14edo: Difference between revisions

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The ~~'''14 equal divisions~~ of the ~~octave'''~~ (~~'''14edo''')~~, or the ~~'''14(~~-~~tone~~) ~~equal temperament''' ('''14tet'''~~, ~~'''14et''') when viewed from a~~ [[~~regular temperament~~]] ~~perspective~~, ~~is the tuning~~ that ~~divides the~~ [[~~octave~~]] ~~into fourteen equal steps of about 86~~ [[~~cent~~]]s~~. 14edo contains~~ [[~~7edo~~]]~~, doubling its number~~ of ~~tones~~.

== Theory ==

The character of 14edo does not well serve those seeking low-[[limit]] JI approaches, with the exception of [[Subgroup|5:7:9:11:17:19]] (which is quite well approximated, relative to other JI approximations of the low-numbered edos). However, the [[ratio]]s 7/5, 7/6, 9/7, 10/7, 10/9, 11/7, 11/9, and 11/10 are all recognizably approximated, and if you accept that 14edo offers approximations of these intervals, you end up with a low-complexity, high-damage [[11-limit]] temperament where the [[comma]]s listed later in this page are [[tempered out]]. This leads to some of the bizarre equivalences described in the second "Approximate ratios" column in the table.

~~== Theory ==~~

14et has quite a bit of [[xenharmonic]] appeal, in a similar way to [[17edo|17et]], on account of having three types of 3rd and three types of 6th, rather than the usual two of [[12et]]. Since 14et also has a recognizable 4th and 5th, this makes it good for those wishing to explore alternative triadic harmonies without adding significantly more notes. It possesses a [[triad]]-rich 9-note [[mos scale]] of [[5L 4s]], wherein 7 of 9 notes are [[tonic]] to a subminor, supermajor, and/or neutral triad.

~~The character~~ of ~~14edo does not well serve those seeking low-limit JI approaches~~, ~~with~~ the ~~exception~~ of ~~5:7:9:11:17:19 (which is quite well approximated~~, ~~relative~~ to ~~other JI approximations of the low~~-~~numbered EDOs). However, the ratios 7/5, 7/6,~~ 9/7, ~~10/~~7~~, 10/~~9, ~~11/7, 11/9~~, and 11/10 are all recognizably approximated, and if you accept that 14edo offers approximations of these intervals, you end up with a low-complexity, high-damage 11-limit temperament where the commas listed at the bottom of this page are tempered out. This leads to some of the bizarre equivalences described in the second "Approximate Ratios" column in the table below.

~~14et has quite a bit of xenharmonic appeal, in a similar way to 17et, on account of having three types of 3rd and three types of 6th, rather than~~ the ~~usual two of 12et. Since 14et also has a recognizable 4th and 5th~~, ~~this makes it good~~ for ~~those wishing to explore alternative~~ triadic ~~harmonies without adding significantly more notes. It possesses a triad-rich~~ 9~~-note MOS scale of~~ [[~~5L 4s~~]], ~~wherein 7 of 9 notes are tonic to~~ a ~~subminor, supermajor, and/or~~ neutral ~~triad~~.

14edo contains an [[omnidiatonic]] scale that can replace the standard diatonic scale, allowing for recognizable triadic harmony using the chords [[6:7:9]] and [[14:18:21]], as well as a neutral chord which can be seen as [[2:sqrt(6):3]].

=== Prime harmonics ===

== ~~Intervals~~ ==

=== Octave stretch ===

14edo benefits from [[octave stretch]] as harmonics 3, 7, and 11 are all tuned flat. [[22edt]], [[36ed6]] and [[42zpi]] are among the possible choices.

=== Subsets and supersets ===

Since 14 factors into primes as 2 × 7, 14edo contains [[2edo]] and [[7edo]] as subsets.

== Notation ==

=== Ups and downs notation ===

{| class="wikitable center-all right-3"

|-

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! Cents

! Approximate [[Harmonic]]s

! Approximate Ratios 1 <ref>~~based on treating 14edo as a~~ 2.7/5.9/5.11/5.17/5.19/5 [[subgroup]]~~; other approaches are possible.~~</ref>

! Approximate Ratios 1 <ref group="note">{{sg|limit=2.7/5.9/5.11/5.17/5.19/5 [[subgroup]]}}</ref>

! Approximate Ratios 2 <ref>~~based~~ on treating 14edo as an 11-limit temperament of {{val| 14 22 32 39 48}} (14c)</ref>

! Approximate Ratios 2 <ref group="note">Based on treating 14edo as an 11-limit temperament of {{val| 14 22 32 39 48}} (14c).</ref>

! Approximate Ratios 3 <ref>~~nearest~~ 15-odd-limit intervals by direct ~~mapping~~</ref>

! Approximate Ratios 3 <ref group="note">Nearest 15-odd-limit intervals by [[direct approximation]].</ref>

! colspan="3" | [[Ups and ~~Downs Notation~~]]

! colspan="3" | [[Ups and downs notation]]

