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The 8<sup>th</sup> Octave Overtone Tuning, sometimes known as 128 Tuning, consists of harmonics of the [[OverToneSeries|harmonic series]], numbers 128 (2<sup>8</sup>, hence 8<sup>th</sup> octave) through 255. | The 8<sup>th</sup> Octave Overtone Tuning, sometimes known as 128 Tuning, is a tuning developed by [[Johnny Reinhard|Johnny Reinhard]]. | ||
It consists of harmonics of the [[OverToneSeries|harmonic series]], numbers 128 (2<sup>8</sup>, hence 8<sup>th</sup> octave) through 255. | |||
Scales can be selected as subsets of these 128 pitches, or the entire set can be used. | Scales can be selected as subsets of these 128 pitches, or the entire set can be used. | ||
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== Reading == | == Reading == | ||
[https://stereosociety.com/20/jpg/Johnny-Reinhard/8th-Octave-Overtone-Tuning.pdf Johnny Reinhard's original paper]. | |||
[https://www.cassgb.org/features/post/128-note-octave/ 128 NOTES PER OCTAVE ON THE SAXOPHONE: HOW I DID IT AND WHY!: Saxophonist Philipp Gerschlauer on how he went about devising a 128-note per octave fingering chart] | [https://www.cassgb.org/features/post/128-note-octave/ 128 NOTES PER OCTAVE ON THE SAXOPHONE: HOW I DID IT AND WHY!: Saxophonist Philipp Gerschlauer on how he went about devising a 128-note per octave fingering chart] | ||
Revision as of 21:41, 9 February 2020
The 8th Octave Overtone Tuning, sometimes known as 128 Tuning, is a tuning developed by Johnny Reinhard.
It consists of harmonics of the harmonic series, numbers 128 (28, hence 8th octave) through 255.
Scales can be selected as subsets of these 128 pitches, or the entire set can be used.
A key benefit of using pitches exclusively from the same harmonic series is that they share a fundamental. By using the 8th octave of a harmonic series, said fundamental will almost certainly be infrasonic, but it will still have a psychoacoustic presence.
An illustratively surprising result of this higher harmonic tuning is that, since a just 4/3 does not have a power of 2 in the denominator and thus does not exist in the (octave-reduced) harmonic series, it will not be used in this tuning. Instead, when the inverse of the 3/2 ratio is needed, one may use 43/32 (511.517706¢) or 171/128 (501.423018¢).
Reading
Johnny Reinhard's original paper.
Johnny Reinhard - 8th Octave Overtone Tuning and Bassoon Fingerings in 128
Scores
Listening
Georg Friedrich Haas - FOR JOHNNY REINHARD for bassoon in 128
Juhani Nuorvala - Toivo 128 for bassoon and pre-recording
Well Tuned Piano (actually up to the 11th octave harmonics, but same idea)
Symphony #3 “Gloria” (actually only the 7th octave harmonics, but the same idea)
128 notes per octave on Alto Saxophone - Philipp Gerschlauer
Composers John Eaton, Rovner, Thoegersen, Golden, and others have also worked with 8th Octave Overtone Tuning.