Kite's ups and downs notation: Difference between revisions

Line 1:

<h2>IMPORTED REVISION FROM WIKISPACES</h2>

This is an imported revision from Wikispaces. The revision metadata is included below for reference:

: This revision was by author [[User:TallKite|TallKite]] and made on <tt>2016-11-29 01:38:29 UTC</tt>.

: This revision was by author [[User:TallKite|TallKite]] and made on <tt>2016-11-29 03:15:54 UTC</tt>.

: The original revision id was <tt>~~600699878~~</tt>.

: The original revision id was <tt>600703342</tt>.

: The revision comment was: <tt></tt>

The revision contents are below, presented both in the original Wikispaces Wikitext format, and in HTML exactly as Wikispaces rendered it.

Line 376:

C Eb Gb^ = Cdim(^5) = "C dim up-five"

C Eb^ Gb = Cdim(^3) = "C dim up-three" (in certain EDOs, Cdim(~3) = "C dim mid-three")

(~~note that~~ here "up-three" means upminor 3rd, not upmajor 3rd, because "dim" indicates a minor 3rd)

(here "up-three" means upminor 3rd, not upmajor 3rd, because "dim" indicates a minor 3rd)

C Eb^ Gb^ = Cdim(^3,^5) = "C dim up-three up-five" (in certain EDOs, C~(^b5) = "C mid upflat-five")

Line 413:

C Eb^ G Bb = Cm7(^3) = "C minor seven up-three" (in certain EDOs, C7(~3) = "C seven mid-three")

C Eb G Bb^ = Cm(^7) = "C minor up-seven" (in certain EDOs, Cm(~7) = "C minor mid-seven")

C Eb^ G Bb^ = C.^m7 = "C dot ~~upminor~~ seven" (in certain EDOs, C.~7 = "C dot mid seven")

C Eb^ G Bb^ = C.^m7 = "C dot up minor-seven" (in certain EDOs, C.~7 = "C dot mid seven")

C E G B = CM7 = "C major seven" (in perfect EDOs, C7 = "C seven")

C Ev G B = CM7(v3) = "C major seven down-three"

C E G Bv = C(vM7) = "C downmajor-seven"

C Ev G Bv = C.vM7 = "C dot ~~downmajor~~-seven"

C Ev G Bv = C.vM7 = "C dot down major-seven"

C Eb Gb Bbb = Cdim7 = "C dim seven" (in perfect EDOs, C7 = "C seven")

Line 424:

C Eb Gb^ Bbb = Cdim7(v5) = "C dim seven up-five"

C Eb Gb Bbb^ = Cdim(^d7) = "C dim updim-seven"

C Eb^ Gb Bbb^ = C.^dim7 = "C dot ~~updim~~ seven"

C Eb^ Gb Bbb^ = C.^dim7 = "C dot up dim-seven"

C Eb^ Gb^ Bbb^ = C.^dim7(^5) = "C dot ~~updim~~ seven up-five"

C Eb^ Gb^ Bbb^ = C.^dim7(^5) = "C dot up dim-seven up-five"

C Eb Gb Bb = Cm7(b5) = "C minor seven flat-five" or "C half-dim" (in perfect EDOs, C7 = "C seven")

Line 432:

C Eb Gb Bb^ = Cdim(^7) = "C dim up-seven" or "C half-dim up-seven"

C Eb^ Gb^ Bb = Cm7(^b5,^3) = "C minor seven up-three upflat-five" or "C half-dim up-three up-five"

C Eb^ Gb Bb^ = C.^m7(b5) = "C dot ~~upminor~~ seven flat-five" or "C half-dim up-three up-seven"

C Eb^ Gb Bb^ = C.^m7(b5) = "C dot up minor-seven flat-five" or "C half-dim up-three up-seven"

C Eb Gb^ Bb^ = Cdim(^5,^7) = "C dim up-five up-seven" or "C half-dim up-five up-seven"

C Eb^ Gb^ Bb^ = C.^m7(^b5) = "C dot ~~upminor~~ seven upflat-five" or "C half-dim up-three up-five up-seven"

C Eb^ Gb^ Bb^ = C.^m7(^b5) = "C dot up minor-seven upflat-five" or "C half-dim up-three up-five up-seven"

