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?

closed as off-topic by Makyen, Dan Neely, Rob, greg-449, Luuklag Jul 20 at 9:59

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You set V0 = np.array([Vx,Vy,Vz]) for the old basis, V1 = np.array([Vx1,Vy1,Vz1]) for the new basis, where the basis vectors are the matrix rows and have the relation for the transposed matrices where the basis vectors are the columns

M * V0.T = V1.T  <==>  V0 * M.T = V1 

This can be nicely solved as

M = np.linalg.solve(V0,V1).T 

Actually it's pretty easy.

Matrix A is

    |Vx 000 000|
    |000 Vx 000|
A = |000 000 Vx|
    |Vy 000 000|
    |000 Vy 000|

considering Vx in this notation is 3 scalars Vx1, Vx2, Vx2 (x,y,z components of Vx), so matrix is 9x9.

b is vertically stacked column-vectors from V' components

b = |Vy'|

Here is final solution with Python/numpy:

import numpy as np
def solve_3vector_equation(v1, v2, v3, v1_, v2_, v3_):
    Solves linear equation system:
        M * v1 = v1_
        M * v2 = v2_
        M * v3 = v3_

    Where M is 3x3 matrix, v... - 3d vectors

    A = np.zeros((9, 9))

    vs = [v1, v2, v3]
    vs_ = [v1_, v2_, v3_]

    for i in range(3):
        for j in range(3):
            A[i * 3 + j, j * 3:(j + 1) * 3] = vs[i]

    b = np.hstack(vs_)

    return np.linalg.solve(A, b).reshape((3, 3))

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