! Interval Type

! Audio

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| D

| Unison

|

| [[File:piano_0_1edo.mp3]]

|-

| 1

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| ^D, vE

| Narrow Minor 2nd

| [[File:~~audacity_pluck_1_14~~.~~wav~~]]

| [[File:piano_1_14edo.mp3]]

|-

| 2

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| E

| Neutral 2nd

| [[File:~~audacity_pluck_2_14~~.~~wav~~]]

| [[File:piano_1_7edo.mp3]]

|-

| 3

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| ^E, vF

| Subminor 3rd

| [[File:~~audacity_pluck_3_14~~.~~wav~~]]

| [[File:piano_3_14edo.mp3]]

|-

| 4

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| F

| Neutral 3rd

| [[File:~~audacity_pluck_4_14~~.~~wav~~]]

| [[File:piano_2_7edo.mp3]]

|-

| 5

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| ^F, vG

| Supermajor 3rd

| [[File:~~audacity_pluck_5_14~~.~~wav~~]]

| [[File:piano_5_14edo.mp3]]

|-

| 6

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| G

| Wide 4th

| [[File:~~audacity_pluck_6_14~~.~~wav~~]]

| [[File:piano_3_7edo.mp3]]

|-

| 7

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| ^G, vA

| Tritone

| [[File:~~audacity_pluck_6_12~~.~~wav~~]]

| [[File:piano_1_2edo.mp3]]

|-

| 8

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| A

| Narrow 5th

| [[File:~~audacity_pluck_8_14~~.~~wav~~]]

| [[File:piano_4_7edo.mp3]]

|-

| 9

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| ^A, vB

| Subminor 6th

| [[File:~~audacity_pluck_9_14~~.~~wav~~]]

| [[File:piano_9_14edo.mp3]]

|-

| 10

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| B

| Neutral 6th

| [[File:~~audacity_pluck_10_14~~.~~wav~~]]

| [[File:piano_5_7edo.mp3]]

|-

| 11

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| ^B, vC

| Supermajor 6th

| [[File:~~audacity_pluck_11_14~~.~~wav~~]]

| [[File:piano_11_14edo.mp3]]

|-

| 12

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| C

| Neutral 7th

| [[File:~~audacity_pluck_12_14~~.~~wav~~]]

| [[File:piano_6_7edo.mp3]]

|-

| 13

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| ^C, vD

| Wide Major 7th

| [[File:~~audacity_pluck_13_14~~.~~wav~~]]

| [[File:piano_13_14edo.mp3]]

|-

| 14

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| D

| Octave

| [[File:~~audacity_pluck_octave~~.~~wav~~]]

| [[File:piano_1_1edo.mp3]]

|}

=== Sagittal notation ===

This notation uses the same sagittal sequence as [[9edo#Sagittal notation|9-EDO]], is a subset of the notations for EDOs [[28edo#Sagittal notation|28]] and [[42edo#Second-best fifth notation|42b]], and is a superset of the notation for [[7edo#Sagittal notation|7-EDO]].

<~~references~~ />

File:14-EDO_Sagittal.svg

desc none

rect 80 0 300 50 [[Sagittal_notation]]

rect 423 0 583 80 [https://sagittal.org#periodic-table Periodic table of EDOs with sagittal notation]

rect 20 80 423 106 [[Fractional_3-limit_notation#Bad-fifths_limma-fraction_notation | limma-fraction notation]]

default [[File:14-EDO_Sagittal.svg]]

</imagemap>

=== Ivor Darreg's notation ===

[[Ivor Darreg]] wrote in [http://www.tonalsoft.com/sonic-arts/darreg/dar15.htm this article]:

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|}

=== Chord names ===

== Chord names ==

Ups and downs can be used to name 14edo chords. Because every interval is perfect, the quality can be omitted, and the words major, minor, augmented and diminished are never used. Alterations are always enclosed in parentheses, additions never are. An up or down immediately after the chord root affects the 3rd, 6th, 7th, and/or the 11th (every other note of a stacked-3rds chord 6-1-3-5-7-9-11-13).

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0-3-8-11 = C vE G vB = Cv7 = C down-seven

For a more complete list, see [[Ups and ~~Downs Notation~~ #Chords and Chord Progressions]].

For a more complete list, see [[Ups and downs notation #Chords and Chord Progressions]].

== JI ~~approximation~~ ==

== Approximation to JI ==

=== Selected just intervals by error ===

==== Selected 13-limit intervals ====

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== Regular temperament properties ==

{| class="wikitable center-4 center-5 center-6"

! rowspan="2" | Subgroup

|-

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

! rowspan="2" | [[Comma list]]

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

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| 2.3.7

| 49/48, 2187/2048

| [{{~~val~~| 14 22 39 }}]

| {{mapping| 14 22 39 }}

| +6.52

| 4.64

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| 2.3.7.11

| 33/32, 49/48, 243/242

| [{{~~val~~| 14 22 39 48 }}]

| {{mapping| 14 22 39 48 }}

| +7.58

| 4.42

| 5.12

|}

=== Uniform maps ===

=== Rank-2 temperaments ===

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=== Commas ===

~~14edo~~ [[tempers out]] the following [[comma]]s. This assumes the [[val]] {{val| 14 22 33 39 48 52 }}.

14et [[tempering out|tempers out]] the following [[comma]]s. This assumes the [[val]] {{val| 14 22 33 39 48 52 }}.