C E G Bbb = C(bb7) or C(d7) = "C double-flat-seven" or "C major dim-seven" (not "C dim-seven" = Cdim7)

Line 444:

C Ev G A = C6(v3) = "C six down-three" (in certain EDOs, C6(~3) = "C six mid-three")

C E G Av = C(v6) = "C down-six" (in certain EDOs, C(~6) = "C mid-six")

C Ev G Av = C.v6 = "C dot down-six" (in certain EDOs, C.~6 = "C dot mid-six")

C Ev G Av = C.v6 = "C dot down six" (in certain EDOs, C.~6 = "C dot mid six")

C Eb G A = Cm6 = "C minor six" (in perfect EDOs, C6 = "C six")

Line 468:

C Dv Ev G Bb = C7(v3,v9) = "C seven down-three down-nine"

C Dv E G Bbv = C(v7,v9) = "C down-seven down-nine"

C Dv Ev G Bbv = C.v7(v9) = "C dot down-seven down-nine"

C Dv Ev G Bbv = C.v7(v9) = "C dot down seven down-nine"

C Dv Ev Gv Bbv = C.v7(v5,v9) = "C dot down-seven down-five down-nine"

Line 479:

C D Eb^ G Bb = Cm9(^3) = "C minor nine up-three" (in certain EDOs, C9(~3) = "C nine mid-three")

C D Eb G Bb^ = Cm9(^7) = "C minor nine up-seven" (in certain EDOs, Cm9(~7) = "C minor nine mid-seven")

C D Eb^ G Bb^ = C.^m9 = "C dot ~~upminor~~-nine" (in certain EDOs, ~~C9(~~~3) = "C nine ~~mid-three~~")

C D Eb^ G Bb^ = C.^m9 = "C dot up minor-nine" (in certain EDOs, C.~M9 = "C dot mid major nine")

C Db E G Bb = C(b9) = "C flat-nine" ~~(not Cb9 = Cb Db Eb Gb Bbb)~~ (in perfect EDOs, C9 = "C nine")

C Db E G Bb = C7(b9) = "C seven flat-nine" (in perfect EDOs, C9 = "C nine")

C Db Ev G Bb = ~~Cb9~~(v3) = "C flat-nine down-three"

C Db Ev G Bb = C7(b9,v3) = "C seven flat-nine down-three"

C Db E G Bbv = ~~Cb9~~(v7) = "C flat-nine down-seven"

C Db E G Bbv = C7(b9,v7) = "C seven flat-nine down-seven"

C Dbv E G Bb = C7(vb9) = "C seven downflat~~-nine", or Cb9(v9) = "C flat-nine down~~-nine"

C Dbv E G Bb = C7(vb9) = "C seven downflat-nine"

C Db Ev G Bbv = C.~~vb9~~ = "C dot down flat-nine"

C Db Ev G Bbv = C.v7(b9) = "C dot down seven flat-nine"

C Dbv Ev G Bb = ~~Cb9~~(v3,v9) = "C ~~flat-nine~~ down-three ~~down~~-nine"~~, or C7(v3,vb9)~~

C Dbv Ev G Bb = C7(v3,vb9) = "C seven down-three downflat-nine"

C Dbv E G Bbv = ~~Cb9~~(v7,v9) = "C ~~flat-nine~~ down-seven ~~down~~-nine"~~, or C(v7,vb9)~~

C Dbv E G Bbv = C(v7,vb9) = "C down-seven downflat-nine"

C Dbv Ev G Bbv = C.v7(vb9) = "C dot down seven downflat-nine"~~, or C.vb9(v9)~~

C Dbv Ev G Bbv = C.v7(vb9) = "C dot down seven downflat-nine"

__**Example EDOs:**__

Line 509:

0-4-8-11 = D F A Cv = D(v7) = "D down-seven", or D F A B^ = D(^6) = "D up-six"

0-3-8-11 = D Fv A Cv = D.v7 = "D dot down-seven"

0-3-8-11 = D Fv A Cv = D.v7 = "D dot down seven"

0-5-8-11 = D F^ A B^ = D.^6 = "D dot up-six"

0-5-8-11 = D F^ A B^ = D.^6 = "D dot up six"

15edo: 3 keys per #/b, so ups and downs are needed.

