Let c be the common root. Then c^2+ac+b=0 c^2+bc+a=0 so ac+b=bc+a or (a-b)c=a-b. Since a\neq b, c must be 1. Now we have a+b=-1.

No, every matrix X satisfying XB-BX=X^2 must be nilpotent, i.e., cannot be invertible. See Proposition 2.2 in the paper On the matrix equation XA-AX=X^p .

This is the smallest generalized eigenvalue of the pair (A,B). In MATLAB, you would compute it as min(eig(A,B))

Not to worry, you've explained your question fine. However, your lack of familiarity with vectors is probably making this a lot more complicated than it could be. Anyway, to get to the point: the ...

You did everything right except you need to go one more step: a,b,c,d are ordinary numbers and they commute multiplicatively, and they commute with i as well. So bibi = b^2i^2 = -b^2 and a^2 - bibi + c^2 -didi = a^2+b^2+c^2+d^2 = t

Each match that ends in a draw awards 2 points. Each match that doesn't end in a draw awards 3 points. Thus the total number of points is p=2d+3(n-d)=3n-d, where n is the number of matches ...