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If you learn how to build one you have achieved a Monopoly On Violence
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Before you learn to run, 🛸
you need to learn how to walk. 🗿
Learn to use applied science in combination with forbidden knowledge and build an Oscillator
It's all hidden in plain sight.
https://youtu.be/oW5wRfLtGsE
you need to learn how to walk. 🗿
Learn to use applied science in combination with forbidden knowledge and build an Oscillator
It's all hidden in plain sight.
https://youtu.be/oW5wRfLtGsE
Forwarded from Azazel News (Aries)
that’s it for #learningtowalk part 7
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Just because we are busy, does not mean we won’t reply
This one is for you Winter
This one is for you Winter
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Forwarded from Azazel News (Aries)
MUSIC AND MATHEMATICS
Chladni figures produced by sound vibrations in fine powder on a square plate. (Ernst Chladni, Acoustics, 1802)
Chladni figures produced by sound vibrations in fine powder on a square plate. (Ernst Chladni, Acoustics, 1802)
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A musical scale is a discrete set of pitches used in making or describing music. The most important scale in the Western tradition is the diatonic scale but many others have been used and proposed in various historical eras and parts of the world. Each pitch corresponds to a particular frequency, expressed in hertz (Hz), sometimes referred to as cycles per second (c.p.s.). A scale has an interval of repetition, normally the octave. The octave of any pitch refers to a frequency exactly twice that of the given pitch.
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FREQUENCY AND HARMONY
Succeeding superoctaves are pitches found at frequencies four, eight, sixteen times, and so on, of the fundamental frequency.
When expressed as a frequency bandwidth an octave A2–A3 spans from 110 Hz to 220 Hz (span=110 Hz). The next octave will span from 220 Hz to 440 Hz (span=220 Hz). The third octave spans from 440 Hz to 880 Hz (span=440 Hz) and so on. Each successive octave spans twice the frequency range of the previous octave.
Succeeding superoctaves are pitches found at frequencies four, eight, sixteen times, and so on, of the fundamental frequency.
When expressed as a frequency bandwidth an octave A2–A3 spans from 110 Hz to 220 Hz (span=110 Hz). The next octave will span from 220 Hz to 440 Hz (span=220 Hz). The third octave spans from 440 Hz to 880 Hz (span=440 Hz) and so on. Each successive octave spans twice the frequency range of the previous octave.
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HARMONY DEFINITION
The simultaneous vibration of two or more bodies whose harmonics do not produce discords, and whose funda mental pitches are harmonics of the lowest pitch, or are a unison with the resultant notes or overtones, or undertones, of any two or more of them.
The simultaneous vibration of two or more bodies whose harmonics do not produce discords, and whose funda mental pitches are harmonics of the lowest pitch, or are a unison with the resultant notes or overtones, or undertones, of any two or more of them.
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Forwarded from Azazel News (Aries)
Its name derives from the concept of overtones, or harmonics in music: the wavelengths of the overtones of a vibrating string are 1/2, 1/3, 1/4, etc., of the string's fundamental wavelength. Every term of the series after the first is the harmonic mean of the neighboring terms; the phrase harmonic mean likewise derives from music.
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HARMONICS SERIES (MUSIC)
A harmonic series (also overtone series) is the sequence of frequencies, musical tones, or pure tones in which each frequency is an integer multiple of a fundamental.
Pitched musical instruments are often based on an acoustic resonator such as a string or a column of air, which oscillates at numerous modes simultaneously. At the frequencies of each vibrating mode, waves travel in both directions along the string or air column, reinforcing and canceling each other to form standing waves. Interaction with the surrounding air causes audible sound waves, which travel away from the instrument. Because of the typical spacing of the resonances, these frequencies are mostly limited to integer multiples, or harmonics, of the lowest frequency, and such multiples form the harmonic series.
A harmonic series (also overtone series) is the sequence of frequencies, musical tones, or pure tones in which each frequency is an integer multiple of a fundamental.
Pitched musical instruments are often based on an acoustic resonator such as a string or a column of air, which oscillates at numerous modes simultaneously. At the frequencies of each vibrating mode, waves travel in both directions along the string or air column, reinforcing and canceling each other to form standing waves. Interaction with the surrounding air causes audible sound waves, which travel away from the instrument. Because of the typical spacing of the resonances, these frequencies are mostly limited to integer multiples, or harmonics, of the lowest frequency, and such multiples form the harmonic series.
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Harmonics of a vibrating string, showing how the frequency of each harmonic is related to integer multiples of the fundamental frequency f. The location of the nodes (red dots) can be used to define equivalent strings (on the right) with 1/2, 1/3, and 1/4 of the length of the original strings, having the same frequency.
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FOURIER SERIES
In mathematics, a Fourier series is a periodic function composed of harmonically related sinusoids, combined by a weighted summation. With appropriate weights, one cycle (or period) of the summation can be made to approximate an arbitrary function in that interval (or the entire function if it too is periodic). As such, the summation is a synthesis of another function. The discrete-time Fourier transform is an example of Fourier series. The process of deriving weights that describe a given function is a form of Fourier analysis. For functions on unbounded intervals, the analysis and synthesis analogies are Fourier transform and inverse transform.
In mathematics, a Fourier series is a periodic function composed of harmonically related sinusoids, combined by a weighted summation. With appropriate weights, one cycle (or period) of the summation can be made to approximate an arbitrary function in that interval (or the entire function if it too is periodic). As such, the summation is a synthesis of another function. The discrete-time Fourier transform is an example of Fourier series. The process of deriving weights that describe a given function is a form of Fourier analysis. For functions on unbounded intervals, the analysis and synthesis analogies are Fourier transform and inverse transform.
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Function s(x) (in red) is a sum of six sine functions of different amplitudes and harmonically related frequencies. Their summation is called a Fourier series. The Fourier transform, S(f) (in blue), which depicts amplitude vs frequency, reveals the 6 frequencies (at odd harmonics) and their amplitudes (1/odd number).
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OCCULT REFERENCES FROM DASHED AGAINST THE ROCK
THE BASIS OF A NEW SCIENCE
⬇️⬇️⬇️⬇️⬇️⬇️⬇️⬇️⬇️↕️
THE BASIS OF A NEW SCIENCE
⬇️⬇️⬇️⬇️⬇️⬇️⬇️⬇️⬇️↕️
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OCCULT REFERENCES FROM DASHED AGAINST THE ROCK
THE BASIS OF A NEW SCIENCE
THE BASIS OF A NEW SCIENCE
Forwarded from Azazel News (Aries)
OCCULT REFERENCES FROM DASHED AGAINST THE ROCK
THE BASIS OF A NEW SCIENCE
THE BASIS OF A NEW SCIENCE
Forwarded from Azazel News (Aries)
OCCULT REFERENCES FROM DASHED AGAINST THE ROCK
THE BASIS OF A NEW SCIENCE
THE BASIS OF A NEW SCIENCE