37edo: Difference between revisions

| de = 37-EDO

| en = 37edo

| ja =

37edo has very accurate approximations of harmonics [[5/1|5]], [[7/1|7]], [[11/1|11]] and [[13/1|13]], making it a good choice for a [[no-threes subgroup temperaments|no-threes]] approach. Harmonic 11 is particularly accurate, being only 0.03 cents sharp.

Using its best (and sharp) fifth, 37edo tempers out 250/243, making it a variant of [[porcupine]] temperament. It is the [[optimal patent val]] for [[Porcupine family #Porcupinefish|porcupinefish]], which is about as accurate as 13-limit porcupine extensions will be. Using its alternative flat fifth, it tempers out [[16875/16384]], making it a [[negri]] tuning. It also tempers out 2187/2000, resulting in a temperament where three minor whole tones make up a fifth ([[gorgo]]/[[laconic]]).

37edo is also a very accurate equal tuning for [[undecimation]] temperament, which has a [[generator]] of about 519 cents; 2 generators lead to 29/16; 3 generators to 32/13; 6 generators to a 10 cent sharp 6/1; 8 generators to a very accurate 11/1 and 10 generators to 20/1. It has a [[7L 2s]] enneatonic [[mos]], which in 37edo scale degrees is 0, 1, 6, 11, 16, 17, 22, 27, 32, a scale structure reminiscent of mavila; as well as a 16-note mos.

In the no-3 [[13-odd-limit]], 37edo maintains the smallest relative error of any edo until [[851edo]], and the smallest absolute error until [[103edo]]{{clarify}}. <!-- what is the metric being used? -->

{{Harmonics in equal|37}}

=== Subsets and supersets ===

37edo is the 12th [[prime edo]], following [[31edo]] and coming before [[41edo]].  

[[74edo]], which doubles it, provides an alternative approximation to harmonic 3 that supports [[meantone]]. [[111edo]], which triples it, gives a very accurate approximation of harmonic 3, and manifests itself as a great higher-limit system. [[296edo]], which slices its step in eight, is a good 13-limit system.

* 26\37 = 843.2 cents

This means 37 is quite accurate on the 2.5.7.11.13 subgroup, where it shares the same tuning as [[111edo]]. In fact, on the larger [[k*N subgroups|3*37 subgroup]] 2.27.5.7.11.13.51.57 subgroup not only shares the same tuning as 19-limit 111edo, it tempers out the same commas. A simpler but less accurate approach is to use the 2*37-subgroup, 2.9.7.11.13.17.19, on which it has the same tuning and commas as [[74edo]].

=== Dual fifths ===

The flat fifth is 21\37 = 681.1 cents (37b val)

The sharp fifth is 22\37 = 713.5 cents

If the minor third of 259.5 cents is mapped to 7/6, this superpythagorean scale can be thought of as a variant of [[The Biosphere|Oceanfront]] temperament.

 

37edo can only barely be considered as "dual-fifth", because the sharp fifth is 12 cents sharp of 3/2, has a regular diatonic scale, and can be interpreted as somewhat accurate regular temperaments like [[archy]] and the aforementioned oceanfront. In contrast, the flat fifth is 21 cents flat and the only low-limit interpretation is as the very inaccurate [[mavila]].

Since both fifths do not support [[meantone]], the "major thirds" of both systems are not 12\37 = 389.2¢, the closest approximation to 5/4 available in 37edo.

=== No-3 approach ===

{| class="wikitable center-1 right-2"

| 13

| 421.62

| [[14/11]], [[32/25]]

{| class="wikitable center-all right-2 left-3"

