What am I looking at? Each Bi-Radial matrix starts off with two sets of intersecting equi-spaced rays, an example is shown to the left. This interference pattern creates a set of intersection points which are high lighted.
The intersection points called nodes can be assigned a pair of numbers based on the rays from each pole which formed it. The ray numbering is described else where on this site
The nodes can be interconnected in a variety of ways. Here the lines define the shortest available path from pole A to pole B passing through the nodes. The result is the characteristic magnetic attraction lines of force. The equations for these are derived else where.
Anther way the nodes can be interconnected forms the characteristic repulsion lines of force. The equations for these lines are derived else where
Yet a third way to interconnect the nodes forms a set of hyperbolas which are color coded according their particular equations.
In these colored bi-radial synchrographs shown below you are seeing variations of these parameters. In some you will see the radial lines while in others they are not shown. The lines can be of different thickness and colors if they are shown. There can be varying numbers of rays from each pole as well. You may see the nodes, and they can vary in diameter and color if they are present. The same applies to the attraction and repulsion lines. They can vary in thickness, color and spacing. The hyperbolas are colored and can vary in thickness and spacing if shown.