See answer below for details: \displaystyle{A}^{{-{{1}}}}={\left[\begin{array}{ccc} \frac{{1}}{{2}}&-{1}&\frac{{1}}{{2}}\\-\frac{{5}}{{2}}&{4}&-\frac{{3}}{{2}}\\{3}&-{3}&{1}\end{array}\right]} \displaystyle\vec{{b}}={\left[\begin{array}{c} {1}\\{2}+{d}\\{3}+{3}{d}\end{array}\right]} ...

Social Security: 43.00\displaystyle{M}{e}{d}{i}{c}{a}{r}{e}: \displaystyle{10.00} Explanation: The "earnings to date" are irrelevant to the problem. Thee question asks for a percentage of ...

The answer is \displaystyle={\left(\begin{array}{cc} {72}&{38}\\{65}&{112}\end{array}\right)} Explanation: The matrix multiplication is \displaystyle{\left(\begin{array}{ccc} {a}&{b}&{c}\\{d}&{e}&{f}\end{array}\right)}.{\left(\begin{array}{cc} {l}&{m}\\{n}&{p}\\{q}&{r}\end{array}\right)} ...

It certainly means that what's on the left of ":" is the first column of the matrix that results from the product, and what's on the right is the second column.

This is an expansion of Arturo's comment. The matrix has eigenvalues 50,25, and eigenvectors (4,3),(-3,4), so it eigendecomposes to A=\begin{pmatrix}4 & -3 \\ 3 & 4\end{pmatrix} \begin{pmatrix}50 & 0 \\ 0 & 25\end{pmatrix} \begin{pmatrix}4 & -3 \\ 3 & 4\end{pmatrix}^{-1}. ...

You're not being asked about the kernel of A or the kernel of \phi(A), but about the kernel of \phi itself, where \mathbb Q^{2\times 2} is viewed as just a plain old 4-dimensional vector ...