Semitone (interval region): Difference between revisions

A '''semitone''' is an interval that spans exactly one step of a 12-tone [[chromatic]] scale. In [[just intonation]], an interval may be classified as a semitone if it is reasonably mapped to [[24edo|2\24]]. The use of 24edo's 2\24 as the mapping criteria here rather than [[12edo]]'s 1\12 better captures the characteristics of many intervals in the [[11-limit|11-]] and [[13-limit]]. Semitones come in two functional categories based on their number of steps in the [[5L 2s|diatonic]] scale:

* [[Diatonic semitone]]s, minor seconds (m2) or limmas,

* [[Chromatic semitone]]s, augmented unisons (A1) or chromas.

As a concrete [[interval region]], it is typically near 100 [[cent]]s in size, distinct from [[commas and dieses]] (less than 60 cents), and from [[neutral second]]s (about 150 cents). A rough tuning range for the semitone is about 60 cents to 125 cents according to [[Margo Schulter]]'s theory of interval regions.  

** The ''limma'', or ''Pythagorean diatonic semitone'', is a ratio of [[256/243]], and is about 90 cents.

** The ''apotome'', or ''Pythagorean chromatic semitone'', is a ratio of [[2187/2048]], and is about 114 cents.

** The ''classical diatonic semitone'' is a ratio of [[16/15]], and is about 112 cents.

** The ''classical chromatic semitone'' is a ratio of [[25/24]], and is about 71 cents.

*** There is also a ''ptolemaic chromatic semitone'', which is a ratio of [[135/128]], and is about 92 cents.

** The 7-limit ''third-tone'' is a ratio of [[28/27]], and is about 63 cents.

** The 7-limit ''minor semitone'' is a ratio of [[21/20]], and is about 84 cents.

** The 7-limit ''major semitone'' is a ratio of [[15/14]], and is about 119 cents.

** The 11-limit ''minor semitone'' is a ratio of [[22/21]], and is about 81 cents.

** The 13-limit ''sinaic'' is a ratio of [[14/13]], and is about 128 cents.

** The 13-limit ''greater 2/3-tone'' is a ratio of [[13/12]], and is about 139 cents.

** The 17-limit ''large semitone'' is a ratio of [[17/16]], and is about 104 cents.

** The 17-limit ''small semitone'' is a ratio of [[18/17]], and is about 99 cents.

This table lists just semitones by [[Delta-N|delta]]:

|[[13/12]]

|139c

|[[14/13]]

|128c

|[[15/14]]

|119c

|[[16/15]]

|112c

|[[17/16]]

|104c

|[[18/17]]

|99c

|[[19/18]]

|94c

|[[20/19]]

|89c

|[[21/20]]

|85c

|[[22/21]]

|81c

|[[23/22]]

|77c

|[[24/23]]

|74c

|[[25/24]]

|71c

|[[26/25]]

|68c

|[[27/26]]

|65c

|[[28/27]]

|63c

|[[29/28]]

|61c

|[[30/29]]

|59c

|[[31/30]]

|57c

|[[32/31]]

|55c

|[[33/32]]

|53c

|[[34/33]]

|52c

|[[35/34]]

|50c

== In edos ==

The following table lists the best tuning of 16/15, 25/24, and other semitones if present, in various significant [[edo]]s.

|12

| colspan="2" |100c

|

|15

| colspan="2" |80c

|

|16

| colspan="2" |75c

|

|17

|141c

|71c

|

|19

|126c

|63c

|

|22

|109c

|55c

|

|24

|100c

|50c

|

|25

|96c

|*

|

|26

| colspan="2" |92c

|

|27

|133c

|89c

|

|29

|124c

|83c

|

|31

|116c

|77c

|

|34

|106c

|71c

|

|41

|117c

|59c

|88c ≈ 256/243

|53

|113c

|68c

|91c ≈ 256/243

* [[Vishnu]], which stacks seven 25/24s to make a just [[perfect fourth]] of [[4/3]]

* [[Chlorine]], equivalent to [[17edo]], stacking seventeen 25/24s to make an octave