You have successfully shown that h^1(O_X(D))=1, i.e., that h^0(\mathcal O_X(K-D)) = 1. Now try Riemann-Roch again: h^0(\mathcal O_X(K-D))-h^1(\mathcal O_X(K-D))=\deg(K-D)+1-g, and using that h^1(\mathcal O_X(K-D))=h^0(\mathcal O_X(D)) ...

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.

Given: A_a:= \left(\begin{array}{c} 2 & a+1 & 0 \\ -a & -3a & -a \\ a & 3a+2 & a+2 \end{array}\right) We find the eigenvalues using |A_a - \lambda I| = 0, yielding: -a^2 \lambda +2 a^2-2 a \lambda ^2+7 a \lambda -6 a-\lambda ^3+4 \lambda ^2-4 \lambda = 0 \implies (\lambda-2)(\lambda - (1-a-\sqrt{a+1}))(\lambda - (1-a+\sqrt{a+1}))=0 ...

HInt for (c), since a \neq 0. Consider the case a>0 and a<0. Assume a \in \mathbb{R}. If a<0, then we have: \lambda_1 = -1, \lambda_2 = a<0 \Rightarrow \text{ stable node} If a>0, then ...

If that matrix B were correct, you would have only one solution. Since you started with a square matrix of coefficients (3 by 3, not counting the ones to the right of the equals sign), The ...

You can view A=\left(\begin{array}{rrrr} 1 & 6 & 2 & -4 \\ -3 & 2 & -2 & -8 \\ 4 & -1 & 3 & 9 \end{array}\right) As an augmented matrix A\vec{x}=\vec{y}, with \vec{y}={(-4,-8,9)}^T. The the row ...