Introduction

A Radon Transform is an integral that allows the calculation of the projections of an object as it is scanned. Since the scanner rotates as it takes data, the projections will have to be calculated at various angles. Thus coordinate rotation is an essential topic for tomographic reconstruction because it allows the calculation of the Radon Transform.

Coordinate Rotation

To accommodate the multitude of angles that scans will we taken at, we will introduce a new coordinate system to work with, $$ (r,z) $$ . The relationship between $$ (x,y) $$ and $$ (r,z) $$ is shown below. The $$ (r,z) $$ axes are rotated counterclockwise by $\theta$ relative to the $$ (x,y) $$ axes. The geometric meaning of $$ (r,z) $$ is shown in Figure 1.
$\begin{bmatrix} x \\ y \end{bmatrix} = \mathbf{A_{\theta}}\begin{bmatrix} r \\ z \end{bmatrix}$
Where $A_\theta$ is the counterclockwise rotation matrix
$\mathbf{A_{\theta}}=\begin{bmatrix} \cos(\theta) & -\sin(\theta) \\ \sin(\theta) & \cos(\theta) \end{bmatrix}$