02 Jan 2020 [Originally for:28Dec2020] How To Decypher The Color Codes Of SR, Part 6: Mixing Modes
202 Dec 2021 [Originally intended for posting 26-8 Dec 2020]_ How to Read [The Colors Of] The Schumann Resonance Spectrogram, Part 6: Mixing Modes, money analogy
Part 6
Mixing Modes. White + Yellow = pale white = white. Yellow + Red = Orange-rust. Red + Green = Rust-Maroon. Color and shape are both important to evaluate. Any given color by itself on the Spectro, is meaningless, without its directional component (tall, or wide, ie.)
Green is the widest of the signals, being closest to Earth-ground in origin. Green is the primary coloring of the magnetic/horizontal bands. The horizontal bands are the representatin of the actual Schumann Resonances; which are given as "fixed frequencies", such as 7.83.
We refer to the Harmonic resonces as fixed frequencies, as they are largely held intact, due to a number of constants, which constrain the signals.
Rising Frequencies. Size and shape of the "waveguide cavity" is one of the constants, creating statistically consistent "fixed frequencies." Speed of light, and radio frequency waves is another constant, which serves to fix intact, the Schumann resonances.
These "fixed frequencies" of the resonant harmonics are not rising, nor falling(!) signifigantly. As a results of the constraints on the wave motions of these resonances, the variance between the max and minimum signal is only 0.5 Hertz, at the most.
Schumann resonances are not on an increasing trend. That would be nearly impossible, at this point; again, due to the physical constraints of the factors above-mentioned. That value of 7.8 is stationary, due to the constants.
More amplitude charge (spikes) creates more magnetic current. As the increased current, the magnetic waves, crash into each other these create the standing waves of the resonant harmonics. These harmonics are fixed at certain frequencies. This pre-set frequency, e.g. 7.8 Hz, is not rising, due to the constraints of the constants.
Interference waves are those which travel a distance, then eventually meet-up back to themselves. They crash into each other, with an increasing frequency. This creates more interference waves. These interference waves are like broken pieces. As longer waves bump into each other, they break-up into smaller pieces, creating higher resonance frequencies to appear.
Money Analog. For the sake of clarity, allow me to use money as a model of what I'm explaining. If you were to take a a dollar and broke it into quarters, you would have 4 pieces. If you broke the dollar into dimes, you have 10 pieces. If you break the dollar into pennies, you have 100 pieces. The dollar value is still equal in these examples. One simply has more fragments. The fragments are smaller, yet there is more of them. Overall, the value remains constant. This is what is happening with the Schumann Resonances. The frequency is not increasing, it's simply being broken into smaller portions.
The broke portions "float" to the top, and rise above the others. Yet, it is LITERALLY rising in the atmosphere, but not in frequency. Higher harmonics are not an increased wave frequency; these are two different matters. Waves propagate, or roll along the surface of the planet, while resonances are stationary.
Thank you for reading. Hoping for a blessed day for you.
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