7edo: Difference between revisions

| de = 7-EDO

| en = 7edo

| es = 7 EDO

[[File:7edo scale.mp3|thumb|A chromatic 7edo scale on C.]]

The second (171.429{{c}}) works well as a basic step for melodic progression. The step from seventh to octave is too large as a leading tone - possibly lending itself to a "sevenplus" scale similar to [[elevenplus]].

In terms of just intonation, the 3/2 is flat but usable, but we don't find particularly accurate intervals in pure harmonics outside the 3-limit, which suggests a more melodic approach to just intonation; intervals approximated by each of 7edo's steps include 10/9 for 1 step, 11/9 for 2 steps, 4/3 for 3 steps, and their octave complements. Interestingly, this renders an 8:9:10:11:12 pentad equidistant, from which it can be derived that 7edo supports [[meantone]] (equating the major seconds 10/9 and 9/8) and [[porcupine]] (splitting 4/3 into three equal submajor seconds which simultaneously represent 12/11, 11/10, and 10/9), and is the unique system to do so.  

Due to 7edo's inaccurately tuned [[5/4]] [[major third]] (which is flat by over 40 cents), it supports several exotemperaments in the 5-limit, such as [[dicot]] (which splits the fifth into two equal [[neutral third]]<nowiki/>s, simultaneously representing 5/4 and the [[minor third]] [[6/5]]) and [[mavila]] (which flattens the fifth so that the diatonic "major third" actually approximates 6/5); 6/5 is a slightly more reasonable interpretation of 7edo's third than 5/4, leading to an overall slightly [[minor]] sound.

In higher limits, this third takes on a new role: as a neutral third, it is a decent approximation of the 13th subharmonic, and as such 7edo can be seen as a 2.3.13 temperament. This third is a near perfect approximation of the interval [[39/32]]; the equation of 16/13 and 39/32 is called [[512/507|harmoneutral]] temperament. In general, the inclusion of 13 allows the pentad discussed earlier to be continued to an 8:9:10:11:12:13 hexad, although the specific interval 13/12 is inaccurate due to the errors adding up in the same direction.  

The seventh of 7edo is almost exactly the 29th harmonic (29/16), which can have a very agreeable sound with harmonic timbres. However it also finds itself nested between ratios such as 20/11 and 9/5, which gives it considerably higher harmonic entropy than 7/4, a much simpler overtone seventh.  

7edo represents a 7-step closed [[circle of fifths]], tempering out the Pythagorean chromatic semitone. However, it can also be seen as a circle of neutral thirds, which can be interpreted as 11/9; this is called [[neutron]] temperament.

[[Equiheptatonic]] scales close to 7edo are used in non-western music in some [[African]] cultures<ref>[https://www.britannica.com/art/African-music ''African music'', Encyclopedia Britannica.]</ref> as well as an integral part of early [[Chinese]] music<ref>Robotham, Donald Keith and Gerhard Kubik.</ref>. Also [[Georgian]] music seems to be based on near-equal 7-step scales.  

It has been speculated in ''Indian music: history and structure''<ref>Nambiyathiri, Tarjani. ''[https://archive.org/details/indianmusichistoryandstructureemmietenijenhuisbrill Indian Music History And Structure Emmie Te Nijenhuis Brill]''</ref> that the [[Indian]] three-sruti interval of 165 cents is very similar to one 171-cent step of 7edo.

 

 

 

 

 

{| class="wikitable center-all"

! rowspan="2" | [[Cent]]s

! [[3-limit]]

! [[5-limit]]

! [[7-limit]]

