we look for an automorphism of g_{6,3}$ nombre d'equations90$ processus de resolution: phase 1$ nombre d'equations90$ collect_eq:={{{{1,2},1}, - b(1,4)}, {{{1,2},2}, - b(2,4)}, {{{1,2},3}, - b(3,4)}, {{{1,2},4}, - b(4,4) + b(2,2)*b(1,1) - b(2,1)*b(1,2)}, {{{1,2},5}, - b(5,4) + b(3,2)*b(1,1) - b(3,1)*b(1,2)}, {{{1,2},6}, - b(6,4) + b(3,2)*b(2,1) - b(3,1)*b(2,2)}, {{{1,3},1}, - b(1,5)}, {{{1,3},2}, - b(2,5)}, {{{1,3},3}, - b(3,5)}, {{{1,3},4}, - b(4,5) + b(2,3)*b(1,1) - b(2,1)*b(1,3)}, {{{1,3},5}, - b(5,5) + b(3,3)*b(1,1) - b(3,1)*b(1,3)}, {{{1,3},6}, - b(6,5) + b(3,3)*b(2,1) - b(3,1)*b(2,3)}, {{{1,4},1},0}, {{{1,4},2},0}, {{{1,4},3},0}, {{{1,4},4},b(2,4)*b(1,1) - b(2,1)*b(1,4)}, {{{1,4},5},b(3,4)*b(1,1) - b(3,1)*b(1,4)}, {{{1,4},6},b(3,4)*b(2,1) - b(3,1)*b(2,4)}, {{{1,5},1},0}, {{{1,5},2},0}, {{{1,5},3},0}, {{{1,5},4},b(2,5)*b(1,1) - b(2,1)*b(1,5)}, {{{1,5},5},b(3,5)*b(1,1) - b(3,1)*b(1,5)}, {{{1,5},6},b(3,5)*b(2,1) - b(3,1)*b(2,5)}, {{{1,6},1},0}, {{{1,6},2},0}, {{{1,6},3},0}, {{{1,6},4},b(2,6)*b(1,1) - b(2,1)*b(1,6)}, {{{1,6},5},b(3,6)*b(1,1) - b(3,1)*b(1,6)}, {{{1,6},6},b(3,6)*b(2,1) - b(3,1)*b(2,6)}, {{{2,3},1}, - b(1,6)}, {{{2,3},2}, - b(2,6)}, {{{2,3},3}, - b(3,6)}, {{{2,3},4}, - b(4,6) + b(2,3)*b(1,2) - b(2,2)*b(1,3)}, {{{2,3},5}, - b(5,6) + b(3,3)*b(1,2) - b(3,2)*b(1,3)}, {{{2,3},6}, - b(6,6) + b(3,3)*b(2,2) - b(3,2)*b(2,3)}, {{{2,4},1},0}, {{{2,4},2},0}, {{{2,4},3},0}, {{{2,4},4},b(2,4)*b(1,2) - b(2,2)*b(1,4)}, {{{2,4},5},b(3,4)*b(1,2) - b(3,2)*b(1,4)}, {{{2,4},6},b(3,4)*b(2,2) - b(3,2)*b(2,4)}, {{{2,5},1},0}, {{{2,5},2},0}, {{{2,5},3},0}, {{{2,5},4},b(2,5)*b(1,2) - b(2,2)*b(1,5)}, {{{2,5},5},b(3,5)*b(1,2) - b(3,2)*b(1,5)}, {{{2,5},6},b(3,5)*b(2,2) - b(3,2)*b(2,5)}, {{{2,6},1},0}, {{{2,6},2},0}, {{{2,6},3},0}, {{{2,6},4},b(2,6)*b(1,2) - b(2,2)*b(1,6)}, {{{2,6},5},b(3,6)*b(1,2) - b(3,2)*b(1,6)}, {{{2,6},6},b(3,6)*b(2,2) - b(3,2)*b(2,6)}, {{{3,4},1},0}, {{{3,4},2},0}, {{{3,4},3},0}, {{{3,4},4},b(2,4)*b(1,3) - b(2,3)*b(1,4)}, {{{3,4},5},b(3,4)*b(1,3) - b(3,3)*b(1,4)}, {{{3,4},6},b(3,4)*b(2,3) - b(3,3)*b(2,4)}, {{{3,5},1},0}, {{{3,5},2},0}, {{{3,5},3},0}, {{{3,5},4},b(2,5)*b(1,3) - b(2,3)*b(1,5)}, {{{3,5},5},b(3,5)*b(1,3) - b(3,3)*b(1,5)}, {{{3,5},6},b(3,5)*b(2,3) - b(3,3)*b(2,5)}, {{{3,6},