Since the time aspect of the SUDR progresses uniformily, and the space aspect of the TUDR progresses uniformly, but the progression of the space aspect of the SUDR, and the time aspect of the TUDR, is continuously reversing, the SUDR is stationary in space, but progressing in time, while the TUDR is stationary in time, while progressing in space. Figure 1 illustrates this in a world line chart.
Figure 1. Stationary SUDR (S) and TUDR (T)
However, this also means that they can come into contact and combine. Figure 2 illustrates the SUDR|TUDR combination.
Figure 2. SUDR and TUDR Combine as SUDR|TUDR Combo
In figure 2, the SUDR|TUDR combo is identified as a photon, but this has not yet been established.
Reciprocal Number The SUDR|TUDR combo is called a reciprocal number (RN). The RN is the first number of the new scalar mathematics called the Reciprocal System of Mathematics (RSM). It has three terms, instead of two (1/2 + 2/1) = (1/2 + 1/1 + 2/1), because the middle term accounts for the inward component of the total motion. Without it, the sum of the motion in the SUDR|TUDR combo would be (1/2 + 2/1) = 3/3, which is incorrect. The correct sum is (1/2 + 2/1) = (1/2 + 1/1 + 2/1) = 4/4, because, while the "direction" reversals confine the progression of the reversing aspect to one unit, the inward/outward cycle still constitutes two units of motion.
Figure 1. Stationary SUDR (S) and TUDR (T)
However, this also means that they can come into contact and combine. Figure 2 illustrates the SUDR|TUDR combination.
Figure 2. SUDR and TUDR Combine as SUDR|TUDR Combo
In figure 2, the SUDR|TUDR combo is identified as a photon, but this has not yet been established.
Reciprocal Number
The SUDR|TUDR combo is called a reciprocal number (RN). The RN is the first number of the new scalar mathematics called the Reciprocal System of Mathematics (RSM). It has three terms, instead of two (1/2 + 2/1) = (1/2 + 1/1 + 2/1),
because the middle term accounts for the inward component of the total motion. Without it, the sum of the motion in the SUDR|TUDR combo would be
(1/2 + 2/1) = 3/3,
which is incorrect. The correct sum is
(1/2 + 2/1) = (1/2 + 1/1 + 2/1) = 4/4,
because, while the "direction" reversals confine the progression of the reversing aspect to one unit, the inward/outward cycle still constitutes two units of motion.