{| class="commatable wikitable center-all left-3 right-4 left-6"

|-

! [[Harmonic limit|Prime ~~Limit~~]]

! [[Harmonic limit|Prime limit]]

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

! [[Ratio]]<ref group="note">{{rd}}</ref>

! [[Monzo]]

! [[Cent]]s

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| 113.69

| Lawa

| ~~Apotome~~

| Whitewood comma, apotome

|-

| 5

| [[27/25]]

| {{monzo| 0 -3 2 }}

| 133.24

| Gugu

| Bug comma, large limma

|-

| 5

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| Sagugu

| Diaschisma

|-

|7

|[[21/20]]

|[-2 1 -1 1⟩

|84.47

|Zogu

|Chroma

|-

| 7

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| 48.77

| Rugu

| ~~Septimal~~ quartertone

| Mint comma, septimal quartertone

|-

| 7

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| 35.70

| Zozo

| ~~Slendro~~ diesis

| Sempahoresma, slendro diesis

|-

| 7

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| 6.48

| Satrizo-agu

| Hemimage

| Hemimage comma

|-

| 7

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| 19.13

| Thozogu

| Superleap

| Superleap comma, biome comma

|-

| 13

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| Island comma

|}

== Scales ==

* 5 4 5 - [[MOS~~]] of [[2L 1s]]~~

=== MOS scales ===

* 4 1 4 1 4 - [[MOS]] of [[3L 2s]]

{{Main|List of MOS scales in {{PAGENAME}}}}

* 3 3 2 3 3 - [[MOS]] of [[4L 1s]]

* 3 1 3 3 1 3 - [[MOS]] of [[4L 2s]]

* 3 2 2 2 2 3 - [[MODMOS]] of [[2L 4s]]

* 3 1 3 1 3 3 - [[MODMOS]] of [[4L 2s]]

* 2 2 1 2 2 2 1 2 - [[MOS]] of [[6L 2s]]

* 2 1 2 2 2 2 1 2 - [[MODMOS]] of ~~[[6L 2s]]~~

* 2 1 2 1 2 1 2 1 2 - [[MOS~~]] of [[5L 4s]]~~

* 1 2 1 2 1 1 2 1 2 1 - [[MOS]] of [[4L 6s]]

* 1 2 1 1 1 2 1 1 1 2 1 - [[MOS]] of [[3L 8s]]

* 1 1 2 1 1 1 1 1 2 1 1 1 [[MOS]] of [[2L 10s]]

* 1 1 1 1 1 3 1 1 1 1 1 1 [[MOS]] of [[1L 11s]]

* 1 1 1 1 1 1 2 1 1 1 1 1 1 [[MOS]] of [[1L 12s]]

Here are the modes that create MOS scales in 14edo shown on horagrams from Scala, skipping multiples of 14:

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[[File:Screen Shot 2020-04-23 at 11.47.30 PM.png|none|thumb|870x870px|5\14 MOS using 1L 1s, 2L 1s, 3L 2s, 3L 5s, 3L 8s]]

=== ~~Titanium~~[9] ===

==== Beep[9] ====

14edo is also the largest edo whose patent val [[support]]s [[~~titanium~~]] temperament, tempering out the chromatic semitone (21:20), and falling toward the "brittle" (fifths wider than in 9edo) end of that spectrum. ~~Titanium~~ is one of the simplest 7-limit temperaments, although rather inaccurate (the 7:5 is mapped onto 6\14, over 70 cents flat). Its otonal/major and utonal/minor tetrads are inversions of one another, which allows a greater variety of chord progressions (since different inversions of the same chord may have very different expressive qualities). Despite being so heavily tempered, the tetrads are still recognizable and aren't unpleasant-sounding as long as one uses the right timbres ("bell-like" or opaque-sounding ones probably work best). ~~Titanium~~ forms enneatonic modes which are melodically strong and are very similar to diatonic modes, only with two mediants and submediants instead of one. ~~Titanium~~[9] has similarities to mavila, slendro, and pelog scales as well.

14edo is also the largest edo whose patent val [[support]]s [[beep]] temperament, tempering out the chromatic semitone (21:20), and falling toward the "brittle" (fifths wider than in 9edo) end of that spectrum. beep is one of the simplest 7-limit temperaments, although rather inaccurate (the 7:5 is mapped onto 6\14, over 70 cents flat). Its otonal/major and utonal/minor tetrads are inversions of one another, which allows a greater variety of chord progressions (since different inversions of the same chord may have very different expressive qualities). Despite being so heavily tempered, the tetrads are still recognizable and aren't unpleasant-sounding as long as one uses the right timbres ("bell-like" or opaque-sounding ones probably work best). beep forms enneatonic modes which are melodically strong and are very similar to diatonic modes, only with two mediants and submediants instead of one. Beep[9] has similarities to mavila, slendro, and pelog scales as well.

Using ~~titanium~~[9], we could name the intervals of 14edo as follows. The 3, 5, 6, 8, 9, and 11-step intervals are all consonant, while 1, 2, 4, 7, 10, 12, and 13 steps are dissonant. There is no distinction between "perfect" (modulatory) and "imperfect" (major/minor) consonances here; there are enough chords here that root motion may occur by ''any'' consonant interval, and thus ''all'' six consonances are "perfect" intervals, rather than just two of them as in the diatonic system. As in the diatonic scale, the perfect intervals come in pairs separated by a major second, and with a characteristic dissonance between them; in ~~titanium~~[9] there are three such pairs rather than just one.

Using beep[9], we could name the intervals of 14edo as follows. The 3, 5, 6, 8, 9, and 11-step intervals are all consonant, while 1, 2, 4, 7, 10, 12, and 13 steps are dissonant. There is no distinction between "perfect" (modulatory) and "imperfect" (major/minor) consonances here; there are enough chords here that root motion may occur by ''any'' consonant interval, and thus ''all'' six consonances are "perfect" intervals, rather than just two of them as in the diatonic system. As in the diatonic scale, the perfect intervals come in pairs separated by a major second, and with a characteristic dissonance between them; in beep[9] there are three such pairs rather than just one.

* 1\14: Minor 2nd9: functions similarly to the diatonic minor second, but is more incisive.

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* 13\14: Major 9th9: A high, incisive leading tone.

* 14\14: The 10th9 or "enneatonic decave" (i. e. the octave, 2:1).

