Burkhard
Joined 28 September 2018
Created page with "Test - desktop mode, but on mobile" |
→Music you can listen to (non-12edo only listed): added more music |
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== About me == | |||
I am Burkhard von Stackelberg, an ambitious musical hobbyist living in Stuttgart. Not the one in Kansas nor the one in Arkansas, but the much bigger one in Germany. While I mainly compose in 12edo (or, let's say, my music is mostly interpretable and understandable in 12edo), some of it is microtonal. Like most of us, I am grown up in a 12edo context culture, and most instruments I deal with strengthen a 12edo position, but in electronic music I like to use a bunch of possibilities, of which 12edo is but one. | |||
== Music you can listen to (non-12edo only listed) == | |||
At https://soundcloud.com/user-824310486 you find me as '''Muckotron''' with my electronic music. | |||
'''[https://soundcloud.com/user-824310486/jolly-ride Jolly Ride]''' is a piece written in the equal-tempered Bohlen-Piercescale (13ed3). Using an eclectic musical language from baroque, jazz/ragtime, and impressionism, I tried to shed light on the possibilities of BP. Using mostly the lambda scale as a base, modulating between different tonalities, I also use False Father with its pseudo-octave at one point. BP is mostly known as a scale with low tension, I found that there is more in it. Enjoy a jolly ride on an exoplanetary camel! | |||
[https://soundcloud.com/user-824310486/blues-around-trappist-1 '''Blues around Trappist-1'''] (ICT 7:9:10:11 open) | |||
Would blues on an other world sound like that? | |||
Tuning recipe: Start with a 9:10:11 chord. Repeat it all over in 7:9 periods. While giving you savvy 7:9:10:11 harmonies, it lacks a clear octave period, forcing you to seemingly polytonal settings. | |||
[https://soundcloud.com/user-824310486/bell-dance '''Bell Dance'''] (ICT 10:12:13:14 / 3:1) | |||
[https://soundcloud.com/user-824310486/insectoids '''Insectoids'''] (ICT 7:9:10:11 / 3:1) | |||
[https://soundcloud.com/user-824310486/orbiting-an-exotic-world '''Orbiting an Exotic World'''] in 5edo | |||
[https://soundcloud.com/user-824310486/keepin-cool-in-the-rush '''Keepin' cool in the rush'''] in a 10-note-MOS subset of 24edo | |||
[https://soundcloud.com/user-824310486/sweetness '''Sweetness'''] in a 9-note-MOS subset of 24-edo | |||
'''[https://soundcloud.com/user-824310486/4-edt-rocks How to Dance on a Comet]''' in 4ed3 | |||
How many notes does one need to make music? Here, I used no more than 4 in a 1:3 range, at intervals barely less than a Fourth in traditional western notation. Or about half a 5-equal division of the octave. | |||
== Scales and tuning recipes == | |||
=== Intersecting Chord Tetrachord scales (for no better name) === | |||
Experimenting in the neighbourhood of diatonic JI, I found some scales with astonishing similarities in the way they can be build, leading to a whole scale family with low harmonic entropy. | |||
==== Diatonic JI scale (ICT 6:8:9:10 / 2:1) ==== | |||
* Start with a 8:9:10 chord. | |||
* Iterate this pattern every 6:8, i.e. 3:4. | |||
* Stop iteration at the octave (2:1). | |||
The scale contains a 6:8:9:10 chord, whose inversion is a (filled) major chord: 8:9:10:12. This pattern occurs twice. The third major chord contains a Pythagorean major third (diapasson). | |||
The resulting scale: | |||
! byzantine.scl | |||
Byzantine Diatonic | |||
! repeats every 4:3 until iteration stops at the octave. | |||
7 | |||
! | |||
9/8 | |||
5/4 | |||
4/3 | |||
3/2 | |||
5/3 | |||
6/9 | |||
2 | |||
The scale steps are: 9/8, 10/9, 16/15, 9/8, 10/9, 16/15, 9/8. | |||
==== Slendro JI scale (ICT 4:6:7:8 / 2:1) ==== | |||
* Start with a 6:7:8 chord. | |||
* Iterate this pattern every 6:4, i.e. 3:2. | |||
* Stop iteration at the octave (2:1) | |||
The pattern contains a 4:6:7:8 chord, which can be interpreted as a 2:3:4 open-fifth chord, which is septimally filled. This pattern occurs once | |||
The resulting scale: | |||
! ji-slendro.scl | |||
JI Slendro | |||
! | |||
5 | |||
! | |||
7/6 | |||
4/3 | |||
3/2 | |||
7/4 | |||
2 | |||
The scale steps are: 7/6, 8/7, 9/8, 7/6, 8/7 | |||
==== Sweet Nine (ICT 8:10:11:12 / 2:1) ==== | |||
* Start with a 10:11:12 chord. | |||
* Iterate this pattern every 10:8, i.e. 5:4. | |||
* Stop iteration at the octave. | |||
The base chord ist 8:10:11:12. | |||
The basic scale steps are 11/10, 12/11 and 25/24. The iteration stops at a 16/15 interval. | |||
The resulting scale: | |||
! sweetnine.scl | |||
Sweet Nine. Based on an 8:10:11:12 chord. | |||
! | |||
9 | |||
! | |||
11/10 | |||
6/5 | |||
5/4 | |||
11/8 | |||
3/2 | |||
25/16 | |||
55/32 | |||
15/8 | |||
2 | |||
==== General pattern ==== | |||
* Choose a chord of 3 following integers, for example 3:4:5 | |||
* Double the numbers, filling the upper gap. Example: 6:8:9:10. This is your base chord. | |||
* Start your scale with the upper triad as your chord. | |||
* Iterate this chord, using the lower dyad as generator. | |||
* Stop iteration at a chosen period interval. Example: 2:1 | |||