\begin{align} \newcommand\qmat[4]{\left(\begin{array}{cc}{#1}&{#2}\\{#3}&{#4}\end{array}\right)}\qmat xuvy^2&=\qmat{x^2+uv}{u(x+y)}{v(x+y)}{uv+y^2}\\ \qmat ...

See explanation... Explanation: Note that: \displaystyle{\left(\begin{array}{cc} {2}&-{1}\\{3}&-{2}\end{array}\right)}^{{2}}={\left(\begin{array}{cc} {2}&-{1}\\{3}&-{2}\end{array}\right)}{\left(\begin{array}{cc} {2}&-{1}\\{3}&-{2}\end{array}\right)}={\left(\begin{array}{cc} {1}&{0}\\{0}&{1}\end{array}\right)} ...

I found: \displaystyle{x}={\left(\begin{array}{c} {x}_{{1}}\\{x}_{{2}}\end{array}\right)}={\left(\begin{array}{c} {1}\\{0}\end{array}\right)} Explanation: As in a normal equation we can multiply ...

find it's eigenvalues using |\lambda I -A| = 0 equation, you must find them a and -a. Hint: \lambda^2-a^2 = (\lambda-a)(\lambda+a) find their corresponding eigenvectors e_1 and e_2, using ...

\left[ \begin{array}{cc} a & b \\ \end{array} \right] \left[ \begin{array}{c} x\\ y \end{array} \right] = \left[ \begin{array}{cc} x & y \\ \end{array} \right] \left[ \begin{array}{c} a\\ b \end{array} \right] ...

The short answer: You do essentially the same thing as before, but in reverse. You take the matrix whose rows are your covectors, take the inverse, and take columns of the resulting matrix will be ...