)*(x^10 -15*x^8 + x^7 + 78*x^6 -7*x^5 -165*x^4 + 15*x^3 + 123*x^2 -9*x -26); T[197,3]=(x^5 + 8*x^4 + 18*x^3 -x^2 -38*x -25)*(x^10 -10*x^9 + 29*x^8 + 17*x^7 -227*x^6 + 316*x^5 + 184*x^4 -784*x^3 + 646*x^2 -175*x + 2)*(x ); T[197,5]=(x^5 + 4*x^4 -8*x^3 -37*x^2 + 16*x + 85)*(x^10 -2*x^9 -26*x^8 + 59*x^7 + 180*x^6 -465*x^5 -194*x^4 + 804*x^3 -200*x^2 -176*x + 32)*(x ); T[197,7]=(x + 3)*(x^10 -11*x^9 + 25*x^8 + 100*x^7 -420*x^6 -24*x^5 + 1485*x^4 -1136*x^3 -496*x^2 + 384*x + 64)*(x^5 + 10*x^4 + 27*x^3 -9*x^2 -97*x -53); T[197,11]=(x -4)*(x^5 + 8*x^4 + x^3 -68*x^2 + 22*x + 59)*(x^10 -2*x^9 -48*x^8 + 128*x^7 + 590*x^6 -1633*x^5 -2727*x^4 + 6561*x^3 + 5866*x^2 -7319*x -5906); T[197,13]=(x + 2)*(x^5 + 8*x^4 -18*x^3 -163*x^2 + 188*x + 493)*(x^10 -8*x^9 -14*x^8 + 189*x^7 -28*x^6 -1145*x^5 + 116*x^4 + 2160*x^3 -352*x^2 -1264*x + 448); T[197,17]=(x + 8)*(x^5 -9*x^4 + 3*x^3 + 105*x^2 -34*x -289)*(x^10 + 3*x^9 -77*x^8 -135*x^7 + 1946*x^6 + 1297*x^5 -16940*x^4 -8*x^3 + 35744*x^2 + 3776*x -11008); T[197,19]=(x + 3)*(x^5 + 16*x^4 + 80*x^3 + 81*x^2 -378*x -761)*(x^10 -17*x^9 + 76*x^8 + 217*x^7 -2575*x^6 + 4369*x^5 + 14921*x^4 -57736*x^3 + 47488*x^2 + 21888*x -26944); T[197,23]=(x + 3)*(x^5 + x^4 -27*x^3 + 18*x^2 + 61*x -1)*(x^10 + 4*x^9 -144*x^8 -543*x^7 + 6487*x^6 + 20118*x^5 -102435*x^4 -144484*x^3 + 661108*x^2 -346800*x -55696); T[197,29]=(x -7)*(x^5 -2*x^4 -42*x^3 + 9*x^2 + 18*x -1)*(x^10 + 9*x^9 -35*x^8 -502*x^7 -392*x^6 + 7235*x^5 + 16932*x^4 -14806*x^3 -66514*x^2 -43305*x -1849); T[197,31]=(x + 10)*(x^5 -2*x^4 -31*x^3 + 9*x^2 + 249*x + 235)*(x^10 -20*x^9 + 122*x^8 -43*x^7 -1825*x^6 + 3816*x^5 + 4406*x^4 -9464*x^3 + 183*x^2 + 3967*x -1018); T[197,37]=(x -7)*(x^5 + 17*x^4 -x^3 -1275*x^2 -6400*x -7121)*(x^10 -12*x^9 -153*x^8 + 1716*x^7 + 8394*x^6 -65825*x^5 -245040*x^4 + 611177*x^3 + 1793316*x^2 -1567431*x -1031837); T[197,41]=(x -9)*(x^5 + 5*x^4 -162*x^3 -847*x^2 + 4273*x + 16859)*(x^10 + 18*x^9 -32*x^8 -2301*x^7 -9354*x^6 + 73605*x^5 + 571732*x^4 + 189871*x^3 -7320245*x^2 -19192528*x -12249251); T[197,43]=(x -1)*(x^5 + 26*x^4 + 213*x^3 + 492*x^2 -660*x -2027)*(x^10 -11*x^9 -121*x^8 + 1383*x^7 + 3444*x^6 -51739*x^5 + 12207*x^4 + 500040*x^3 -261784*x^2 -1206576*x + 958064); T[197,47]=(x + 11)*(x^5 -16*x^4 + 50*x^3 + 167*x^2 -494*x -169)*(x^10 -5*x^9 -226*x^8 + 1173*x^7 + 13591*x^6 -52879*x^5 -318703*x^4 + 512768*x^3 + 