\displaystyle{\left({I}\right)}:\vec{{{P}{Q}}}={\left(\begin{array}{c} {8}\\{0}\end{array}\right)}. \displaystyle{\left({I}{I}\right)}:\vec{{{T}{Q}}}={\left(\begin{array}{c} \frac{{55}}{{8}}\\-\frac{{3}}{{4}}\end{array}\right)}. ...

These three linear vectors are independent iff the determinant of the matrix built with them is non zero. Hence we study \det \begin{pmatrix}1&4&2\\2&5&6t-1\\1&2&7t\end{pmatrix} = -9t-4. This ...

I found the answer in another lecture. This answers how seperate exponentials can combine for an overall solution. If we use u = Sv where S is eigenvector matrix and v carries constants to ...

The first calculation is the correct one. To convince you of this, you can take your attempts and try to apply the same formula to smaller examples. Briefly take a look at the related question of ...

As you put it you should have made column operations. I propose to change the matrix and still make row operations: \begin{pmatrix}1&3&\!\!-1\\ \!\!-5&\!\!-8&2\\3&\!\!-5&h\end{pmatrix}\rightarrow\begin{pmatrix}1&3&\!\!-1\\ 0&7&\!\!-3\\0&\!\!-14&h+3\end{pmatrix}\stackrel{R_3+2R_2}\rightarrow\begin{pmatrix}1&3&\!\!-1\\ 0&7&\!\!-3\\0&0&h-3\end{pmatrix}

From lulu's hint \sum_{a=a_{min}}^{a_{max}}{n\choose a}\cdot{r\choose k-a}r^{k-a}, which a_{max} and a_{min} depends on a \le\min(n,k) and (k-a)\le r, or combined as \max(k-r,0)\le a\le\min(n,k) ...