Line 520:

0-5-9 = D F#v A = D.v = "D dot down" or "D downmajor"

0-6-9 = D F# A = D = "D" or "D major" (or possibly D G A = Dsus4)

0-3-9-12 = D F A C = Dm7 = "D minor seven", or D F A B = Dm6 = "D minor six"

0-4-9-12 = D F^ A C = Dm7(^3) = "D minor seven up-three", or D F^ A B = Dm6(^3) = "D minor six up-three"

0-5-9-12 = D F#v A C = D7(v3) = "D seven down-three", or D F#v A B = D6(v3) = "D six down-three"

0-6-9-12 = D F# A C = D7 = "D seven", or D F# A B = D6 = "D six"

0-5-9-14 = D F#v A C#v = D.vM7 = "D dot down major-seven"

0-4-9-13 = D F^ A C^ = D.^m7 = "D dot up minor-seven", or D F^ A B^ = D.^m6 = "D dot up minor-six"

16edo: D * E * * F * G * A * B * * C * D, 1 key per #/b, ups and downs not needed.

Line 1,925:

Line 1,930:

C Eb Gb^ = Cdim(^5) = &quot;C dim up-five&quot;

C Eb^ Gb = Cdim(^3) = &quot;C dim up-three&quot; (in certain EDOs, Cdim(~3) = &quot;C dim mid-three&quot;)

(~~note that~~ here &quot;up-three&quot; means upminor 3rd, not upmajor 3rd, because &quot;dim&quot; indicates a minor 3rd)

(here &quot;up-three&quot; means upminor 3rd, not upmajor 3rd, because &quot;dim&quot; indicates a minor 3rd)

C Eb^ Gb^ = Cdim(^3,^5) = &quot;C dim up-three up-five&quot; (in certain EDOs, C~(^b5) = &quot;C mid upflat-five&quot;)

Line 1,962:

Line 1,967:

C Eb^ G Bb = Cm7(^3) = &quot;C minor seven up-three&quot; (in certain EDOs, C7(~3) = &quot;C seven mid-three&quot;)

C Eb G Bb^ = Cm(^7) = &quot;C minor up-seven&quot; (in certain EDOs, Cm(~7) = &quot;C minor mid-seven&quot;)

C Eb^ G Bb^ = C.^m7 = &quot;C dot ~~upminor~~ seven&quot; (in certain EDOs, C.~7 = &quot;C dot mid seven&quot;)

C Eb^ G Bb^ = C.^m7 = &quot;C dot up minor-seven&quot; (in certain EDOs, C.~7 = &quot;C dot mid seven&quot;)

C E G B = CM7 = &quot;C major seven&quot; (in perfect EDOs, C7 = &quot;C seven&quot;)

C Ev G B = CM7(v3) = &quot;C major seven down-three&quot;

C E G Bv = C(vM7) = &quot;C downmajor-seven&quot;

C Ev G Bv = C.vM7 = &quot;C dot ~~downmajor~~-seven&quot;

C Ev G Bv = C.vM7 = &quot;C dot down major-seven&quot;

C Eb Gb Bbb = Cdim7 = &quot;C dim seven&quot; (in perfect EDOs, C7 = &quot;C seven&quot;)

Line 1,973:

Line 1,978:

C Eb Gb^ Bbb = Cdim7(v5) = &quot;C dim seven up-five&quot;

C Eb Gb Bbb^ = Cdim(^d7) = &quot;C dim updim-seven&quot;

C Eb^ Gb Bbb^ = C.^dim7 = &quot;C dot ~~updim~~ seven&quot;

C Eb^ Gb Bbb^ = C.^dim7 = &quot;C dot up dim-seven&quot;

C Eb^ Gb^ Bbb^ = C.^dim7(^5) = &quot;C dot ~~updim~~ seven up-five&quot;

C Eb^ Gb^ Bbb^ = C.^dim7(^5) = &quot;C dot up dim-seven up-five&quot;

C Eb Gb Bb = Cm7(b5) = &quot;C minor seven flat-five&quot; or &quot;C half-dim&quot; (in perfect EDOs, C7 = &quot;C seven&quot;)

