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= ~~[[7edo]]~~ =

== Approximations of odd harmonics ==

== ~~Octave stretch or compression~~ ==

~~What follows is a comparison of stretched- and compressed-octave 7edo tunings.~~

~~; 7edo~~

* Step size: 171.429{{c}}~~, octave size: 1200.0~~{{c}}

~~Pure-octaves 7edo approximates all harmonics up to 16 within NNN~~{{c}}.

{{~~Harmonics~~ in equal|7|~~2|1~~|columns=11|~~collapsed=true~~|intervals=~~integer~~|~~title~~=~~Approximation of harmonics in 7edo~~}}

{{~~Harmonics~~ in equal|7|~~2|1~~|columns=12|~~start~~=12|~~collapsed~~=~~true~~|intervals=~~integer~~|~~title~~=~~Approximation of~~ harmonics in ~~7edo (continued)~~}}

~~; [[WE~~|~~7et, 2.3.~~11~~.13 WE]]~~

* Step size: 171.993{{c}}~~, octave size: 1204.0~~{{c}}

~~Stretching the octave of 7edo by around 4~~{{c}} ~~results~~ in ~~much improved primes 3, 5 and 11, but much worse primes~~ 7 ~~and 13. This approximates all~~ harmonics ~~up to~~ 16 ~~within 75.0~~{{c}}~~. The 2.3.11.13 WE tuning and 2.3.11.13 [[TE]] tuning both do this.~~

{{~~Harmonics~~ in ~~cet~~|~~171.993~~|columns=11|~~collapsed=true~~|intervals=~~integer~~|~~title~~=~~Approximation of~~ harmonics in ~~7et, 2.3.11.13 WE~~}}

{{~~Harmonics~~ in ~~cet~~|~~171.993~~|columns=12|~~start~~=12|~~collapsed~~=~~true~~|intervals=~~integer~~|~~title~~=~~Approximation of harmonics in 7et, 2.3.11.13 WE (continued)~~}}

~~; [[18ed6]]~~

* Step size: 172.331{{c}}~~, octave size: 1206.3~~{{c}}

~~Stretching the octave of 7edo by around 6~~{{~~c}} results~~ in ~~much improved primes 3, 5 and~~ 7~~, but much worse primes 11 and 14. This approximates all harmonics up to 16 within 48.7{{c~~}}~~. The tuning 18ed6 does this.~~

{{~~Harmonics~~ in equal|18|~~6|1~~|columns=11|~~collapsed=true~~|intervals=~~integer~~|~~title~~=~~Approximation of harmonics in 18ed6~~}}

{{~~Harmonics~~ in equal|18|~~6|1~~|columns=12|~~start~~=12|~~collapsed~~=~~true~~|intervals=~~integer~~|~~title~~=~~Approximation of harmonics in 18ed6 (continued)~~}}

~~; [[WE|7et, 2.3.5.11.13 WE]]~~

* Step size: 172.390{{c}}~~, octave size: 1206.7~~{{c}}

~~Stretching the octave of 7edo by around 7~~{{~~c}} results~~ in ~~much improved primes 3, 5 and 11, but much worse primes 7 and 13. This approximates all harmonics up to 16 within 85.~~7~~{{c~~}}~~. Its 2.3.5.11.13 WE tuning and 2.3.5.11.13 [[TE]] tuning both do this.~~

{{~~Harmonics~~ in ~~cet~~|~~172.390~~|columns=11|~~collapsed=true~~|intervals=~~integer~~|~~title~~=~~Approximation of harmonics in 7et, 2.3.5.11.13 WE~~}}

{{~~Harmonics~~ in ~~cet~~|~~172.390~~|~~columns~~=12|~~start~~=12|~~collapsed=true~~|intervals=~~integer~~|~~title~~=~~Approximation of harmonics in 7et, 2.3.5.11.13 WE (continued)~~}}

~~; [[zpi|15zpi]]~~

* Step size: 172.495{{c}}~~, octave size: 1207.5~~{{c}}

~~Stretching the octave of 7edo by around 7.5~~{{~~c}} results~~ in ~~much improved primes 3, 5 and 11, but much worse primes 2,~~ 7 ~~and 13. This approximates all harmonics up to 16 within 84.0{{c~~}}~~. The tuning 15zpi does this.~~

{{~~Harmonics~~ in ~~cet~~|~~172.495~~|columns=11|~~collapsed=true~~|intervals=~~integer~~|~~title~~=~~Approximation of harmonics in 15zpi~~}}