2642712*x^2 -1037072*x -6076144); T[197,53]=(x -10)*(x^5 -2*x^4 -139*x^3 + 483*x^2 + 1683*x -5615)*(x^10 + 6*x^9 -220*x^8 -739*x^7 + 15835*x^6 + 3138*x^5 -350470*x^4 + 990644*x^3 -916187*x^2 + 181083*x + 24986); T[197,59]=(x^5 + 13*x^4 -46*x^3 -867*x^2 -643*x + 7055)*(x^10 + x^9 -338*x^8 -339*x^7 + 36805*x^6 + 34799*x^5 -1432560*x^4 -946828*x^3 + 12098912*x^2 -8585872*x -2663552)*(x ); T[197,61]=(x -5)*(x^5 + 3*x^4 -125*x^3 -88*x^2 + 3683*x -4835)*(x^10 -4*x^9 -265*x^8 + 1601*x^7 + 20942*x^6 -180267*x^5 -255598*x^4 + 5872323*x^3 -17056652*x^2 + 11676600*x + 7550167); T[197,67]=(x + 10)*(x^5 + 40*x^4 + 571*x^3 + 3340*x^2 + 6302*x + 745)*(x^10 -46*x^9 + 754*x^8 -3152*x^7 -60904*x^6 + 1002661*x^5 -6499905*x^4 + 19481415*x^3 -10759642*x^2 -79238917*x + 142552394); T[197,71]=(x -8)*(x^5 + 5*x^4 -121*x^3 -1038*x^2 -2149*x -617)*(x^10 + 5*x^9 -450*x^8 -3071*x^7 + 61093*x^6 + 604068*x^5 -1478314*x^4 -36020573*x^3 -151865757*x^2 -241118521*x -112062458); T[197,73]=(x -6)*(x^5 + 9*x^4 -149*x^3 -1692*x^2 -2003*x + 10889)*(x^10 -25*x^9 -71*x^8 + 6014*x^7 -31477*x^6 -273297*x^5 + 2126400*x^4 + 2481468*x^3 -29341120*x^2 -9049168*x + 28387712); T[197,79]=(x -2)*(x^5 -13*x^4 -163*x^3 + 3068*x^2 -14357*x + 20567)*(x^10 + x^9 -302*x^8 + 505*x^7 + 27409*x^6 -82390*x^5 -747136*x^4 + 1733729*x^3 + 8956725*x^2 -6591775*x -29837000); T[197,83]=(x + 7)*(x^5 + 17*x^4 -22*x^3 -1143*x^2 -2107*x + 4447)*(x^10 -28*x^9 + 25*x^8 + 4755*x^7 -26636*x^6 -149210*x^5 + 577025*x^4 + 3181768*x^3 + 4340312*x^2 + 2039680*x + 303296); T[197,89]=(x + 8)*(x^5 -10*x^4 -90*x^3 + 833*x^2 + 1152*x -9043)*(x^10 + 6*x^9 -410*x^8 -2437*x^7 + 40864*x^6 + 217907*x^5 -1431218*x^4 -6973192*x^3 + 13883856*x^2 + 69163248*x + 57477472); T[197,97]=(x + 2)*(x^5 + 42*x^4 + 653*x^3 + 4612*x^2 + 14610*x + 16711)*(x^10 -2*x^9 -464*x^8 + 154*x^7 + 63470*x^6 + 17283*x^5 -2998665*x^4 -132197*x^3 + 48684390*x^2 -30209973*x -151216646); T[198,2]=(x^2 -2*x + 2)*(x^2 + x + 2)^2*(x^2 + 2*x + 2)^3*(x^2 -x + 2)^3*(x + 1)^5*(x -1)^6; T[198,3]=(x -1)^2*(x^2 + x + 3)^2*(x + 1)^3*(x )^20; T[198,5]=(x + 1)^2*(x -4)^3*(x + 4)^4*(x -2)^4*(x + 2)^5*(x )^5*(x -1)^6; T[198,7]=(x + 4)^3*(x -2)^5*(x -4)^6*(x + 2)^15; T[198,11]=(x + 1)^12*(x -1)^17; T[198,13]=(x -2)^2*(x + 6)^3*(x + 4)^3*(x + 2)^10*(x -4)^11; T[198,17]=(x -6)^2*(x + 6)^3*(x -2)^9*(x + 2)^15; T[198,19]=(x -2)^2*(x -4)^3*(x + 4)^3*(x + 6)^4*(x )^17; T[198,23]=(x + 8)^2*(x -1)^2*(x )^2*(x -6)^3*(x + 6)^3*(x + 4)^3*(x -4)^4*(x -8)^4*(x + 1)^6; T[198,29]=(x + 10)*(x -10)^2*(x )^8*(x + 6)^9*(x -6)^9; T[198,31]=(x + 4)^2*(x -8)^3*(x )^3*(x -4)^4*(x -7)^8*(x + 8)^9; T[198,37]=(x -2)^2*(x + 10)^3*(x + 2)^3*(x + 6)^4*(x -3)^8*(x -6)^9; T[198,41]=(x -8)^2*(x + 10)^2*(x -10)^2*(x -6)^4*(x + 6)^4*(x -2)^4*(x + 2)^5*(x + 8)^6; T[198,43]=(x + 10)^2*(x -8)^3*(x -6)^4*(x -4)^6*(x )^6*(x + 6)^8; T[198,47]=(x -6)*(x -2)*(x -12)^2*(x + 2)^2*(x + 6)^2*(x + 12)^3*(x + 8)^6*(x -8)^12; T[198,53]=(x + 2)*(x -12)*(x + 4)*(x + 12)*(x -2)^2*(x -4)^2*(x -6)^6*(x )^7*(x + 6)^8; T[198,59]=(x + 5)^2*(x + 12)^2*(x -12)^3*(x -4)^4*(x -5)^6*(x + 4)^6*(x )^6; T[198,61]=(x + 10)^2*(x -8)^3*(x + 8)^3*(x + 14)^3*(x + 6)^4*(x -6)^6*(x -12)^8; T[198,67]=(x -4)^3*(x + 12)^3*(x -8)^6*(x + 7)^8*(x + 4)^9; T[198,71]=(x + 2)*(x + 6)*(x -6)^2*(x -3)^2*(x -12)^2*(x -2)^2*(x + 12)^3*(x + 3)^6*(x )^10; T[198,73]=(x -14)^2*(x -2)^3*(x + 2)^4*(x + 14)^6*(x + 6)^6*(x -4)^8; T[198,79]=(x -2)^2*(x -10)^3*(x -14)^3*(x + 4)^9*(x + 10)^12; T[198,83]=(x -6)^2*(x + 4)^2*(x -4)^4*(x + 6)^6*(x + 12)^7*(x -12)^8; T[198,89]=(x + 15)^2*(x + 10)^2*(x -6)^3*(x -10)^4*(x -15)^6*(x + 6)^6*(x )^6; T[198,97]=(x -14)^3*(x + 2)^3*(x + 14)^3*(x + 7)^8*(x -2)^12; T[199,2]=(x^2 + x -1)*(x^4 + 3*x^3 -4*x -1)*(x^10 -5*x^9 -4*x^8 + 51*x^7 -32*x^6 -154*x^5 + 151*x^4 + 168*x^3 -168*x^2 -54*x + 27); T[199,3]=(x^10 + 4*x^9 -19*x^8 -88*x^7 + 73*x^6 + 552*x^5 + 200*x^4 -784*x^3 -480*x^2 + 96*x + 64)*(x -2)^2*(x^2 + x -1)^2; T[199,5]=(x^4 + 5*x^3 + 4*x^2 -10*x -11)*(x^10 + x^9 -26*x^8 -26*x^7 + 216*x^6 + 219*x^5 -607*x^4 -571*x^3 + 317*x^2 + 156*x -63)*(x -3)^2; T[199,7]=(x^4 + 3*x^3 -10*x^2 + 6*x -1)*(x^10 + 3*x^9 -41*x^8 -135*x^7 + 504*x^6 + 2027*x^5 -1160*x^4 -10173*x^3 -8697*x^2 + 1110*x + 497)*(x )^2; T[199,11]=(x^2 + 6*x + 4)*(x^4 + 7*x^3 + 10*x^2 -6*x -11)*(x^10 -17*x^9 + 84*x^8 + 80*x^7 -1875*x^6 + 4370*x^5 + 4696*x^4 -27992*x^3 + 16544*x^2 + 42144*x -45504); T[199,13]=(x^2 -2*x -19)*(x^4 -14*x^2 + 25*x -11)*(x^10 -60*x^8 -21*x^7 + 1174*x^6 + 364*x^5 -9433*x^4 -593*x^3 + 30585*x^2 -5033*x -26803); T[199,17]=(x^2 -2*x -4)*(x^4 + 13*x^3 + 53*x^2 + 83*x + 41)*(x^10 -13*x^9 -33*x^8 + 903*x^7 -931*x^6 -18888*x^5 + 35108*x^4 + 127856*x^3 -200288*x^2 -289728*x + 136512); T[199,19]=(x^2 -2*x -44)*(x^4 -26*x^2 + 15*x + 89)*(x^10 + 8*x^9 -74*x^8 -681*x^7 + 1255*x^6 + 18102*x^5 + 9484*x^4 -155232*x^3 -260048*x^2 + 28416*x + 47808); T[199,23]=(x^2 -45)*(x^4 + 4*x^3 -50*x^2 -108*x + 409)*(x^10 -4*x^9 -80*x^8 + 192*x^7 + 2058*x^6 -3068*x^5 -22337*x^4 + 18540*x^3 + 100087*x^2 -32676*x -126969); T[199,29]=(x^2 -8*x -4)*(x^4 + 19*x^3 + 87*x^2 -149*x -1109)*(x^10 -31*x^9 + 344*x^8 -1298*x^7 -3683*x^6 + 41082*x^5 -71279*x^4 -154274*x^3 + 430738*x^2 + 50745*x -214521); T[199,31]=(x^2 + 4*x -1)*(x^4 + 2*x^3 -15*x^2 -36*x -1)*(x^10 + 10*x^9 -117*x^8 -884*x^7 + 6198*x^6 + 20286*x^5 -144318*x^4 + 30846*x^3 + 555826*x^2 -473788*x + 50969); T[199,37]=(x^2 + 6*x -36)*(x^4 -11*x^3 + 27*x^2 + 21*x -49)*(x^10 + x^9 -107*x^8 + 91*x^7 + 3397*x^6 -6026*x^5 -39664*x^4 + 103936*x^3 + 116960*x^2 -552960*x + 430272); T[199,41]=(x^2 -6*x + 4)*(x^4 + 22*x^3 + 128*x^2 -118*x -1969)*(x^10 -36*x^9 + 344*x^8 + 2130*x^7 -55221*x^6 + 207810*x^5 + 1570380*x^4 -13244592*x^3 + 15580960*x^2 + 92425824*x -201558336); T[199,43]=(x^2 + 20*x + 95)*(x^4 -3*x^3 -45*x^2 + 149*x -61)*(x^10 + x^9 -251*x^8 -357*x^7 + 19058*x^6 + 54883*x^5 -430476*x^4 -2236604*x^3 -3181720*x^2 -1542745*x -231451); T[199,47]=(x^2 -4*x -1)*(x^4 -10*x^3 -44*x^2 + 520*x -496)*(x^10 + 14*x^9 -78*x^8 -1216*x^7 + 3573*x^6 + 33370*x^5 -105889*x^4 -185978*x^3 + 846484*x^2 -746376*x + 183792); T[199,53]=(x^2 + 14*x + 29)*(x^4 + 3*x^3 -137*x^2 -627*x -109)*(x^10 -29*x^9 + 237*x^8 + 389*x^7 -16432*x^6 + 96273*x^5 -216614*x^4 + 25224*x^3 + 586668*x^2 -454725*x -359181); T[199,59]=(x^2 -20)*(x^4 -2*x^3 -155*x^2 -264*x + 2299)*(x^10 -10*x^9 -145*x^8 + 1976*x^7 -4229*x^6 -27378*x^5 + 142384*x^4 -212704*x^3 + 62192*x^2 + 48864*x -576); T[199,61]=(x^2 -10*x -55)*(x^4 -5*x^3 -44*x^2 + 140*x + 539)*(x^10 + 3*x^9 -382*x^8 -1440*x^7 + 49318*x^6 + 223949*x^5 -2309051*x^4 -12332431*x^3 + 20326235*x^2 + 138347022*x + 82389159); T[199,67]=(x^4 -17*x^3 + 28*x^2 + 598*x -1859)*(x^10 + x^9 -274*x^8 + 658*x^7 + 18521*x^6 -59936*x^5 -415800*x^4 + 1342784*x^3 + 2746400*x^2 -5862048*x -6682688)*(x -2)^2; T[199,71]=(x^2 + 6*x + 4)*(x^4 + 18*x^3 -80*x^2 -2674*x -10241)*(x^10 -20*x^9 -320*x^8 + 7758*x^7 + 23371*x^6 -971146*x^5 + 764932*x^4 + 43082800*x^3 -89118496*x^2 -377840352*x -49590336); T[199,73]=(x^2 -10*x + 20)*(x^4 + 2*x^3 -47*x^2 -148*x -89)*(x^10 + 24*x^9 -37*x^8 -5278*x^7 -39961*x^6 + 132584*x^5 + 