1},0}, {{{3,6},2},0}, {{{3,6},3},0}, {{{3,6},4},b(2,6)*b(1,3) - b(2,3)*b(1,6)}, {{{3,6},5},b(3,6)*b(1,3) - b(3,3)*b(1,6)}, {{{3,6},6},b(3,6)*b(2,3) - b(3,3)*b(2,6)}, {{{4,5},1},0}, {{{4,5},2},0}, {{{4,5},3},0}, {{{4,5},4},b(2,5)*b(1,4) - b(2,4)*b(1,5)}, {{{4,5},5},b(3,5)*b(1,4) - b(3,4)*b(1,5)}, {{{4,5},6},b(3,5)*b(2,4) - b(3,4)*b(2,5)}, {{{4,6},1},0}, {{{4,6},2},0}, {{{4,6},3},0}, {{{4,6},4},b(2,6)*b(1,4) - b(2,4)*b(1,6)}, {{{4,6},5},b(3,6)*b(1,4) - b(3,4)*b(1,6)}, {{{4,6},6},b(3,6)*b(2,4) - b(3,4)*b(2,6)}, {{{5,6},1},0}, {{{5,6},2},0}, {{{5,6},3},0}, {{{5,6},4},b(2,6)*b(1,5) - b(2,5)*b(1,6)}, {{{5,6},5},b(3,6)*b(1,5) - b(3,5)*b(1,6)}, {{{5,6},6},b(3,6)*b(2,5) - b(3,5)*b(2,6)}}$ on resout l'equation {{1,2},1} qui est maintenant AA:= - b(1,4)$ Unknown: b(1,4) Unknown: b(1,4) bonne inconnue W:=b(1,4)$ sa valeur doit etre WW:=0$ on resout l'equation {{1,2},2} qui est maintenant AA:= - b(2,4)$ Unknown: b(2,4) Unknown: b(2,4) bonne inconnue W:=b(2,4)$ sa valeur doit etre WW:=0$ on resout l'equation {{1,2},3} qui est maintenant AA:= - b(3,4)$ Unknown: b(3,4) Unknown: b(3,4) bonne inconnue W:=b(3,4)$ sa valeur doit etre WW:=0$ on resout l'equation {{1,2},4} qui est maintenant AA:= - b(4,4) + b(2,2)*b(1,1) - b(2,1)*b(1,2)$ Unknowns: {b(4,4),b(2,2),b(2,1),b(1,2),b(1,1)} Unknowns: {b(4,4),b(2,2),b(2,1),b(1,2),b(1,1)} bonne inconnue W:=b(4,4)$ sa valeur doit etre WW:=b(2,2)*b(1,1) - b(2,1)*b(1,2)$ on resout l'equation {{1,2},5} qui est maintenant AA:= - b(5,4) + b(3,2)*b(1,1) - b(3,1)*b(1,2)$ Unknowns: {b(5,4),b(3,2),b(3,1),b(1,2),b(1,1)} Unknowns: {b(5,4),b(3,2),b(3,1),b(1,2),b(1,1)} bonne inconnue W:=b(5,4)$ sa valeur doit etre WW:=b(3,2)*b(1,1) - b(3,1)*b(1,2)$ on resout l'equation {{1,2},6} qui est maintenant AA:= - b(6,4) + b(3,2)*b(2,1) - b(3,1)*b(2,2)$ Unknowns: {b(6,4),b(3,2),b(3,1),b(2,2),b(2,1)} Unknowns: {b(6,4),b(3,2),b(3,1),b(2,2),b(2,1)} bonne inconnue W:=b(6,4)$ sa valeur doit etre WW:=b(3,2)*b(2,1) - b(3,1)*b(2,2)$ on resout l'equation {{1,3},1} qui est maintenant AA:= - b(1,5)$ Unknown: b(1,5) Unknown: b(1,5) bonne inconnue W:=b(1,5)$ sa valeur doit etre WW:=0$ on resout l'equation {{1,3},2} qui est maintenant AA:= - b(2,5)$ Unknown: b(2,5) Unknown: b(2,5) bonne inconnue W:=b(2,5)$ sa