{{~~Harmonics~~ in ~~cet~~|~~172.495~~|~~columns~~=12|~~start~~=12|~~collapsed=true~~|intervals=~~integer~~|~~title~~=~~Approximation of harmonics in 15zpi (continued)~~}}

~~; [[11edt]]~~

* Step size: 172.905{{c}}~~, octave size: 1210.3~~{{c}}

~~Stretching the octave of 7edo by around NNN~~{{~~c}} results~~ in ~~much improved primes 3, 5 and 11, but much worse primes 2,~~ 7 ~~and 13. This approximates all harmonics up to 16 within 83.6{{c~~}}~~. The tuning 11edt does this.~~

{{~~Harmonics~~ in equal|11|~~3|1~~|columns=11|~~collapsed=true~~|intervals=~~integer~~|~~title~~=~~Approximation of harmonics in 11edt~~}}

{{~~Harmonics~~ in equal|11|~~3|1~~|columns=12|~~start~~=12|~~collapsed~~=~~true~~|intervals=~~integer~~|~~title~~=~~Approximation of harmonics in 11edt (continued)~~}}

@@ Line 1: / Line 1: @@
-= [[7edo]] =
+== Approximations of odd harmonics ==
-== Octave stretch or compression ==
+{{harmonics in equal|1|intervals=odd|columns=7}}
-What follows is a comparison of stretched- and compressed-octave 7edo tunings.
+{{harmonics in equal|2|intervals=odd|columns=7}}
+{{harmonics in equal|3|intervals=odd|columns=7}}
-; 7edo
+{{harmonics in equal|4|intervals=odd|columns=7}}
-* Step size: 171.429{{c}}, octave size: 1200.0{{c}}
+{{harmonics in equal|5|intervals=odd|columns=7}}
-Pure-octaves 7edo approximates all harmonics up to 16 within NNN{{c}}.
+{{harmonics in equal|6|intervals=odd|columns=7}}
-{{Harmonics in equal|7|2|1|columns=11|collapsed=true|intervals=integer|title=Approximation of harmonics in 7edo}}
+{{harmonics in equal|7|intervals=odd|columns=7}}
-{{Harmonics in equal|7|2|1|columns=12|start=12|collapsed=true|intervals=integer|title=Approximation of harmonics in 7edo (continued)}}
+{{harmonics in equal|8|intervals=odd|columns=7}}
+{{harmonics in equal|9|intervals=odd|columns=7}}
-; [[WE|7et, 2.3.11.13 WE]]
+{{harmonics in equal|10|intervals=odd|columns=7}}
-* Step size: 171.993{{c}}, octave size: 1204.0{{c}}
+{{harmonics in equal|11|intervals=odd|columns=7}}
-Stretching the octave of 7edo by around 4{{c}} results in much improved primes 3, 5 and 11, but much worse primes 7 and 13. This approximates all harmonics up to 16 within 75.0{{c}}. The 2.3.11.13 WE tuning and 2.3.11.13 [[TE]] tuning both do this.
+{{harmonics in equal|12|intervals=odd|columns=7}}
-{{Harmonics in cet|171.993|columns=11|collapsed=true|intervals=integer|title=Approximation of harmonics in 7et, 2.3.11.13 WE}}
+{{harmonics in equal|13|intervals=odd|columns=7}}
-{{Harmonics in cet|171.993|columns=12|start=12|collapsed=true|intervals=integer|title=Approximation of harmonics in 7et, 2.3.11.13 WE (continued)}}
+{{harmonics in equal|14|intervals=odd|columns=7}}
+{{harmonics in equal|15|intervals=odd|columns=7}}
-; [[18ed6]]
+{{harmonics in equal|16|intervals=odd|columns=7}}
-* Step size: 172.331{{c}}, octave size: 1206.3{{c}}
+{{harmonics in equal|17|intervals=odd|columns=7}}
-Stretching the octave of 7edo by around 6{{c}} results in much improved primes 3, 5 and 7, but much worse primes 11 and 14. This approximates all harmonics up to 16 within 48.7{{c}}. The tuning 18ed6 does this.
+{{harmonics in equal|18|intervals=odd|columns=7}}
-{{Harmonics in equal|18|6|1|columns=11|collapsed=true|intervals=integer|title=Approximation of harmonics in 18ed6}}
+{{harmonics in equal|19|intervals=odd|columns=7}}
-{{Harmonics in equal|18|6|1|columns=12|start=12|collapsed=true|intervals=integer|title=Approximation of harmonics in 18ed6 (continued)}}