|-

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

| 0.00

| 1

| 32.43

| Minor 2nd

| m2

| Eb

| 2

| 64.86

| Upminor 2nd

| ^m2

| ^Eb

| 3

| 97.30

| Downmid 2nd

| v~2

| ^^Eb

| 4

| 129.73

| Mid 2nd

| ~2

| Ed

| 5

| 162.16

| Upmid 2nd

| ^~2

| vvE

| 6

| 194.59

| Downmajor 2nd

| vM2

| vE

| 7

| 227.03

| Major 2nd

| M2

| E

| 8

| 259.46

| Minor 3rd

| m3

| F

| 9

| 291.89

| Upminor 3rd

| ^m3

| ^F

| 10

| 324.32

| Downmid 3rd

| v~3

| ^^F

| 11

| 356.76

| Mid 3rd

| ~3

| Ft

| 12

| 389.19

| Upmid 3rd

| ^~3

| vvF#

| 13

| 421.62

| Downmajor 3rd

| vM3

| vF#

| 14

| 454.05

| Major 3rd

| M3

| F#

| 15

| 486.49

| Perfect 4th

| P4

| G

| 16

| 518.92

| Up 4th, Dim 5th

| ^4, d5

| ^G, Ab

| 17

| 551.35

| Downmid 4th, Updim 5th

| v~4, ^d5

| ^^G, ^Ab

| 18

| 583.78

| Mid 4th, Downmid 5th

| ~4, v~5

| Gt, ^^Ab

| 19

| 616.22

| Mid 5th, Upmid 4th

| ~5, ^~4

| Ad, vvG#

| 20

| 648.65

| Upmid 5th, Downaug 5th

| ^~5, vA4

| vvA, vG#

| 21

| 681.08

| Down 5th, Aug 4th

| v5, A4

| vA, G#

| 22

| 713.51

| Perfect 5th

| P5

| A

| 23

| 745.95

| Minor 6th

| m6

| Bb

| 24

| 778.38

| Upminor 6th

| ^m6

| ^Bb

| 25

| 810.81

| Downmid 6th

| v~6

| ^^Bb

| 26

| 843.24

| Mid 6th

| ~6

| Bd

| 27

| 875.68

| Upmid 6th

| ^~6

| vvB

| 28

| 908.11

| Downmajor 6th

| vM6

| vB

| 29

| 940.54

| Major 6th

| M6

| B

| 30

| 972.97

| Minor 7th

| m7

| C

| 31

| 1005.41

| Upminor 7th

| ^m7

| ^C

| 32

| 1037.84

| Downmid 7th

| v~7

| ^^C

| 33

| 1070.27

| Mid 7th

| ~7

| Ct

| 34

| 1102.70

| Upmid 7th

| ^~7

| vvC#

| 35

| 1135.14

| Downmajor 7th

| vM7

| vC#

| 36

| 1167.57

| Major 7th

| M7

| C#

| 37

| 1200.00

| Perfect 8ve

| P8

| D

 

 

 

Since a sharp raises by six steps, Wyschnegradsky accidentals borrowed from [[72edo]] can also be used:

This notation uses the same sagittal sequence as EDOs [[23edo#Second-best fifth notation|23b]], [[30edo#Sagittal notation|30]], and [[44edo#Sagittal notation|44]].

rect 80 0 300 50 [[Sagittal_notation]]

rect 20 80 300 106 [[Fractional_3-limit_notation#Bad-fifths_apotome-fraction_notation | apotome-fraction notation]]

default [[File:37-EDO_Sagittal.svg]]

rect 80 0 300 50 [[Sagittal_notation]]

rect 20 80 300 106 [[Fractional_3-limit_notation#Bad-fifths_apotome-fraction_notation | apotome-fraction notation]]

default [[File:37-EDO_Alternative_Evo_Sagittal.svg]]

rect 80 0 300 50 [[Sagittal_notation]]

rect 300 0 623 80 [https://sagittal.org#periodic-table Periodic table of EDOs with sagittal notation]

rect 20 80 300 106 [[Fractional_3-limit_notation#Bad-fifths_apotome-fraction_notation | apotome-fraction notation]]

default [[File:37-EDO_Evo-SZ_Sagittal.svg]]

! [[TE error|Absolute]] (¢)

* [[List of 37et rank two temperaments by badness]]

 

== Scales ==

* [[MOS Scales of 37edo]]

* [[Chromatic pairs#Roulette|Roulette scales]]

* [[Square root of 13 over 10]]

{| class="wikitable center-1 right-2"

|1

|259.46

|[[7/6]]

|

|2

|518.92

|[[27/20]]

|

|3

|778.38

|[[11/7]]

|

|4

|1037.84

|[[20/11]], [[11/6]]

|

|5

|1297.30

|

|[[19/9]]

|6

|1556.76

|[[27/11]]

|

|7

|1816.22

|[[20/7]]

|8

|2075.68

|[[10/3]]

|

|9

|2335.14

|[[27/7]]

|10

|2594.59

|[[9/2]]

|

|11

|2854.05

|

|[[26/5]]

|12

|3113.51

|[[6/1]]

|

|13

|3372.97

|[[7/1]]

|

|14

|3632.43

|

|

|15

|3891.89

|

|[[19/2]]

|16

|4151.35

|[[11/1]]

|

|17

|4410.81

|

|

|18

|4670.27

|

|

|19

|-

|20

|5189.19

|[[20/1]]

|

 

 

 

== Music ==

 

 

* [https://www.youtube.com/watch?v=ngxSiuVadls ''A Dark Era Arises''] (2023) – in Porcupine[15], 37edo tuning

* [https://www.youtube.com/watch?v=U93XFJJ1aXw ''Two Faced People''] (2025) – in Twothirdtonic[10], 37edo tuning

 

 

* [http://www.akjmusic.com/audio/toccata_bianca_37edo.mp3 ''Toccata Bianca 37EDO'']{{dead link}}

 

 

 

 

 

 

 

 

 

* [https://www.youtube.com/watch?v=_xfvNKUu8gY ''Fugue for Klezmer Band in 37EDO Porcupine<nowiki>[</nowiki>7<nowiki>]</nowiki> sssssLs "Lemurian"''] (2023) – in Porcupine[7], 37edo tuning

 

 

 

; [[Uncreative Name]]

* [https://www.youtube.com/watch?v=rE9L56yZ1Kw ''Winter''] (2025)

; <nowiki>XENO*n*</nowiki>

* ''[https://www.youtube.com/watch?v=_m5u4VviMXw Galantean Drift]'' (2025)

* [[User:Unque/37edo Composition Theory|Unque's approach]]

== External links ==

* [http://tonalsoft.com/enc/number/37-edo/37edo.aspx 37-edo / 37-et / 37-tone equal-temperament] on [[Tonalsoft Encyclopedia]]

[[Category:Listen]]