=== Others ===

* 2 2 2 2 2 2 2 - [[Equiheptatonic]] (exactly [[7edo]])

* 2 2 2 2 1 4 1 - Fennec{{idiosyncratic}} (original/default tuning)

* 1 4 1 2 2 2 2 - Inverse fennec{{idiosyncratic}} (original/default tuning)

* 3 1 4 1 4 1 - Pseudo-[[augmented]]

* 1 4 1 2 1 4 1 - Pseudo-double harmonic minor

== Diagrams ==

[[File:14edo_wheel.png|alt=14edo wheel.png|343x343px|14edo wheel.png]]

~~== Books ==~~

~~[[File:Libro_Tetradecafónico.PNG|alt=Libro_Tetradecafónico.PNG|Libro_Tetradecafónico.PNG]]~~

~~''Sword, Ron. "Tetradecaphonic Scales for Guitar" IAAA Press. First Ed: June 2009.''~~

~~== Music ==~~

~~{{See also|:Category:14edo tracks}}~~

~~; [[Knowsur]]~~

* [http://split-notes.com/004/ ''NANA WODORI'']

~~; [[Stephen Weigel]]~~

* [https://soundcloud.com/overtoneshock/our-pixel-perfect-telephone-discussion-14-edo ''Our Pixel Perfect Dial Tone of Voice'']

~~; [[Ralph Lewis]]~~

* [http://micro.soonlabel.com/0-praxis/audio/August/august_03_thereminnards.mp3 ''Thereminnards'']

~~; [[Philip Schuessler]]~~

* ''Pendula (for amplified trombone)''

~~; [[Ralph Jarzombek]] ([http://www.freewebs.com/ralphjarzombek/ site])~~

~~; [[Daniel Wolf]]~~

* [http://home.snafu.de/djwolf/IvorDarregInEagleRock.pdf ''Ivor Darreg in Eagle Rock''] (score)

~~; [[Chris Vaisvil]] [http://chrisvaisvil.com/?p=943 site]~~

* [http://micro.soonlabel.com/14-et/daily20110610-sax-Riding_The_L.mp3 ''Riding the L'']

~~; [[Jon Lyle Smith]]~~

* [http://clones.soonlabel.com/public/micro/jon-lyle-smith/Thorium%20Road.mp3 ''Thorium Road'']{{dead link}}

* [http://archive.org/download/tranSentient/tranSentient.mp3 ''tranSentient'']{{dead link}}

* [http://archive.org/download/TheSpectrumOfDesire/the_spectrum_of_desire.mp3 ''the spectrum of desire'']{{dead link}}

~~; [[Herman Miller]]~~

* [https://sites.google.com/site/teamouse/home ''This Way to the Egress''] [http://clones.soonlabel.com/public/micro/gene_ward_smith/Others/Herman/egress-gpo.mp3 play]{{dead link}}

~~; [[Jacob Barton]]~~

* [https://www.soundclick.com/music/songInfo.cfm?songID=3680443 Hyperimprovisation 'Tasty'] [http://clones.soonlabel.com/public/micro/gene_ward_smith/Others/Barton/Hyperimprovisation%20Tasty.mp3 play]{{dead link}}

~~; [[Aaron Andrew Hunt]]~~

* [http://www.h-pi.com/mp3/14ETPrelude.mp3 ''14ETPrelude'']{{dead link}}

~~; [[Mark Allan Barnes]]~~

* [https://youtu.be/mHyaW1fVWsg ''Medicine Wheel'']

~~; [[Cameron Bobro]]~~

* [http://micro.soonlabel.com/gene_ward_smith/Others/Bobro/Fourteen_EDO_CBobro_r8b.mp3 ''Fourteen EDO'']{{dead link}}

~~; [[Yin Bell]]~~

* [https://soundcloud.com/yinbell/study-in-a-newly-discovered-scale ''Study in a newly discovered 14-ET'']

== Software support ==

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[[File:SA14 for Mus2.zip]]

[[File:14edo_mus2.jpg|~~frame|left~~]]

[[File:14edo_mus2.jpg|thumb]]

== Music ==

== See also ==

* [[Lumatone mapping for 14edo]]

* [[MisterShafXen’s take on 14edo harmony]]

== Further reading ==

[[File:Libro_Tetradecafónico.PNG|alt=Libro_Tetradecafónico.PNG|Libro_Tetradecafónico.PNG|thumb|''Tetradecaphonic Scales for Guitar'' cover art.]]

* [[Sword, Ron]]. ''[http://www.metatonalmusic.com/books.html Tetradecaphonic Scales for Guitar: Scales, Chord-Scales, Notation, and Theory for Fourteen Equal Divisions of the Octave]''. 2009.

[[Category:14edo| ]]

[[Category:Equal divisions of the octave|##]]

~~[[Category:Listen]]~~

[[Category:Modes]]

[[Category:Teentuning]]