Line 1,981:

Line 1,986:

C Eb Gb Bb^ = Cdim(^7) = &quot;C dim up-seven&quot; or &quot;C half-dim up-seven&quot;

C Eb^ Gb^ Bb = Cm7(^b5,^3) = &quot;C minor seven up-three upflat-five&quot; or &quot;C half-dim up-three up-five&quot;

C Eb^ Gb Bb^ = C.^m7(b5) = &quot;C dot ~~upminor~~ seven flat-five&quot; or &quot;C half-dim up-three up-seven&quot;

C Eb^ Gb Bb^ = C.^m7(b5) = &quot;C dot up minor-seven flat-five&quot; or &quot;C half-dim up-three up-seven&quot;

C Eb Gb^ Bb^ = Cdim(^5,^7) = &quot;C dim up-five up-seven&quot; or &quot;C half-dim up-five up-seven&quot;

C Eb^ Gb^ Bb^ = C.^m7(^b5) = &quot;C dot ~~upminor~~ seven upflat-five&quot; or &quot;C half-dim up-three up-five up-seven&quot;

C Eb^ Gb^ Bb^ = C.^m7(^b5) = &quot;C dot up minor-seven upflat-five&quot; or &quot;C half-dim up-three up-five up-seven&quot;

C E G Bbb = C(bb7) or C(d7) = &quot;C double-flat-seven&quot; or &quot;C major dim-seven&quot; (not &quot;C dim-seven&quot; = Cdim7)

Line 1,993:

Line 1,998:

C Ev G A = C6(v3) = &quot;C six down-three&quot; (in certain EDOs, C6(~3) = &quot;C six mid-three&quot;)

C E G Av = C(v6) = &quot;C down-six&quot; (in certain EDOs, C(~6) = &quot;C mid-six&quot;)

C Ev G Av = C.v6 = &quot;C dot down-six&quot; (in certain EDOs, C.~6 = &quot;C dot mid-six&quot;)

C Ev G Av = C.v6 = &quot;C dot down six&quot; (in certain EDOs, C.~6 = &quot;C dot mid six&quot;)

C Eb G A = Cm6 = &quot;C minor six&quot; (in perfect EDOs, C6 = &quot;C six&quot;)

Line 2,017:

Line 2,022:

C Dv Ev G Bb = C7(v3,v9) = &quot;C seven down-three down-nine&quot;

C Dv E G Bbv = C(v7,v9) = &quot;C down-seven down-nine&quot;

C Dv Ev G Bbv = C.v7(v9) = &quot;C dot down-seven down-nine&quot;

C Dv Ev G Bbv = C.v7(v9) = &quot;C dot down seven down-nine&quot;

C Dv Ev Gv Bbv = C.v7(v5,v9) = &quot;C dot down-seven down-five down-nine&quot;

Line 2,028:

Line 2,033:

C D Eb^ G Bb = Cm9(^3) = &quot;C minor nine up-three&quot; (in certain EDOs, C9(~3) = &quot;C nine mid-three&quot;)

C D Eb G Bb^ = Cm9(^7) = &quot;C minor nine up-seven&quot; (in certain EDOs, Cm9(~7) = &quot;C minor nine mid-seven&quot;)

C D Eb^ G Bb^ = C.^m9 = &quot;C dot ~~upminor~~-nine&quot; (in certain EDOs, ~~C9(~~~3) = &quot;C nine ~~mid-three~~&quot;)

C D Eb^ G Bb^ = C.^m9 = &quot;C dot up minor-nine&quot; (in certain EDOs, C.~M9 = &quot;C dot mid major nine&quot;)

C Db E G Bb = C(b9) = &quot;C flat-nine&quot; ~~(not Cb9 = Cb Db Eb Gb Bbb)~~ (in perfect EDOs, C9 = &quot;C nine&quot;)

C Db E G Bb = C7(b9) = &quot;C seven flat-nine&quot; (in perfect EDOs, C9 = &quot;C nine&quot;)

C Db Ev G Bb = ~~Cb9~~(v3) = &quot;C flat-nine down-three&quot;

C Db Ev G Bb = C7(b9,v3) = &quot;C seven flat-nine down-three&quot;

