We have basis in 3d, `Vx`

= (1,0,0), `Vy`

= (0,1,0), `Vz`

=(0,0,1), which is transforming by (rotation) matrix M to `Vx'`

, `Vy'`

, `Vz'`

respectively. So we have 3 equations:

```
M * Vx = Vx'
M * Vy = Vy'
M * Vz = Vz'
```

Thus we have 9 linear equations for 9 components of matrix M.
Now I need to transform this equation in form `A * m = b`

(to solve it with numpy i.e.), where m is column-vectors of unknown `M`

components like `[m11, m12, m13, m21, ...]`

, `A`

is coefficients matrix, `b`

is coefficients column-vector.

So the question is, what are formulas for `A`

and `b`

? Is it possible to write some matrix formulas for it? Or, is there any tool which will help to write per-component formulas?