@@ Line 6: / Line 6: @@
 }}
 {{Infobox ET}}
+{{ED intro}}
-The '''14 equal divisions of the octave''' ('''14edo'''), or the '''14(-tone) equal temperament''' ('''14tet''', '''14et''') when viewed from a [[regular temperament]] perspective, is the tuning that divides the [[octave]] into fourteen equal steps of about 86 [[cent]]s. 14edo contains [[7edo]], doubling its number of tones.
+== Theory ==
+The character of 14edo does not well serve those seeking low-[[limit]] JI approaches, with the exception of [[Subgroup|5:7:9:11:17:19]] (which is quite well approximated, relative to other JI approximations of the low-numbered edos). However, the [[ratio]]s 7/5, 7/6, 9/7, 10/7, 10/9, 11/7, 11/9, and 11/10 are all recognizably approximated, and if you accept that 14edo offers approximations of these intervals, you end up with a low-complexity, high-damage [[11-limit]] temperament where the [[comma]]s listed later in this page are [[tempered out]]. This leads to some of the bizarre equivalences described in the second "Approximate ratios" column in the table.
-== Theory ==
+et has quite a bit of [[xenharmonic]] appeal, in a similar way to [[17edo|17et]], on account of having three types of 3rd and three types of 6th, rather than the usual two of [[12et]]. Since 14et also has a recognizable 4th and 5th, this makes it good for those wishing to explore alternative triadic harmonies without adding significantly more notes. It possesses a [[triad]]-rich 9-note [[mos scale]] of [[5L&nbsp;4s]], wherein 7 of 9 notes are [[tonic]] to a subminor, supermajor, and/or neutral triad.
-The character of 14edo does not well serve those seeking low-limit JI approaches, with the exception of 5:7:9:11:17:19 (which is quite well approximated, relative to other JI approximations of the low-numbered EDOs). However, the ratios 7/5, 7/6, 9/7, 10/7, 10/9, 11/7, 11/9, and 11/10 are all recognizably approximated, and if you accept that 14edo offers approximations of these intervals, you end up with a low-complexity, high-damage 11-limit temperament where the commas listed at the bottom of this page are tempered out. This leads to some of the bizarre equivalences described in the second "Approximate Ratios" column in the table below.
-et has quite a bit of xenharmonic appeal, in a similar way to 17et, on account of having three types of 3rd and three types of 6th, rather than the usual two of 12et. Since 14et also has a recognizable 4th and 5th, this makes it good for those wishing to explore alternative triadic harmonies without adding significantly more notes. It possesses a triad-rich 9-note MOS scale of [[5L 4s]], wherein 7 of 9 notes are tonic to a subminor, supermajor, and/or neutral triad.
+edo contains an [[omnidiatonic]] scale that can replace the standard diatonic scale, allowing for recognizable triadic harmony using the chords [[6:7:9]] and [[14:18:21]], as well as a neutral chord which can be seen as [[2:sqrt(6):3]].
 === Prime harmonics ===
 {{Harmonics in equal|14}}
-== Intervals ==
+=== Octave stretch ===
+edo benefits from [[octave stretch]] as harmonics 3, 7, and 11 are all tuned flat. [[22edt]], [[36ed6]] and [[42zpi]] are among the possible choices.
+=== Subsets and supersets ===
+Since 14 factors into primes as 2 × 7, 14edo contains [[2edo]] and [[7edo]] as subsets.
+== Notation ==
+=== Ups and downs notation ===
 {| class="wikitable center-all right-3"
 |-
@@ Line 23: / Line 31: @@
 ! Cents
 ! Approximate<br>[[Harmonic]]s
-! Approximate<br>Ratios 1 <ref>based on treating 14edo as a 2.7/5.9/5.11/5.17/5.19/5 [[subgroup]]; other approaches are possible.</ref>
+! Approximate<br>Ratios 1 <ref group="note">{{sg|limit=2.7/5.9/5.11/5.17/5.19/5 [[subgroup]]}}</ref>
-! Approximate<br>Ratios 2 <ref>based on treating 14edo as an 11-limit temperament of {{val| 14 22 32 39 48}} (14c)</ref>
+! Approximate<br>Ratios 2 <ref group="note">Based on treating 14edo as an 11-limit temperament of {{val| 14 22 32 39 48}} (14c).</ref>
-! Approximate<br>Ratios 3 <ref>nearest 15-odd-limit intervals by direct mapping</ref>
+! Approximate<br>Ratios 3 <ref group="note">Nearest 15-odd-limit intervals by [[direct approximation]].</ref>
-! colspan="3" | [[Ups and Downs Notation]]
+! colspan="3" | [[Ups and downs notation]]
 ! Interval Type
 ! Audio
@@ Line 40: / Line 48: @@
 | D
 | Unison
-|
+| [[File:piano_0_1edo.mp3]]
 |-
 | 1
@@ Line 52: / Line 60: @@
 | ^D, vE
 | Narrow Minor 2nd
-| [[File:audacity_pluck_1_14.wav]]
