convert 3D plane to 2D plane

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Katharina Heitger
Katharina Heitger on 1 Oct 2021
Commented: Katharina Heitger on 19 Nov 2021
My Problem/My aim:
I have a plane in 3D, described in the form ax+by+cz=0. The equation was formed with the edge points of the plane, which I know as well. This plane is tilted, so that the z-coordinates are not always the same. Now I want to convert this 3D plane into a 2D plane, so that I can take its points as an input for fitgeotrans().
What I have done:
I tried a projection from the edge points, however the resulting points are too close together, which leads me to the thought, that this is not the right method for me. The calculation was similar to x/z and y/z.
In my research I have not found any matlab functions, which will do the trick. (maybe there is one and I haven't found it.)
I found this post: https://de.mathworks.com/matlabcentral/answers/81694-rotate-3d-plane-to-a-new-2d-coordinate-system , but honestly I do not have an axis around which I rotate the plane.
However I found this answered question, which coul be useful to me, but I am irritated by the naming and repetition of the variables.
https://stackoverflow.com/questions/23814234/convert-3d-plane-to-2d
Now my question is: Is there any matlab function I have overseen? Does someone know this method mentioned in the line before or has someone a differenet approach?
Any answers are deeply appreciated.

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Accepted Answer

Matt J
Matt J on 1 Oct 2021
One possible projection is,
[x2;y2]=null([a,b,c]).'*[x3;y3;z3]
However, the mapping you are looking for is non-unique. There are infinite 2D bases for a 3D plane.
  2 Comments
Katharina Heitger
Katharina Heitger on 1 Oct 2021
Thank you! That works fine!
Katharina Heitger
Katharina Heitger on 19 Nov 2021
As I overthink my code once again, I looked over this line of code and wanted to understand it a bit more.
So essentially, what this code does is first calculate the null space (although Matlab has 2 doumentation with this syntax, one which states "Z = null(A) returns an orthonormal basis for the null space of A." and one which states "Z = null(A) returns a list of vectors that form the basis for the null space of a matrix A. The product A*Z is zero. size(Z, 2) is the nullity of A. If A has full rank, Z is empty.")
Then it transposes this nullspace and multiplies it with the 3D-Point I wnat in 2D.
Did I understand this right?

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