! Other

| Unison (prime)

| [[1/1]] (just)

| [[File:0-0 unison.mp3|frameless]]

| Submajor second

|

| [[10/9]] (-10.975)

| [[54/49]] (+3.215)

| [[11/10]] (+6.424)<br>[[32/29]] (-1.006)

| [[File:0-171,43 second (7-EDO).mp3|frameless]]

| Neutral third

|  

| [[39/32]] (+0.374)<br>[[16/13]] (-16.6)<br>[[11/9]] (-4.551)

| [[File:piano_2_7edo.mp3]]

| Fourth

| [[4/3]] (+16.241)

| [[27/20]] (-5.265)

| [[35/26]] (-0.326)

| [[File:0-514,29 fourth (7-EDO).mp3|frameless]]

| Fifth

| [[3/2]] (-16.241)

| [[40/27]] (+5.265)

| [[52/35]] (+0.326)

| [[File:0-685,71 fifth (7-EDO).mp3|frameless]]

| Neutral sixth

|  

| [[105/64]] (-0.048)

| [[18/11]] (+4.551)<br>[[13/8]] (+16.6)<br>[[64/39]] (-0.374)

| [[File:0-857,14 sixth (7-EDO).mp3|frameless]]

| Supraminor seventh

|  

| [[9/5]] (+10.975)

| [[49/27]] (-3.215)

| [[29/16]] (-1.006)<br>[[20/11]] (-6.424)

| [[File:0-1028,57 seventh (7-EDO).mp3|frameless]]

| Octave

| [[2/1]] (just)

| [[File:0-1200 octave.mp3|frameless]]

The usual [[Musical notation|notation system]] for 7edo is the [[chain-of-fifths notation]], which is directly derived from the standard notation used in [[12edo]].

Because the Pythagorean apotome ([[2187/2048]]) is [[tempered out]], sharps (♯) and flats (♭) are redundant in 7edo. Therefore, 7edo can be notated on a five-line staff without accidentals. Alternatively, a seven-line stave can be used, with each horizontal line representing one pitch level. There is no distinction between major or minor, so every interval has the [[interval quality]] "perfect" instead.

{| class="wikitable center-all"

|+ style="font-size: 105%;" | Notation of 7edo

! rowspan="2" | [[Degree]]

! rowspan="2" | [[Cent]]s

! colspan="2" | [[Chain-of-fifths notation]]

! [[5L 2s|Diatonic]] interval names

| 857.143

* [[Ups and downs notation]] is identical to circle-of-fifths notation;

* Mixed and pure [[sagittal notation]] are identical to circle-of-fifths notation.

===Sagittal notation===

This notation is a subset of the notations for EDOs [[14edo#Sagittal notation|14]], [[21edo#Sagittal notation|21]], [[28edo#Sagittal notation|28]], [[35edo#Sagittal notation|35]], and [[42edo#Second-best fifth notation|42b]].

rect 246 0 406 80 [https://sagittal.org#periodic-table Periodic table of EDOs with sagittal notation]

default [[File:7-EDO_Sagittal.svg]]

Because it includes no Sagittal symbols, this Sagittal notation is also a conventional notation.

=== Alternative notations ===

[[William Lynch]] proposes using numbers 1 through 7 as the nominals of 7edo with sharp signs being possible to expand to 14edo or even 21edo.

== Solfege ==

! [[Cents]]

! Standard [[solfege]]<br />(movable do)

! [[Uniform solfege]]<br />(1 vowel)

| 1028.571

[[File:7ed2-001.svg]]

== Regular temperament properties ==

7et [[tempering out|tempers out]] the following [[comma]]s. This assumes [[val]] {{val| 7 11 16 20 24 26 }}.  

{| class="commatable wikitable center-1 center-2 right-4 center-5"

|-

! [[Ratio]]<ref group="note">Ratios longer than 10 digits are presented by placeholders with informative hints</ref>

! [[Monzo]]

! Name(s)

| 5

| [[135/128]]

| {{monzo| -7 3 1 }}

| 92.18

| Layobi

| Mavila comma, major chroma

| 5

| [[25/24]]

| {{monzo| -3 -1 2 }}

| 70.67

| Yoyo

| Dicot comma, classic chroma

| 5

| [[250/243]]

| {{monzo| 1 -5 3 }}

| 49.17

| Triyo

| Porcupine comma, maximal diesis

| 5

| [[20000/19683]]

| {{monzo| 5 -9 4 }}

| 27.66

| Saquadyo

| Tetracot comma, minimal diesis

| 5

| [[81/80]]

| {{monzo| -4 4 -1 }}

| 21.51

| Gu

| Syntonic comma, Didymus' comma, meantone comma

| 5

| [[1600000/1594323|(14 digits)]]