C Db E G Bbv = ~~Cb9~~(v7) = &quot;C flat-nine down-seven&quot;

C Db E G Bbv = C7(b9,v7) = &quot;C seven flat-nine down-seven&quot;

C Dbv E G Bb = C7(vb9) = &quot;C seven downflat~~-nine&quot;, or Cb9(v9) = &quot;C flat-nine down~~-nine&quot;

C Dbv E G Bb = C7(vb9) = &quot;C seven downflat-nine&quot;

C Db Ev G Bbv = C.~~vb9~~ = &quot;C dot down flat-nine&quot;

C Db Ev G Bbv = C.v7(b9) = &quot;C dot down seven flat-nine&quot;

C Dbv Ev G Bb = ~~Cb9~~(v3,v9) = &quot;C ~~flat-nine~~ down-three ~~down~~-nine&quot;~~, or C7(v3,vb9)~~

C Dbv Ev G Bb = C7(v3,vb9) = &quot;C seven down-three downflat-nine&quot;

C Dbv E G Bbv = ~~Cb9~~(v7,v9) = &quot;C ~~flat-nine~~ down-seven ~~down~~-nine&quot;~~, or C(v7,vb9)~~

C Dbv E G Bbv = C(v7,vb9) = &quot;C down-seven downflat-nine&quot;

C Dbv Ev G Bbv = C.v7(vb9) = &quot;C dot down seven downflat-nine&quot;~~, or C.vb9(v9)~~

C Dbv Ev G Bbv = C.v7(vb9) = &quot;C dot down seven downflat-nine&quot;

Example EDOs:

Line 2,058:

Line 2,063:

0-4-8-11 = D F A Cv = D(v7) = &quot;D down-seven&quot;, or D F A B^ = D(^6) = &quot;D up-six&quot;

0-3-8-11 = D Fv A Cv = D.v7 = &quot;D dot down-seven&quot;

0-3-8-11 = D Fv A Cv = D.v7 = &quot;D dot down seven&quot;

0-5-8-11 = D F^ A B^ = D.^6 = &quot;D dot up-six&quot;

0-5-8-11 = D F^ A B^ = D.^6 = &quot;D dot up six&quot;

15edo: 3 keys per #/b, so ups and downs are needed.

Line 2,069:

Line 2,074:

0-5-9 = D F#v A = D.v = &quot;D dot down&quot; or &quot;D downmajor&quot;

0-6-9 = D F# A = D = &quot;D&quot; or &quot;D major&quot; (or possibly D G A = Dsus4)

0-3-9-12 = D F A C = Dm7 = &quot;D minor seven&quot;, or D F A B = Dm6 = &quot;D minor six&quot;

0-4-9-12 = D F^ A C = Dm7(^3) = &quot;D minor seven up-three&quot;, or D F^ A B = Dm6(^3) = &quot;D minor six up-three&quot;

0-5-9-12 = D F#v A C = D7(v3) = &quot;D seven down-three&quot;, or D F#v A B = D6(v3) = &quot;D six down-three&quot;

0-6-9-12 = D F# A C = D7 = &quot;D seven&quot;, or D F# A B = D6 = &quot;D six&quot;

0-5-9-14 = D F#v A C#v = D.vM7 = &quot;D dot down major-seven&quot;

0-4-9-13 = D F^ A C^ = D.^m7 = &quot;D dot up minor-seven&quot;, or D F^ A B^ = D.^m6 = &quot;D dot up minor-six&quot;

16edo: D * E * * F * G * A * B * * C * D, 1 key per #/b, ups and downs not needed.