2893520*x^4 + 11844400*x^3 + 4084160*x^2 -74823712*x -126156224); T[199,79]=(x^2 + 12*x -9)*(x^4 + 11*x^3 -110*x^2 -622*x + 769)*(x^10 -17*x^9 -248*x^8 + 4056*x^7 + 18474*x^6 -242713*x^5 -634593*x^4 + 2487023*x^3 + 6096603*x^2 -4831474*x -11972809); T[199,83]=(x^2 -18*x + 76)*(x^4 -7*x^3 -60*x^2 + 246*x + 1109)*(x^10 + 33*x^9 + 260*x^8 -2128*x^7 -35867*x^6 -46656*x^5 + 1111528*x^4 + 3914568*x^3 -5001536*x^2 -20158080*x + 19171008); T[199,89]=(x^4 + 9*x^3 -140*x^2 -1218*x + 899)*(x^10 -15*x^9 -162*x^8 + 4238*x^7 -24670*x^6 + 18267*x^5 + 196513*x^4 -274091*x^3 -385793*x^2 + 502632*x -12561)*(x -9)^2; T[199,97]=(x^2 -8*x -64)*(x^4 + 10*x^3 -161*x^2 -1910*x -4091)*(x^10 -2*x^9 -679*x^8 + 998*x^7 + 163445*x^6 -200814*x^5 -16661184*x^4 + 18134792*x^3 + 659961200*x^2 -503055872*x -8275375168); T[200,2]=(x -1)*(x + 1)*(x )^17; T[200,3]=(x + 3)*(x -3)*(x -1)^3*(x + 1)^3*(x -2)^3*(x )^3*(x + 2)^5; T[200,5]=(x -1)*(x + 1)^2*(x )^16; T[200,7]=(x -4)*(x + 4)^2*(x + 2)^7*(x -2)^9; T[200,11]=(x -1)^2*(x + 4)^2*(x -4)^3*(x + 3)^6*(x )^6; T[200,13]=(x + 2)^4*(x -4)^5*(x + 4)^5*(x -2)^5; T[200,17]=(x -5)*(x + 2)*(x + 5)*(x -2)^2*(x -6)^2*(x )^2*(x + 3)^3*(x -3)^3*(x + 6)^4; T[200,19]=(x -1)^2*(x -4)^3*(x -5)^6*(x + 4)^8; T[200,23]=(x + 4)*(x + 2)^2*(x -2)^2*(x -4)^2*(x + 6)^5*(x -6)^7; T[200,29]=(x -2)^2*(x + 8)^2*(x + 2)^3*(x -6)^6*(x )^6; T[200,31]=(x -10)^2*(x )^2*(x + 8)^3*(x + 4)^6*(x -2)^6; T[200,37]=(x -4)*(x + 4)*(x + 6)^2*(x -6)^3*(x + 2)^5*(x -2)^7; T[200,41]=(x -2)^2*(x + 6)^3*(x -6)^6*(x + 3)^8; T[200,43]=(x -8)*(x -6)*(x + 6)*(x -10)^2*(x + 8)^2*(x + 10)^4*(x -4)^4*(x + 4)^4; T[200,47]=(x + 4)^2*(x -12)^3*(x -4)^3*(x + 12)^3*(x -6)^3*(x + 6)^5; T[200,53]=(x + 4)*(x -4)*(x -6)^8*(x + 6)^9; T[200,59]=(x -8)^2*(x + 12)^2*(x + 4)^3*(x -12)^6*(x )^6; T[200,61]=(x -10)^2*(x + 10)^2*(x + 2)^3*(x -2)^12; T[200,67]=(x + 14)*(x -14)*(x -1)*(x + 8)*(x + 1)*(x -8)^2*(x + 2)^2*(x + 13)^3*(x -13)^3*(x -2)^4; T[200,71]=(x -8)^2*(x )^3*(x -12)^6*(x + 12)^8; T[200,73]=(x -3)*(x + 8)*(x + 3)*(x -6)*(x -8)*(x + 6)^2*(x + 2)^2*(x -11)^3*(x + 11)^3*(x -2)^4; T[200,79]=(x -16)^2*(x -6)^2*(x )^3*(x + 10)^6*(x -8)^6; T[200,83]=(x -2)*(x -16)*(x -13)*(x + 13)*(x + 2)*(x + 16)^2*(x + 6)^2*(x + 9)^3*(x -9)^3*(x -6)^4; T[200,89]=(x -6)^2*(x + 9)^2*(x -15)^6*(x + 6)^9; T[200,97]=(x -16)*(x + 16)*(x -14)^2*(x + 14)^3*(x + 2)^5*(x -2)^7; }