The given matrix is \displaystyle{1}\times{4} Explanation: The order, or dimension, of a matrix is the number of rows and columns that a matrix has. By convention, rows are listed first; and ...

5 vectors, none of which are scalar multiples of any of the others, in a 4 dimensional space.

Method 1. The reason you got a plane instead of a line is that when you took the two equations and set them equal to each other, you added a whole bunch of solutions. Why? Because while it is ...

Your cross product is incorrect. \begin{pmatrix} 1 \\ -1 \\ 3\end{pmatrix} \times \begin{pmatrix} -5 \\ 12 \\ -1\end{pmatrix} = \begin{pmatrix} (-1) \times (-1) - 12 \times 3 \\ 3 \times (-5) - 1 \times (-1) \\ 1 \times 12 - (-1) \times (-5)\end{pmatrix} = \begin{pmatrix} -35 \\ -14 \\ 7\end{pmatrix} = 7 \begin{pmatrix} -5 \\ -2 \\ 1\end{pmatrix} ...

For the first half: Not quite, but it's pretty close. You still need to distribute the scalars and recombine everything: \alpha_1[x_1+x_3]_B + \alpha_2[x_2+x_3]_B + \alpha_3[x_3]_B = 0 \\ [\alpha_1x_1+\alpha_1x_3]_B + [\alpha_2x_2+\alpha_2x_3]_B + [\alpha_3x_3]_B = 0 \\ [\alpha_1x_1+\alpha_1x_3 + \alpha_2x_2+\alpha_2x_3 + \alpha_3x_3]_B = 0 \\ [\alpha_1x_1 + \alpha_2x_2 + (\alpha_1 +\alpha_2 + \alpha_3)x_3]_B = 0 \\ \alpha_1[x_1]_B + \alpha_2[x_2]_B + (\alpha_1 +\alpha_2 + \alpha_3)[x_3]_B = 0 \\ ...

The following method works for every n, in the generic case (in particular when the eigenvalues are distinct). Let B=\begin{pmatrix}8575122907& 15665166770& 8425175847\\-3269081855& -5440457177& -3501145058\\11198886644& 19451961947& 10727299263\end{pmatrix} ...