+{{harmonics in equal|20|intervals=odd|columns=7}}
+{{harmonics in equal|21|intervals=odd|columns=7}}
-; [[WE|7et, 2.3.5.11.13 WE]]
+{{harmonics in equal|22|intervals=odd|columns=7}}
-* Step size: 172.390{{c}}, octave size: 1206.7{{c}}
+{{harmonics in equal|23|intervals=odd|columns=7}}
-Stretching the octave of 7edo by around 7{{c}} results in much improved primes 3, 5 and 11, but much worse primes 7 and 13. This approximates all harmonics up to 16 within 85.7{{c}}. Its 2.3.5.11.13 WE tuning and 2.3.5.11.13 [[TE]] tuning both do this.
+{{harmonics in equal|24|intervals=odd|columns=7}}
-{{Harmonics in cet|172.390|columns=11|collapsed=true|intervals=integer|title=Approximation of harmonics in 7et, 2.3.5.11.13 WE}}
+{{harmonics in equal|25|intervals=odd|columns=7}}
-{{Harmonics in cet|172.390|columns=12|start=12|collapsed=true|intervals=integer|title=Approximation of harmonics in 7et, 2.3.5.11.13 WE (continued)}}
+{{harmonics in equal|26|intervals=odd|columns=7}}
+{{harmonics in equal|27|intervals=odd|columns=7}}
-; [[zpi|15zpi]]
+{{harmonics in equal|28|intervals=odd|columns=7}}
-* Step size: 172.495{{c}}, octave size: 1207.5{{c}}
+{{harmonics in equal|29|intervals=odd|columns=7}}
-Stretching the octave of 7edo by around 7.5{{c}} results in much improved primes 3, 5 and 11, but much worse primes 2, 7 and 13. This approximates all harmonics up to 16 within 84.0{{c}}. The tuning 15zpi does this.
+{{harmonics in equal|30|intervals=odd|columns=7}}
-{{Harmonics in cet|172.495|columns=11|collapsed=true|intervals=integer|title=Approximation of harmonics in 15zpi}}
+{{harmonics in equal|31|intervals=odd|columns=7}}
-{{Harmonics in cet|172.495|columns=12|start=12|collapsed=true|intervals=integer|title=Approximation of harmonics in 15zpi (continued)}}
+{{harmonics in equal|32|intervals=odd|columns=7}}
+{{harmonics in equal|33|intervals=odd|columns=7}}
-; [[11edt]]
+{{harmonics in equal|34|intervals=odd|columns=7}}
-* Step size: 172.905{{c}}, octave size: 1210.3{{c}}
+{{harmonics in equal|35|intervals=odd|columns=7}}
-Stretching the octave of 7edo by around NNN{{c}} results in much improved primes 3, 5 and 11, but much worse primes 2, 7 and 13. This approximates all harmonics up to 16 within 83.6{{c}}. The tuning 11edt does this.
+{{harmonics in equal|36|intervals=odd|columns=7}}
-{{Harmonics in equal|11|3|1|columns=11|collapsed=true|intervals=integer|title=Approximation of harmonics in 11edt}}
+{{harmonics in equal|37|intervals=odd|columns=7}}
-{{Harmonics in equal|11|3|1|columns=12|start=12|collapsed=true|intervals=integer|title=Approximation of harmonics in 11edt (continued)}}
+{{harmonics in equal|38|intervals=odd|columns=7}}
+{{harmonics in equal|39|intervals=odd|columns=7}}
+{{harmonics in equal|40|intervals=odd|columns=7}}
+{{harmonics in equal|41|intervals=odd|columns=7}}
+{{harmonics in equal|42|intervals=odd|columns=7}}
+{{harmonics in equal|43|intervals=odd|columns=7}}
+{{harmonics in equal|44|intervals=odd|columns=7}}
+{{harmonics in equal|45|intervals=odd|columns=7}}
+{{harmonics in equal|46|intervals=odd|columns=7}}
+{{harmonics in equal|47|intervals=odd|columns=7}}
+{{harmonics in equal|48|intervals=odd|columns=7}}
+{{harmonics in equal|49|intervals=odd|columns=7}}
+{{harmonics in equal|50|intervals=odd|columns=7}}
+{{harmonics in equal|51|intervals=odd|columns=7}}
+{{harmonics in equal|52|intervals=odd|columns=7}}
+{{harmonics in equal|53|intervals=odd|columns=7}}