@@ Line 1: / Line 1: @@
 <h2>IMPORTED REVISION FROM WIKISPACES</h2>
 This is an imported revision from Wikispaces. The revision metadata is included below for reference:<br>
-: This revision was by author [[User:TallKite|TallKite]] and made on <tt>2016-11-29 01:38:29 UTC</tt>.<br>
+: This revision was by author [[User:TallKite|TallKite]] and made on <tt>2016-11-29 03:15:54 UTC</tt>.<br>
-: The original revision id was <tt>600699878</tt>.<br>
+: The original revision id was <tt>600703342</tt>.<br>
 : The revision comment was: <tt></tt><br>
 The revision contents are below, presented both in the original Wikispaces Wikitext format, and in HTML exactly as Wikispaces rendered it.<br>
@@ Line 376: / Line 376: @@
 C Eb Gb^ = Cdim(^5) = "C dim up-five"
 C Eb^ Gb = Cdim(^3) = "C dim up-three" (in certain EDOs, Cdim(~3) = "C dim mid-three")
-(note that here "up-three" means upminor 3rd, not upmajor 3rd, because "dim" indicates a minor 3rd)
+(here "up-three" means upminor 3rd, not upmajor 3rd, because "dim" indicates a minor 3rd)
 C Eb^ Gb^ = Cdim(^3,^5) = "C dim up-three up-five" (in certain EDOs, C~(^b5) = "C mid upflat-five")
@@ Line 413: / Line 413: @@
 C Eb^ G Bb = Cm7(^3) = "C minor seven up-three" (in certain EDOs, C7(~3) = "C seven mid-three")
 C Eb G Bb^ = Cm(^7) = "C minor up-seven" (in certain EDOs, Cm(~7) = "C minor mid-seven")
-C Eb^ G Bb^ = C.^m7 = "C dot upminor seven" (in certain EDOs, C.~7 = "C dot mid seven")
+C Eb^ G Bb^ = C.^m7 = "C dot up minor-seven" (in certain EDOs, C.~7 = "C dot mid seven")
 C E G B = CM7 = "C major seven" (in perfect EDOs, C7 = "C seven")
 C Ev G B = CM7(v3) = "C major seven down-three"
 C E G Bv = C(vM7) = "C downmajor-seven"
-C Ev G Bv = C.vM7 = "C dot downmajor-seven"
+C Ev G Bv = C.vM7 = "C dot down major-seven"
 C Eb Gb Bbb = Cdim7 = "C dim seven" (in perfect EDOs, C7 = "C seven")
@@ Line 424: / Line 424: @@
 C Eb Gb^ Bbb = Cdim7(v5) = "C dim seven up-five"
 C Eb Gb Bbb^ = Cdim(^d7) = "C dim updim-seven"
-C Eb^ Gb Bbb^ = C.^dim7 = "C dot updim seven"
+C Eb^ Gb Bbb^ = C.^dim7 = "C dot up dim-seven"
-C Eb^ Gb^ Bbb^ = C.^dim7(^5) = "C dot updim seven up-five"
+C Eb^ Gb^ Bbb^ = C.^dim7(^5) = "C dot up dim-seven up-five"
 C Eb Gb Bb = Cm7(b5) = "C minor seven flat-five" or "C half-dim" (in perfect EDOs, C7 = "C seven")
@@ Line 432: / Line 432: @@
 C Eb Gb Bb^ = Cdim(^7) = "C dim up-seven" or "C half-dim up-seven"
 C Eb^ Gb^ Bb = Cm7(^b5,^3) = "C minor seven up-three upflat-five" or "C half-dim up-three up-five"
-C Eb^ Gb Bb^ = C.^m7(b5) = "C dot upminor seven flat-five" or "C half-dim up-three up-seven"
+C Eb^ Gb Bb^ = C.^m7(b5) = "C dot up minor-seven flat-five" or "C half-dim up-three up-seven"
 C Eb Gb^ Bb^ = Cdim(^5,^7) = "C dim up-five up-seven" or "C half-dim up-five up-seven"
-C Eb^ Gb^ Bb^ = C.^m7(^b5) = "C dot upminor seven upflat-five" or "C half-dim up-three up-five up-seven"
+C Eb^ Gb^ Bb^ = C.^m7(^b5) = "C dot up minor-seven upflat-five" or "C half-dim up-three up-five up-seven"
