# Simple way to solve a system of linear equations in Matlab?

I'm looking for an easy and fast solution to the following problem: I have three 3D vectors `x_i`, three 3D vectors `y_i`, a 3D vector `b` and a 3x3 matrix A with coefficients a11 - a33 (that are unknown).

The relation is as follows:

``````x_i = A * y_i + b
``````

That resolves to

``````x_i_1 = ( a11 * y_1_1 + a12 * y_2_1 + a13 * y_3_1 ) + b_1
``````

etc.

So there are 9 equations and 9 unknown variables a11 - a33, easy peasy math. But how do I solve this system using build in Matlab functions?

-

If you know the 9 equations and 9 unknowns, then just pretend like the 9 unknowns live in a column vector called `r`, and write the rows of a 9x9 matrix called `C` to store the coefficients. If the left-hand side of the 9 equations is also stored in a column vector `x` then you'll be solving something like

``````Cr = x
``````

And this is simply done in Matlab with

``````r = C\x;
``````

Now `r` stores the solution for the 9 unknowns (assuming that solutions exist, etc.)

-
This is pretty much what I was looking for, thanks. So in my case C contains a lot of zeros, or am I missing something? – Niko Apr 17 '12 at 20:39
Yes, each row only has 3 non-zero entries it appears. Also, you may need to solve for `x_i_j - b_j = ...` with that subtraction on the left hand side. Then add back the `b_j` after solving to recover the solution vector, since the `b_j` don't apply to the `a_ik` coefficients, does that make sense? – Mr. F Apr 17 '12 at 20:58
Yes, C will be mostly filled with zeros. – John Apr 17 '12 at 20:59
Note the matrix left divide operator `C\x` is preferred over `inv(C) * x` because it's never a good idea to actually calculate the inverse matrix.. – Li-aung Yip Apr 18 '12 at 2:24
@Li-aungYip Can you provide me with more information about that? I read the article but it seems to be written for people that already know why it's actually a bad idea to calculate inverse matrixes - my knowledge about numerical math is fairly basic, but I'm currently working with a lot of transformation matrixes, and my equations do often include inverse matrixes (4x4). – Niko Apr 19 '12 at 9:54