valeur doit etre WW:=0$ on resout l'equation {{1,3},3} qui est maintenant AA:= - b(3,5)$ Unknown: b(3,5) Unknown: b(3,5) bonne inconnue W:=b(3,5)$ sa valeur doit etre WW:=0$ on resout l'equation {{1,3},4} qui est maintenant AA:= - b(4,5) + b(2,3)*b(1,1) - b(2,1)*b(1,3)$ Unknowns: {b(4,5),b(2,3),b(2,1),b(1,3),b(1,1)} Unknowns: {b(4,5),b(2,3),b(2,1),b(1,3),b(1,1)} bonne inconnue W:=b(4,5)$ sa valeur doit etre WW:=b(2,3)*b(1,1) - b(2,1)*b(1,3)$ on resout l'equation {{1,3},5} qui est maintenant AA:= - b(5,5) + b(3,3)*b(1,1) - b(3,1)*b(1,3)$ Unknowns: {b(5,5),b(3,3),b(3,1),b(1,3),b(1,1)} Unknowns: {b(5,5),b(3,3),b(3,1),b(1,3),b(1,1)} bonne inconnue W:=b(5,5)$ sa valeur doit etre WW:=b(3,3)*b(1,1) - b(3,1)*b(1,3)$ on resout l'equation {{1,3},6} qui est maintenant AA:= - b(6,5) + b(3,3)*b(2,1) - b(3,1)*b(2,3)$ Unknowns: {b(6,5),b(3,3),b(3,1),b(2,3),b(2,1)} Unknowns: {b(6,5),b(3,3),b(3,1),b(2,3),b(2,1)} bonne inconnue W:=b(6,5)$ sa valeur doit etre WW:=b(3,3)*b(2,1) - b(3,1)*b(2,3)$ on resout l'equation {{1,6},4} qui est maintenant AA:=b(2,6)*b(1,1) - b(2,1)*b( 1,6)$ Unknowns: {b(2,6),b(2,1),b(1,6),b(1,1)} Unknowns: {b(2,6),b(2,1),b(1,6),b(1,1)} pas! de! selection! possible! de! variable! a! coefficient! independant! des! in connues! \ dans! b(2,6)*b(1,1) - b(2,1)*b(1,6) on resout l'equation {{1,6},5} qui est maintenant AA:=b(3,6)*b(1,1) - b(3,1)*b( 1,6)$ Unknowns: {b(3,6),b(3,1),b(1,6),b(1,1)} Unknowns: {b(3,6),b(3,1),b(1,6),b(1,1)} pas! de! selection! possible! de! variable! a! coefficient! independant! des! in connues! \ dans! b(3,6)*b(1,1) - b(3,1)*b(1,6) on resout l'equation {{1,6},6} qui est maintenant AA:=b(3,6)*b(2,1) - b(3,1)*b( 2,6)$ Unknowns: {b(3,6),b(3,1),b(2,6),b(2,1)} Unknowns: {b(3,6),b(3,1),b(2,6),b(2,1)} pas! de! selection! possible! de! variable! a! coefficient! independant! des! in connues! \ dans! b(3,6)*b(2,1) - b(3,1)*b(2,6) on resout l'equation {{2,3},1} qui est maintenant AA:= - b(1,6)$ Unknown: b(1,6) Unknown: b(1,6) bonne inconnue W:=b(1,6)$ sa valeur doit etre WW:=0$ on resout l'equation {{2,3},2} qui est maintenant AA:= - b(2,6)$ Unknown: b(2,6) Unknown: b(2,6) bonne inconnue W:=b(2,6)$ sa valeur doit etre WW:=0$ on resout l'equation {{2,3},3} qui est maintenant AA:= - b(3,6)$ Unknown: b(3,6) Unknown: b(3,6) bonne inconnue W:=b(3,6)$ sa valeur doit etre WW:=0$ on resout l'equation {{2,3},4} qui est maintenant AA:= - b(4,6) + b(2,3)*b(1,2) - b(2,2)*b(1,3)$ Unknowns: {b(4,6),b(2,3),b(2,2),b(1,3),b(1,2)} Unknowns: {b(4,6),b(2,3),b(2,2),b(1,3),b(1,2)} bonne inconnue W:=b(4,6)$ sa valeur doit etre WW:=b(2,3)*b(1,2) - b(2,2)*b(1,3)$ on resout l'equation {{2,3},5} qui est maintenant AA:= - b(5,6) + b(3,3)*b(1,2) - b(3,2)*b(1,3)$ Unknowns: {b(5,6),b(3,3),b(3,2),b(1,3),b(1,2)} Unknowns: {b(5,6),b(3,3),b(3,2),b(1,3),b(1,2)} bonne inconnue W:=b(5,6)$ sa valeur doit etre WW:=b(3,3)*b(1,2) - b(3,2)*b(1,3)$ on resout l'equation {{2,3},6} qui est maintenant AA:= - b(6,6) + b(3,3)*b(2,2) - b(3,2)*b(2,3)$ Unknowns: {b(6,6),b(3,3),b(3,2),b(2,3),b(2,2)} Unknowns: {b(6,6),b(3,3),b(3,2),b(2,3),b(2,2)} bonne inconnue W:=b(6,6)$ sa valeur doit etre WW:=b(3,3)*b(2,2) - b(3,2)*b(2,3)$ Automorphism equations to cancel (Reduce output) : \\{{{{1,2},1},0}, {{{1,2},2},0}, {{{1,2},3},0}, {{{1,2},4},0}, {{{1,2},5},0}, {{{1,2},6},0}, {{{1,3},1},0}, {{{1,3},2},0}, {{{1,3},3},0}, {{{1,3},4},0}, {{{1,3},5},0}, {{{1,3},6},0}, {{{1,4},1},0}, {{{1,4},2},0}, {{{1,4},3},0}, {{{1,4},4},0}, {{{1,4},5},0}, {{{1,4},6},0}, {{{1,5},1},0}, {{{1,5},2},0}, {{{1,5},3},0}, {{{1,5},4},0}, {{{1,5},5},0}, {{{1,5},6},0}, {{{1,6},1},0}, {{{1,6},2},0}, {{{1,6},3},0}, {{{1,6},4},0}, {{{1,6},5},0}, {{{1,6},6},0}, {{{2,3},1},0}, {{{2,3},2},0}, {{{2,3},3},0}, {{{2,3},4},0}, {{{2,3},5},0}, {{{2,3},6},0}, {{{2,4},1},0}, {{{2,4},2},0}, {{{2,4},3},0}, {{{2,4},4},0}, {{{2,4},5},0}, {{{2,4},6},0}, {{{2,5},1},0}, {{{2,5},2},0}, {{{2,5},3},0}, {{{2,5},4},0}, {{{2,5},5},0}, {{{2,5},6},0}, {{{2,6},1},0}, {{{2,6},2},0}, {{{2,6},3},0}, {{{2,6},4},0}, {{{2,6},5},0}, {{{2,6},6},0}, {{{3,4},1},0}, {{{3,4},2},0}, {{{3,4},3},0}, {{{3,4},4},0}, {{{3,4},5},0}, {{{3,4},6},0}, {{{3,5},1},0}, {{{3,5},2},0}, {{{3,5},3},0}, {{{3,5},4},0}, {{{3,5},5},0}, {{{3,5},6},0}, {{{3,6},1},0}, {{{3,6},2},0}, {{{3,6},3},0}, {{{3,6},4},0}, {{{3,6},5},0}, {{{3,6},6},0}, {{{4,5},1},0}, {{{4,5},2},0}, {{{4,5},3},0}, {{{4,5},4},0}, {{{4,5},5},0}, {{{4,5},6},0}, {{{4,6},1},0}, {{{4,6},2},0}, {{{4,6},3},0}, {{{4,6},4},0}, {{{4,6},5},0}, {{{4,6},6},0}, {{{5,6},1},0}, {{{5,6},2},0}, {{{5,6},3},0}, {{{5,6},4},0}, {{{5,6},5},0}, {{{5,6},6},0}}$ resultats finaux$ collect_eq:={{{{1,2},1},0}, {{{1,2},2},0}, {{{1,2},3},0}, {{{1,2},4},0}, {{{1,2},5},0}, {{{1,2},6},0}, {{{1,3},1},0}, {{{1,3},2},0}, {{{1,3},3},0}, {{{1,3},4},0}, {{{1,3},5},0}, {{{1,3},6},0}, {{{1,4},1},0}, {{{1,4},2},0}, {{{1,4},3},0}, {{{1,4},4},0}, {{{1,4},5},0}, {{{1,4},6},0}, {{{1,5},1},0}, {{{1,5},2},0}, {{{1,5},3},0}, {{{1,5},4},0}, {{{1,5},5},0}, {{{1,5},6},0}, {{{1,6},1},0}, {{{1,6},2},0}, {{{1,6},3},0}, {{{1,6},4},0}, {{{1,6},5},0}, {{{1,6},6},0}, {{{2,3},1},0}, {{{2,3},2},0}, {{{2,3},3},0}, {{{2,3},4},0}, {{{2,3},5},0}, {{{2,3},6},0}, {{{2,4},1},0}, {{{2,4},2},0}, {{{2,4},3},0}, {{{2,4},4},0}, {{{2,4},5},0}, {{{2,4},6},0}, {{{2,5},1},0}, {{{2,5},2},0}, {{{2,5},3},0}, {{{2,5},4},0}, {{{2,5},5},0}, {{{2,5},6},0}, {{{2,6},1},0}, {{{2,6},2},0}, {{{2,6},3},0}, {{{2,6},4},0}, {{{2,6},5},0}, {{{2,6},6},0}, {{{3,4},1},0}, {{{3,4},2},0}, {{{3,4},3},0}, {{{3,4},4},0}, {{{3,4},5},0}, {{{3,4},6},0}, {{{3,5},1},0}, {{{3,5},2},0}, {{{3,5},3},0}, {{{3,5},4},0}, {{{3,5},5},0}, {{{3,5},6},0}, {{{3,6},1},0}, {{{3,6},2},0}, {{{3,6},3},0}, {{{3,6},4},0}, {{{3,6},5},0}, {{{3,6},6},0}, {{{4,5},1},0}, {{{4,5},2},0}, {{{4,5},3},0}, {{{4,5},4},0}, {{{4,5},5},0}, {{{4,5},6},0}, {{{4,6},1},0}, {{{4,6},2},0}, {{{4,6},3},0}, {{{4,6},4},0}, {{{4,6},5},0}, {{{4,6},6},0}, {{{5,6},1},0}, {{{5,6},2},0}, {{{5,6},3},0}, {{{5,6},4},0}, {{{5,6},5},0}, {{{5,6},6},0}}$ isom:= mat((b(1,1),b(1,2),b(1,3),0,0,0),(b(2,1),b(2,2),b(2,3),0,0,0),(b(3,1),b(3,2),b(3 ,3),0,0,0),(b(4,1),b(4,2),b(4,3),b(2,2)*b(1,1) - b(2,1)*b(1,2),b(2,3)*b(1,1) - b (2,1)*b(1,3),b(2,3)*b(1,2) - b(2,2)*b(1,3)),(b(5,1),b(5,2),b(5,3),b(3,2)*b(1,1) - b(3,1)*b(1,2),b(3,3)*b(1,1) - b(3,1)*b(1,3),b(3,3)*b(1,2) - b(3,2)*b(1,3)),(b( 6,1),b(6,2),b(6,3),b(3,2)*b(2,1) - b(3,1)*b(2,2),b(3,3)*b(2,1) - b(3,1)*b(2,3),b (3,3)*b(2,2) - b(3,2)*b(2,3)))$ $ det(isom):=(b(3,3)*b(2,2)*b(1,1) - b(3,3)*b(2,1)*b(1,2) - b(3,2)*b(2,3)*b(1,1) + b(3,2)*b(2,1)*b(1,3) + b(3,1)*b(2,3)*b(1,2) - b(3,1)*b(2,2)*b(1,3))**3$ phase2:$ {{{{1,2},1},0}, {{{1,2},2},0}, {{{1,2},3},0}, {{{1,2},4},0}, {{{1,2},5},0}, {{{1,2},6},0}, {{{1,3},1},0}, {{{1,3},2},0}, {{{1,3},3},0}, {{{1,3},4},0}, {{{1,3},5},0}, {{{1,3},6},0}, {{{1,4},1},0}, {{{1,4},2},0}, {{{1,4},3},0}, {{{1,4},4},0}, {{{1,4},5},0}, {{{1,4},6},0}, {{{1,5},1},0}, {{{1,5},2},0}, {{{1,5},3},0}, {{{1,5},4},0}, {{{1,5},5},0}, {{{1,5},6},0}, {{{1,6},1},0}, {{{1,6},2},0}, {{{1,6},3},0}, {{{1,6},4},0}, {{{1,6},5},0}, {{{1,6},6},0}, {{{2,3},1},0}, {{{2,3},2},0}, {{{2,3},3},0}, {{{2,3},4},0}, {{{2,3},5},0}, {{{2,3},6},0}, {{{2,4},1},0}, {{{2,4},2},0}, {{{2,4},3},0}, {{{2,4},4},0}, {{{2,4},5},0}, {{{2,4},6},0}, {{{2,5},1},0}, {{{2,5},2},0}, {{{2,5},3},0}, {{{2,5},4},0}, {{{2,5},5},0}, {{{2,5},6},0}, {{{2,6},1},0}, {{{2,6},2},0}, {{{2,6},3},0}, {{{2,6},4},0}, {{{2,6},5},0}, {{{2,6},6},0}, {{{3,4},1},0}, {{{3,4},2},0}, {{{3,4},3},0}, {{{3,4},4},0}, {{{3,4},5},0}, {{{3,4},6},0}, {{{3,5},1},0}, {{{3,5},2},0}, {{{3,5},3},0}, {{{3,5},4},0}, {{{3,5},5},0}, {{{3,5},6},0}, {{{3,6},1},0}, {{{3,6},2},0}, {{{3,6},3},0}, {{{3,6},4},0}, {{{3,6},5},0}, {{{3,6},6},0}, {{{4,5},1},0}, {{{4,5},2},0}, {{{4,5},3},0}, {{{4,5},4},0}, {{{4,5},5},0}, {{{4,5},6},0}, {{{4,6},1},0}, {{{4,6},2},0}, {{{4,6},3},0}, {{{4,6},4},0}, {{{4,6},5},0}, {{{4,6},6},0}, {{{5,6},1},0}, {{{5,6},2},0}, {{{5,6},3},0}, {{{5,6},4},0}, {{{5,6},5},0}, {{{5,6},6},0}}$ isom:= mat((b(1,1),b(1,2),b(1,3),0,0,0),(b(2,1),b(2,2),b(2,3),0,0,0),(b(3,1),b(3,2),b(3 ,3),0,0,0),(b(4,1),b(4,2),b(4,3),b(2,2)*b(1,1) - b(2,1)*b(1,2),b(2,3)*b(1,1) - b (2,1)*b(1,3),b(2,3)*b(1,2) - b(2,2)*b(1,3)),(b(5,1),b(5,2),b(5,3),b(3,2)*b(1,1) - b(3,1)*b(1,2),b(3,3)*b(1,1) - b(3,1)*b(1,3),b(3,3)*b(1,2) - b(3,2)*b(1,3)),(b( 6,1),b(6,2),b(6,3),b(3,2)*b(2,1) - b(3,1)*b(2,2),b(3,3)*b(2,1) - b(3,1)*b(2,3),b (3,3)*b(2,2) - b(3,2)*b(2,3)))$ $ det(isom):=(b(3,3)*b(2,2)*b(1,1) - b(3,3)*b(2,1)*b(1,2) - b(3,2)*b(2,3)*b(1,1) + b(3,2)*b(2,1)*b(1,3) + b(3,1)*b(2,3)*b(1,2) - b(3,1)*b(2,2)*b(1,3))**3$ isom:= mat((b(1,1),b(1,2),b(1,3),0,0,0), (b(2,1),b(2,2),b(2,3),0,0,0), (b(3,1),b(3,2),b(3,3),0,0,0), (b(4,1),b(4,2),b(4,3), b(2,2)*b(1,1) - b(2,1)*b(1,2), b(2,3)*b(1,1) - b(2,1)*b(1,3), b(2,3)*b(1,2) - b(2,2)*b(1,3)), (b(5,1),b(5,2),b(5,3), b(3,2)*b(1,1) - b(3,1)*b(1,2), b(3,3)*b(1,1) - b(3,1)*b(1,3), b(3,3)*b(1,2) - b(3,2)*b(1,3)), (b(6,1),b(6,2),b(6,3), b(3,2)*b(2,1) - b(3,1)*b(2,2), b(3,3)*b(2,1) - b(3,1)*b(2,3), b(3,3)*b(2,2) - b(3,2)*b(2,3)))