+| [[File:piano_1_14edo.mp3]]
 |-
 | 2
@@ Line 64: / Line 72: @@
 | E
 | Neutral 2nd
-| [[File:audacity_pluck_2_14.wav]]
+| [[File:piano_1_7edo.mp3]]
 |-
 | 3
@@ Line 76: / Line 84: @@
 | ^E, vF
 | Subminor 3rd
-| [[File:audacity_pluck_3_14.wav]]
+| [[File:piano_3_14edo.mp3]]
 |-
 | 4
@@ Line 88: / Line 96: @@
 | F
 | Neutral 3rd
-| [[File:audacity_pluck_4_14.wav]]
+| [[File:piano_2_7edo.mp3]]
 |-
 | 5
@@ Line 100: / Line 108: @@
 | ^F, vG
 | Supermajor 3rd
-| [[File:audacity_pluck_5_14.wav]]
+| [[File:piano_5_14edo.mp3]]
 |-
 | 6
@@ Line 112: / Line 120: @@
 | G
 | Wide 4th
-| [[File:audacity_pluck_6_14.wav]]
+| [[File:piano_3_7edo.mp3]]
 |-
 | 7
@@ Line 124: / Line 132: @@
 | ^G, vA
 | Tritone
-| [[File:audacity_pluck_6_12.wav]]
+| [[File:piano_1_2edo.mp3]]
 |-
 | 8
@@ Line 136: / Line 144: @@
 | A
 | Narrow 5th
-| [[File:audacity_pluck_8_14.wav]]
+| [[File:piano_4_7edo.mp3]]
 |-
 | 9
@@ Line 148: / Line 156: @@
 | ^A, vB
 | Subminor 6th
-| [[File:audacity_pluck_9_14.wav]]
+| [[File:piano_9_14edo.mp3]]
 |-
 | 10
@@ Line 160: / Line 168: @@
 | B
 | Neutral 6th
-| [[File:audacity_pluck_10_14.wav]]
+| [[File:piano_5_7edo.mp3]]
 |-
 | 11
@@ Line 172: / Line 180: @@
 | ^B, vC
 | Supermajor 6th
-| [[File:audacity_pluck_11_14.wav]]
+| [[File:piano_11_14edo.mp3]]
 |-
 | 12
@@ Line 184: / Line 192: @@
 | C
 | Neutral 7th
-| [[File:audacity_pluck_12_14.wav]]
+| [[File:piano_6_7edo.mp3]]
 |-
 | 13
@@ Line 196: / Line 204: @@
 | ^C, vD
 | Wide Major 7th
-| [[File:audacity_pluck_13_14.wav]]
+| [[File:piano_13_14edo.mp3]]
 |-
 | 14
@@ Line 208: / Line 216: @@
 | D
 | Octave
-| [[File:audacity_pluck_octave.wav]]
+| [[File:piano_1_1edo.mp3]]
 |}
+<references group="note" />
+=== Sagittal notation ===
+This notation uses the same sagittal sequence as [[9edo#Sagittal notation|9-EDO]], is a subset of the notations for EDOs [[28edo#Sagittal notation|28]] and [[42edo#Second-best fifth notation|42b]], and is a superset of the notation for [[7edo#Sagittal notation|7-EDO]].
-<references />
+<imagemap>
+File:14-EDO_Sagittal.svg
+desc none
+rect 80 0 300 50 [[Sagittal_notation]]
+rect 423 0 583 80 [https://sagittal.org#periodic-table Periodic table of EDOs with sagittal notation]
+rect 20 80 423 106 [[Fractional_3-limit_notation#Bad-fifths_limma-fraction_notation | limma-fraction notation]]
+default [[File:14-EDO_Sagittal.svg]]
+</imagemap>
+=== Ivor Darreg's notation ===
 [[Ivor Darreg]] wrote in [http://www.tonalsoft.com/sonic-arts/darreg/dar15.htm this article]:
@@ Line 226: / Line 246: @@
 |}
-=== Chord names ===
+== Chord names ==
 Ups and downs can be used to name 14edo chords. Because every interval is perfect, the quality can be omitted, and the words major, minor, augmented and diminished are never used. Alterations are always enclosed in parentheses, additions never are. An up or down immediately after the chord root affects the 3rd, 6th, 7th, and/or the 11th (every other note of a stacked-3rds chord 6-1-3-5-7-9-11-13).
@@ Line 239: / Line 259: @@
 -3-8-11 = C vE G vB = Cv7 = C down-seven
-For a more complete list, see [[Ups and Downs Notation #Chords and Chord Progressions]].
+For a more complete list, see [[Ups and downs notation #Chords and Chord Progressions]].
-== JI approximation ==
+== Approximation to JI ==
 === Selected just intervals by error ===
 ==== Selected 13-limit intervals ====
@@ Line 248: / Line 268: @@
 == Regular temperament properties ==
 {| class="wikitable center-4 center-5 center-6"
-! rowspan="2" | Subgroup
+|-
+! rowspan="2" | [[Subgroup]]
 ! rowspan="2" | [[Comma list]]
 ! rowspan="2" | [[Mapping]]
@@ Line 259: / Line 280: @@
 | 2.3.7
 | 49/48, 2187/2048
-| [{{val| 14 22 39 }}]
+| {{mapping| 14 22 39 }}
 | +6.52
 | 4.64
@@ Line 266: / Line 287: @@
 | 2.3.7.11
 | 33/32, 49/48, 243/242
-| [{{val| 14 22 39 48 }}]
+| {{mapping| 14 22 39 48 }}
 | +7.58
 | 4.42
 | 5.12
 |}
+=== Uniform maps ===
+{{Uniform map|edo=14}}
 === Rank-2 temperaments ===
@@ Line 276: / Line 300: @@
 === Commas ===
-edo [[tempers out]] the following [[comma]]s. This assumes the [[val]] {{val| 14 22 33 39 48 52 }}.
+et [[tempering out|tempers out]] the following [[comma]]s. This assumes the [[val]] {{val| 14 22 33 39 48 52 }}.
 {| class="commatable wikitable center-all left-3 right-4 left-6"
 |-
-! [[Harmonic limit|Prime<br>Limit]]
+! [[Harmonic limit|Prime<br>limit]]
-! [[Ratio]]<ref>Ratios longer than 10 digits are presented by placeholders with informative hints</ref>
