Here we will stop for the time being and introduce further particle models. We want to adopt our known model of the circumscribed octahedron or the escribed tetrahedron unchanged (as announced before) – we will just omit the nucleus and visualize our orbit much smaller than before. Let us call this particle, which has a “forward spin with reverse gear”, TaOu.

After we have found the tetrahedron escribed and circumscribed by circles and the circumscribed octahedron as well, we will look now for an octahedron escribed with circles. We will call this particle Oa (see Fig. 28). Each of the six circular arcs lie within an octahedron face, though two of the eight octahedron areas are skipped. This again creates a preferred spatial direction perpendicular to the two skipped triangles. If we now look in this direction through our model (Fig. 29) we can clearly see a “forward spin with reverse gear”. This rosette has developed in the opposite direction of particle Tu; it has virtually opened instead of getting closed. The next figure (Fig. 30) shows one of the directions of self-interaction.

Now, we come to the next polyhedron, the cube. Here we only find one solution, namely the escribed hexahedron (Fig. 31) that is called Ha. Fig. 32 shows the spin rosette with the “forward spin with reverse gear” and Fig. 33 illustrates the direction of self-interaction.