30edo: Difference between revisions

{{EDO intro|30}}

{{Harmonics in equal|30}}

Its [[patent val]] is a doubled version of the patent val for [[15edo]] through the 11-limit, so 30 can be viewed as a [[contorted]] version of 15. In the 13-limit it supplies the optimal patent val for [[Trienstonic_clan#Quindecic|quindecic temperament]].

[[File:Plot30.png|alt=plot30.png|thumb|A plot of the Z function around 30.]]

However, 5\30 is 200 cents, which is a good (and familiar) approximation for 9/8, and hence 30edo can be viewed inconsistently, as having a 9/1 at 95\30 as well as 96\30.  

Instead of the 18\30 fifth of 720 cents, 30edo also makes available a 17\30 fifth of 680 cents. This is an ideal tuning for pelogic (5-limit mavila), which tempers out 135/128. When 30edo is used for pelogic, 5\30 can again be used inconsistently as a 9/8.

30edo has subset edos {{EDOs|1, 2, 3, 5, 6, 10, 15}} and it is a [[largely composite]] edo.

30edo is the 3rd [[wikipedia:primorial|primorial]] edo, being the product of first three primes and thus the smallest number with three distinct prime factors. As a corollary, 30edo is the smallest EDO that supports [[perfectly balanced]] scales that are minimal and not equally spaced. See the article on perfect balance.

! [[Cent]]s

! [[Armodue_theory|Armodue Notation]]

== Commas ==

30 EDO [[tempers out]] the following [[commas]]. (Note: This assumes the [[val]] {{val| 30 48 70 84 104 111 }}.)

! [[Harmonic Limit|Prime<br>Limit]]

| Limma, Pythagorean minor second

| Maximal diesis, Porcupine comma

| Diesis, augmented comma

| Slendro diesis

| Squalentine

| Septimal semicomma, Starling comma

| Octagar

| Porwell

| Wizardharry

== Rank-2 temperaments ==

As 30edo is largely composite, only 7, 11 and 13 steps create [[MOS scale]]s that cover every interval using one period per octave.

7/30 produces [[Chromatic_pairs#Lovecraft|Lovecraft]], in which 2 generators is a moderately sharp [[11/8]], 3 a near perfect [[13/8]] and 5 the familiar mildly flat [[9/8]] from [[12edo]], creating the possibility of ignoring the 3rd & 5th entirely to use those harmonics as the primary building blocks of harmony in a similar way to [[orgone]]. 

 

11 produces a flat [[sensi]] scale. 13 is an excellent higher order [[Pelogic_family#Mavila|Mavila]] tuning that functions the closest to the familiar diatonic scale you can get in this edo.  

=== Subsets of [[Mavila]][16] ===

 

* [[Blackened skies]] (approximated from [[Compton]] in [[72edo]]): 8 5 2 3 2 8 2

* Carousel (this is the original/default tuning): 9 4 4 9 4

* Dewdrops (this is the original/default tuning): 4 4 4 5 4 4 5

* [[Lost spirit]] (approximated from [[Meantone]] in [[31edo]]): 7 5 2 3 5 3 5

* Lost phantom (this is the original/default tuning): 8 5 2 2 6 2 5

* Nightdrive (this is the original/default tuning): 8 5 4 9 4

* Pelagic (this is the original/default tuning): 8 4 2 4 7 5

* Bathypelagic (this is the original/default tuning): 8 4 2 3 8 5

=== Subsets of [[15edo]] ===

 

* Augmented[6] MOS: 8 2 8 2 8 2

* Equipentatonic (exact from [[5edo]]): 6 6 6 6 6

* Rockpool (approximated from [[47zpi]]): 2 8 2 6 6 6

* [[Amiot]] scale

The tables below show chords that approximate 3-integer-limit [[delta-rational]] chords with least-squares error less than 0.0015.