+! [[Ratio]]<ref group="note">{{rd}}</ref>
 ! [[Monzo]]
 ! [[Cent]]s
@@ Line 292: / Line 316: @@
 | 113.69
 | Lawa
-| Apotome
+| Whitewood comma, apotome
+|-
+| 5
+| [[27/25]]
+| {{monzo| 0 -3 2 }}
+| 133.24
+| Gugu
+| Bug comma, large limma
 |-
 | 5
@@ Line 300: / Line 331: @@
 | Sagugu
 | Diaschisma
+|-
+|7
+|[[21/20]]
+|[-2 1 -1 1⟩
+|84.47
+|Zogu
+|Chroma
 |-
 | 7
@@ Line 306: / Line 344: @@
 | 48.77
 | Rugu
-| Septimal quartertone
+| Mint comma, septimal quartertone
 |-
 | 7
@@ Line 313: / Line 351: @@
 | 35.70
 | Zozo
-| Slendro diesis
+| Sempahoresma, slendro diesis
 |-
 | 7
@@ Line 327: / Line 365: @@
 | 6.48
 | Satrizo-agu
-| Hemimage
+| Hemimage comma
 |-
 | 7
@@ Line 362: / Line 400: @@
 | 19.13
 | Thozogu
-| Superleap
+| Superleap comma, biome comma
 |-
 | 13
@@ Line 371: / Line 409: @@
 | Island comma
 |}
-<references/>
+<references group="note" />
 == Scales ==
-* 5 4 5 - [[MOS]] of [[2L 1s]]
+=== MOS scales ===
-* 4 1 4 1 4 - [[MOS]] of [[3L 2s]]
+{{Main|List of MOS scales in {{PAGENAME}}}}
-* 3 3 2 3 3 - [[MOS]] of [[4L 1s]]
-* 3 1 3 3 1 3 - [[MOS]] of [[4L 2s]]
-* 3 2 2 2 2 3 - [[MODMOS]] of [[2L 4s]]
-* 3 1 3 1 3 3 - [[MODMOS]] of [[4L 2s]]
-* 2 2 1 2 2 2 1 2 - [[MOS]] of [[6L 2s]]
-* 2 1 2 2 2 2 1 2 - [[MODMOS]] of [[6L 2s]]
-* 2 1 2 1 2 1 2 1 2 - [[MOS]] of [[5L 4s]]
-* 1 2 1 2 1 1 2 1 2 1 - [[MOS]] of [[4L 6s]]
-* 1 2 1 1 1 2 1 1 1 2 1 - [[MOS]] of [[3L 8s]]
-* 1 1 2 1 1 1 1 1 2 1 1 1 [[MOS]] of [[2L 10s]]
-* 1 1 1 1 1 3 1 1 1 1 1 1 [[MOS]] of [[1L 11s]]
-* 1 1 1 1 1 1 2 1 1 1 1 1 1 [[MOS]] of [[1L 12s]]
 Here are the modes that create MOS scales in 14edo shown on horagrams from Scala, skipping multiples of 14:
@@ Line 393: / Line 419: @@
 [[File:Screen Shot 2020-04-23 at 11.47.30 PM.png|none|thumb|870x870px|5\14 MOS using 1L 1s, 2L 1s, 3L 2s, 3L 5s, 3L 8s]]
-=== Titanium[9] ===
+==== Beep[9] ====
-edo is also the largest edo whose patent val [[support]]s [[titanium]] temperament, tempering out the chromatic semitone (21:20), and falling toward the "brittle" (fifths wider than in 9edo) end of that spectrum. Titanium is one of the simplest 7-limit temperaments, although rather inaccurate (the 7:5 is mapped onto 6\14, over 70 cents flat). Its otonal/major and utonal/minor tetrads are inversions of one another, which allows a greater variety of chord progressions (since different inversions of the same chord may have very different expressive qualities). Despite being so heavily tempered, the tetrads are still recognizable and aren't unpleasant-sounding as long as one uses the right timbres ("bell-like" or opaque-sounding ones probably work best). Titanium forms enneatonic modes which are melodically strong and are very similar to diatonic modes, only with two mediants and submediants instead of one. Titanium[9] has similarities to mavila, slendro, and pelog scales as well.
+edo is also the largest edo whose patent val [[support]]s [[beep]] temperament, tempering out the chromatic semitone (21:20), and falling toward the "brittle" (fifths wider than in 9edo) end of that spectrum. beep is one of the simplest 7-limit temperaments, although rather inaccurate (the 7:5 is mapped onto 6\14, over 70 cents flat). Its otonal/major and utonal/minor tetrads are inversions of one another, which allows a greater variety of chord progressions (since different inversions of the same chord may have very different expressive qualities). Despite being so heavily tempered, the tetrads are still recognizable and aren't unpleasant-sounding as long as one uses the right timbres ("bell-like" or opaque-sounding ones probably work best). beep forms enneatonic modes which are melodically strong and are very similar to diatonic modes, only with two mediants and submediants instead of one. Beep[9] has similarities to mavila, slendro, and pelog scales as well.
-Using titanium[9], we could name the intervals of 14edo as follows. The 3, 5, 6, 8, 9, and 11-step intervals are all consonant, while 1, 2, 4, 7, 10, 12, and 13 steps are dissonant. There is no distinction between "perfect" (modulatory) and "imperfect" (major/minor) consonances here; there are enough chords here that root motion may occur by ''any'' consonant interval, and thus ''all'' six consonances are "perfect" intervals, rather than just two of them as in the diatonic system. As in the diatonic scale, the perfect intervals come in pairs separated by a major second, and with a characteristic dissonance between them; in titanium[9] there are three such pairs rather than just one.
