If it were to turn out that humans do not actually live at D=3 but at D=6:
“Definition 16 The Sixth Degree Surface Interaction produces the most complex organisms, which are a grouping of highly specialized groupings of cells with specialized processes available to make the best use of the results of each of the five previous Surface Interactions.”
How, then, would a 19Hz infrasound wave at D=6 transform across a range of Degrees of Surface Interaction (D=0 to D=12), using the Unified Theory of Energy (UTE)?
D (Degree of Surface Interaction) defines the complexity of interactions at a given scale.
D_T (Scale Multiplier) represents how the Radiation Coordinate System (RCS) of one object encompasses another.
D=3 aligns with physics’ expectations, but humans have not yet formed at D=3 per the UTE—instead, Earth itself had to reach D=4 and D=5 for fully mobile organisms which exist at D=6.
The Moon sits at or just below D=3, as its interaction with Earth and the Sun might allow for basic gas formation
Since differentiation transforms the frequency recursively across dimensions, we use a scaling factor that follows:
fD−n=fD×(DD−n)kf_{D-n} = f_D \times \left( \frac{D}{D-n} \right)^kfD−n=fD×(D−nD)k
For simplicity, let’s assume each differentiation doubles the frequency as energy compacts into lower D-values:
fD−1≈2fDf_{D-1} \approx 2 f_DfD−1≈2fD
With 19Hz at D=6, we now calculate across D=0 to D=12.
Applying the recursive doubling rule:
fD=6=19 Hzf_{D=6} = 19 \text{ Hz}fD=6=19 Hz
fD=5=2×19=38 Hzf_{D=5} = 2 \times 19 = 38 \text{ Hz}fD=5=2×19=38 HzfD=4=2×38=76 Hzf_{D=4} = 2 \times 38 = 76 \text{ Hz}fD=4=2×38=76 HzfD=3=2×76=152 Hzf_{D=3} = 2 \times 76 = 152 \text{ Hz}fD=3=2×76=152 HzfD=2=2×152=304 Hzf_{D=2} = 2 \times 152 = 304 \text{ Hz}fD=2=2×152=304 HzfD=1=2×304=608 Hzf_{D=1} = 2 \times 304 = 608 \text{ Hz}fD=1=2×304=608 HzfD=0=2×608=1,216 Hzf_{D=0} = 2 \times 608 = 1,216 \text{ Hz}fD=0=2×608=1,216 Hz
At D=3, 19Hz from D=6 has shifted to 152Hz, now well within human hearing.
At D=0, the same wave is now over 1.2kHz, firmly in the high midrange of human hearing.
fD=7=192=9.5 Hzf_{D=7} = \frac{19}{2} = 9.5 \text{ Hz}fD=7=219=9.5 HzfD=8=9.52=4.75 Hzf_{D=8} = \frac{9.5}{2} = 4.75 \text{ Hz}fD=8=29.5=4.75 HzfD=9=4.752=2.375 Hzf_{D=9} = \frac{4.75}{2} = 2.375 \text{ Hz}fD=9=24.75=2.375 HzfD=10=2.3752=1.1875 Hzf_{D=10} = \frac{2.375}{2} = 1.1875 \text{ Hz}fD=10=22.375=1.1875 HzfD=11=1.18752=0.59375 Hzf_{D=11} = \frac{1.1875}{2} = 0.59375 \text{ Hz}fD=11=21.1875=0.59375 HzfD=12=0.593752=0.2969 Hzf_{D=12} = \frac{0.59375}{2} = 0.2969 \text{ Hz}fD=12=20.59375=0.2969 Hz
At D=9, the wave is now in the sub-harmonic infrasonic range (~2.4Hz, near brainwave frequencies).
At D=12, the same wave has stretched into a slow oscillation, far below human perception but potentially relevant for gravitational wave-like interactions.
Now that we see how the same 19Hz oscillation transforms across dimensions, what does this mean?
Lower D-values represent denser, more physically compact interactions.
This results in an increase in frequency, shifting infrasound into audible sound, then higher harmonics.
At D=3 (expected by classical physics), the wave is now a 152Hz sound wave.
As D increases, interactions become more spread out, and the same wave behaves as a longer, slower oscillation.
At D=9 and beyond, the oscillation is no longer a mechanical wave but could manifest as field variations (such as geomagnetic fluctuations, gravitational perturbations, or spacetime distortions).
A being existing at D=8 or D=9 perceives “our” 19Hz as something much slower, possibly as an oscillation embedded in a larger wave system.
A being at D=3 would detect it as a 152Hz sound, still within the realm of ordinary acoustic physics.
A being at D=0 might perceive it as high-pitched, rapid oscillations—if perception even functions at that level.
This suggests a method for interdimensional signaling:
To transmit between dimensions, one must match the correct frequency transformation based on Scale (D_T) and Degree of Surface Interaction (D).
Signals originating from higher D-values would arrive in D=3 as compacted higher-frequency waves (radio, visible light, or even gamma rays).
Conversely, signals originating in D=3 or D=6 might be downshifted into gravitational waves, magnetic fluctuations, or quantum field disturbances at D=9+.
If Earth is at D=6 relative to its own Radiation Coordinate System (RCS), its energy interactions with the Sun (D_T multiplier) shape the available frequency spectrum for humans.
The Moon, sitting at or just below D=3, is embedded within Earth’s RCS, meaning its interaction with energy fields (such as solar wind or geomagnetic flux) might follow similar dimensional frequency shifts.
This could explain why low-energy particle interactions on the Moon appear different than expected—its dimensional Scale positioning modifies the way it absorbs and re-emits energy.