| {{monzo| 9 -13 5 }}

| 6.15

| Saquinyo

| [[Amity comma]]

| 7

| <abbr title="1119744/1071875">(14 digits)</abbr>

| {{monzo| 9 7 -5 -3 }}

| 75.64

| Triru-aquingu

| [[Superpine comma]]

| 7

| [[36/35]]

| {{monzo| 2 2 -1 -1 }}

| 48.77

| Rugu

| Mint comma, septimal quartertone

| 7

| [[525/512]]

| {{monzo| -9 1 2 1 }}

| 43.41

| Lazoyoyo

| Avicennma, Avicenna's enharmonic diesis

| 7

| [[64/63]]

| {{monzo| 6 -2 0 -1 }}

| 27.26

| Ru

| Septimal comma, Archytas' comma, Leipziger Komma

| 7

| [[875/864]]

| {{monzo| -5 -3 3 1 }}

| 21.90

| 7

| [[5120/5103]]

| {{monzo| 10 -6 1 -1 }}

| 5.76

| Saruyo

| Hemifamity comma

| 7

| [[6144/6125]]

| {{monzo| 11 1 -3 -2 }}

| 5.36

| Sarurutriyo

| Porwell comma

| 7

| [[4375/4374]]

| {{monzo| -1 -7 4 1 }}

| 0.40

| 7

| <abbr title="140737488355328/140710042265625">(30 digits)</abbr>

| {{monzo| 47 -7 -7 -7 }}

| 0.34

| Trisa-rugu

| [[Akjaysma]]

|-

| {{monzo| -5 1 0 0 1}}

| Io comma, undecimal quartertone

| 11

| [[100/99]]

| {{monzo| 2 -2 2 0 -1 }}

| 17.40

| Luyoyo

| Ptolemisma

| 11

| [[121/120]]

| {{monzo| -3 -1 -1 0 2 }}

| 14.37

| Lologu

| Biyatisma

| 11

| [[176/175]]

| {{monzo| 4 0 -2 -1 1 }}

| 9.86

| 11

| [[65536/65219]]

| {{monzo| 16 0 0 -2 -3 }}

| 8.39

| Satrilu-aruru

| Orgonisma

| 11

| [[243/242]]

| {{monzo| -1 5 0 0 -2 }}

| 7.14

| Lulu

| Rastma

| 11

| [[385/384]]

| {{monzo| -7 -1 1 1 1 }}

| 4.50

| 11

| [[4000/3993]]

| {{monzo| 5 -1 3 0 -3 }}

| 3.03

|-

| 13

| {{monzo| -1 3 0 0 0 -1 }}

| 65.33

| 26.84

|  

| Wilsorma

 

1/7 can be considered the intersection of sharp [[porcupine]] and flat [[tetracot]] temperaments, as three steps makes a 4th and four a 5th. 2/7 can be interpreted as critically flat [[Mohajira]] or critically sharp [[amity]], and creates mosses of 322 and 2221.

 

3/7 is on the intersection of [[meantone]] and [[mavila]], and has MOS's of 331 and 21211, making 7edo the first edo with a non-equalized, non-1L''n''s [[pentatonic]] mos. This is in part because 7edo is close to low-complexity JI for its size, and is the second edo with a good fifth for its size (after [[5edo]]), the fifth serving as a generator for the edo's meantone and mavila interpertations.

 

 

 

; [[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. The 2.3.11.13 WE tuning and 2.3.11.13 [[TE]] tuning both do this.

 

; [[18ed6]]  

 

; [[WE|7et, 2.3.5.11.13 WE]]  

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. Its 2.3.5.11.13 WE tuning and 2.3.5.11.13 [[TE]] tuning both do this.

 

; [[zpi|15zpi]]  

 

; [[11edt]]  

 

* [[Lumatone mapping for 7edo]]

 

 

7edo ear-training exercises by Alex Ness available [https://drive.google.com/folderview?id=0BwsXD8q2VCYUT3VEZUVmeVZUcmc&usp=drive_web#list here].

 

 

 

[[Category:3-limit record edos|#]] <!-- 1-digit number -->

[[Category:7-tone scales]]