+Using beep[9], we could name the intervals of 14edo as follows. The 3, 5, 6, 8, 9, and 11-step intervals are all consonant, while 1, 2, 4, 7, 10, 12, and 13 steps are dissonant. There is no distinction between "perfect" (modulatory) and "imperfect" (major/minor) consonances here; there are enough chords here that root motion may occur by ''any'' consonant interval, and thus ''all'' six consonances are "perfect" intervals, rather than just two of them as in the diatonic system. As in the diatonic scale, the perfect intervals come in pairs separated by a major second, and with a characteristic dissonance between them; in beep[9] there are three such pairs rather than just one.
 * 1\14: Minor 2nd<sub>9</sub>: functions similarly to the diatonic minor second, but is more incisive.
@@ Line 412: / Line 438: @@
 * 13\14: Major 9th<sub>9</sub>: A high, incisive leading tone.
 * 14\14: The 10th<sub>9</sub> or "enneatonic decave" (i. e. the octave, 2:1).
+=== Others ===
+* 2 2 2 2 2 2 2 - [[Equiheptatonic]] (exactly [[7edo]])
+* 2 2 2 2 1 4 1 - Fennec{{idiosyncratic}} (original/default tuning)
+* 1 4 1 2 2 2 2 - Inverse fennec{{idiosyncratic}} (original/default tuning)
+* 3 1 4 1 4 1 - Pseudo-[[augmented]]
+* 1 4 1 2 1 4 1 - Pseudo-double harmonic minor
 == Diagrams ==
 [[File:14edo_wheel.png|alt=14edo wheel.png|343x343px|14edo wheel.png]]
-== Books ==
-[[File:Libro_Tetradecafónico.PNG|alt=Libro_Tetradecafónico.PNG|Libro_Tetradecafónico.PNG]]
-''Sword, Ron. "Tetradecaphonic Scales for Guitar" IAAA Press. First Ed: June 2009.''
-== Music ==
-{{See also|:Category:14edo tracks}}
-; [[Knowsur]]
-* [http://split-notes.com/004/ ''NANA WODORI'']
-; [[Stephen Weigel]]
-* [https://soundcloud.com/overtoneshock/our-pixel-perfect-telephone-discussion-14-edo ''Our Pixel Perfect Dial Tone of Voice'']
-; [[Ralph Lewis]]
-* [http://micro.soonlabel.com/0-praxis/audio/August/august_03_thereminnards.mp3 ''Thereminnards'']
-; [[Philip Schuessler]]
-* ''Pendula (for amplified trombone)''
-; [[Ralph Jarzombek]] ([http://www.freewebs.com/ralphjarzombek/ site])
-; [[Daniel Wolf]]
-* [http://home.snafu.de/djwolf/IvorDarregInEagleRock.pdf ''Ivor Darreg in Eagle Rock''] (score)
-; [[Chris Vaisvil]] [http://chrisvaisvil.com/?p=943 site]
-* [http://micro.soonlabel.com/14-et/daily20110610-sax-Riding_The_L.mp3 ''Riding the L'']
-; [[Jon Lyle Smith]]
-* [http://clones.soonlabel.com/public/micro/jon-lyle-smith/Thorium%20Road.mp3 ''Thorium Road'']{{dead link}}
-* [http://archive.org/download/tranSentient/tranSentient.mp3 ''tranSentient'']{{dead link}}
-* [http://archive.org/download/TheSpectrumOfDesire/the_spectrum_of_desire.mp3 ''the spectrum of desire'']{{dead link}}
-; [[Herman Miller]]
-* [https://sites.google.com/site/teamouse/home ''This Way to the Egress''] [http://clones.soonlabel.com/public/micro/gene_ward_smith/Others/Herman/egress-gpo.mp3 play]{{dead link}}
-; [[Jacob Barton]]
-* [https://www.soundclick.com/music/songInfo.cfm?songID=3680443 Hyperimprovisation 'Tasty'] [http://clones.soonlabel.com/public/micro/gene_ward_smith/Others/Barton/Hyperimprovisation%20Tasty.mp3 play]{{dead link}}
-; [[Aaron Andrew Hunt]]
-* [http://www.h-pi.com/mp3/14ETPrelude.mp3 ''14ETPrelude'']{{dead link}}
-; [[Mark Allan Barnes]]
-* [https://youtu.be/mHyaW1fVWsg ''Medicine Wheel'']
-; [[Cameron Bobro]]
-* [http://micro.soonlabel.com/gene_ward_smith/Others/Bobro/Fourteen_EDO_CBobro_r8b.mp3 ''Fourteen EDO'']{{dead link}}
-; [[Yin Bell]]
-* [https://soundcloud.com/yinbell/study-in-a-newly-discovered-scale ''Study in a newly discovered 14&#45;ET'']
 == Software support ==
@@ Line 471: / Line 453: @@
 [[File:SA14 for Mus2.zip]]
-[[File:14edo_mus2.jpg|frame|left]]
+[[File:14edo_mus2.jpg|thumb]]
+== Music ==
+{{Main|Music in 14edo}}
+{{Catrel|14edo tracks}}
 == See also ==
 * [[Lumatone mapping for 14edo]]
+* [[MisterShafXen’s take on 14edo harmony]]
+== Further reading ==
+[[File:Libro_Tetradecafónico.PNG|alt=Libro_Tetradecafónico.PNG|Libro_Tetradecafónico.PNG|thumb|''Tetradecaphonic Scales for Guitar'' cover art.]]
+* [[Sword, Ron]]. ''[http://www.metatonalmusic.com/books.html Tetradecaphonic Scales for Guitar: Scales, Chord-Scales, Notation, and Theory for Fourteen Equal Divisions of the Octave]''. 2009.
 [[Category:14edo| ]] <!-- main article -->
 [[Category:Equal divisions of the octave|##]] <!-- 2-digit number -->
-[[Category:Listen]]
 [[Category:Modes]]
 [[Category:Teentuning]]