Let v_1 be the eigenvector you found. We need to solve the equation (A-\lambda I)v_2=v_1 to get a second vector(which is not an eigenvector). Here A is your matrix and \lambda your eigenvalue. ...

Without using the condition m\ddot{x}+m\ddot{y}+m\ddot{z}=0, just write your 3D system as k\left[ \begin {array}{ccc} -1&1&0\\1&-3&2 \\ 0&2&-2\end {array} \right] \left[ \begin {array}{c} x\\y\\z\end {array} \right]=m\left[ \begin {array}{c} \ddot{x}\\\ddot{y}\\\ddot{z}\end {array} \right] ...

You are right, the grammar is of type 3. Your definition though seems flawed. If you allow the terminals to appear on both sides (though in different productions) of the non-terminal, then the type of ...

We are given: x'=\left( \begin{array}{ccc} \frac{-1}{2} & 1 \\ -1 & \frac{-1}{2} \end{array} \right)x To find the characteristic polynomial, we solve: |A - \lambda I| = 0 So, for your ...

2x+3y=1\to y=\frac13-\frac23x so the gradient of the line is -\frac23, which you got. The gradient of the perpendicular line is \frac{-1}{(-\frac23)}=\frac32 Thus the line is of the form: y=\frac32x+k ...

You can try some post-processing after calculating of x: compute the null space of E, then solve \min \|x + v \| subject to Ev=0 and x+v\ge 0.