 C E G Bbb = C(bb7) or C(d7) = "C double-flat-seven" or "C major dim-seven" (not "C dim-seven" = Cdim7)
@@ Line 444: / Line 444: @@
 C Ev G A = C6(v3) = "C six down-three" (in certain EDOs, C6(~3) = "C six mid-three")
 C E G Av = C(v6) = "C down-six" (in certain EDOs, C(~6) = "C mid-six")
-C Ev G Av = C.v6 = "C dot down-six" (in certain EDOs, C.~6 = "C dot mid-six")
+C Ev G Av = C.v6 = "C dot down six" (in certain EDOs, C.~6 = "C dot mid six")
 C Eb G A = Cm6 = "C minor six" (in perfect EDOs, C6 = "C six")
@@ Line 468: / Line 468: @@
 C Dv Ev G Bb = C7(v3,v9) = "C seven down-three down-nine"
 C Dv E G Bbv = C(v7,v9) = "C down-seven down-nine"
-C Dv Ev G Bbv = C.v7(v9) = "C dot down-seven down-nine"
+C Dv Ev G Bbv = C.v7(v9) = "C dot down seven down-nine"
 C Dv Ev Gv Bbv = C.v7(v5,v9) = "C dot down-seven down-five down-nine"
@@ Line 479: / Line 479: @@
 C D Eb^ G Bb = Cm9(^3) = "C minor nine up-three" (in certain EDOs, C9(~3) = "C nine mid-three")
 C D Eb G Bb^ = Cm9(^7) = "C minor nine up-seven" (in certain EDOs, Cm9(~7) = "C minor nine mid-seven")
-C D Eb^ G Bb^ = C.^m9 = "C dot upminor-nine" (in certain EDOs, C9(~3) = "C nine mid-three")
+C D Eb^ G Bb^ = C.^m9 = "C dot up minor-nine" (in certain EDOs, C.~M9 = "C dot mid major nine")
-C Db E G Bb = C(b9) = "C flat-nine" (not Cb9 = Cb Db Eb Gb Bbb) (in perfect EDOs, C9 = "C nine")
+C Db E G Bb = C7(b9) = "C seven flat-nine" (in perfect EDOs, C9 = "C nine")
-C Db Ev G Bb = Cb9(v3) = "C flat-nine down-three"
+C Db Ev G Bb = C7(b9,v3) = "C seven flat-nine down-three"
-C Db E G Bbv = Cb9(v7) = "C flat-nine down-seven"
+C Db E G Bbv = C7(b9,v7) = "C seven flat-nine down-seven"
-C Dbv E G Bb = C7(vb9) = "C seven downflat-nine", or Cb9(v9) = "C flat-nine down-nine"
+C Dbv E G Bb = C7(vb9) = "C seven downflat-nine"
-C Db Ev G Bbv = C.vb9 = "C dot down flat-nine"
+C Db Ev G Bbv = C.v7(b9) = "C dot down seven flat-nine"
-C Dbv Ev G Bb = Cb9(v3,v9) = "C flat-nine down-three down-nine", or C7(v3,vb9)
+C Dbv Ev G Bb = C7(v3,vb9) = "C seven down-three downflat-nine"
-C Dbv E G Bbv = Cb9(v7,v9) = "C flat-nine down-seven down-nine", or C(v7,vb9)
+C Dbv E G Bbv = C(v7,vb9) = "C down-seven downflat-nine"
-C Dbv Ev G Bbv = C.v7(vb9) = "C dot down seven downflat-nine", or C.vb9(v9)
+C Dbv Ev G Bbv = C.v7(vb9) = "C dot down seven downflat-nine"
 __**Example EDOs:**__
@@ Line 509: / Line 509: @@
 -4-8-11 = D F A Cv = D(v7) = "D down-seven", or D F A B^ = D(^6) = "D up-six"
--3-8-11 = D Fv A Cv = D.v7 = "D dot down-seven"
+-3-8-11 = D Fv A Cv = D.v7 = "D dot down seven"
--5-8-11 = D F^ A B^ = D.^6 = "D dot up-six"
+-5-8-11 = D F^ A B^ = D.^6 = "D dot up six"
 edo: 3 keys per #/b, so ups and downs are needed.
@@ Line 520: / Line 520: @@
 -5-9 = D F#v A = D.v = "D dot down" or "D downmajor"
 -6-9 = D F# A = D = "D" or "D major" (or possibly D G A = Dsus4)
+-3-9-12 = D F A C = Dm7 = "D minor seven", or D F A B = Dm6 = "D minor six"
+-4-9-12 = D F^ A C = Dm7(^3) = "D minor seven up-three", or D F^ A B = Dm6(^3) = "D minor six up-three"
+-5-9-12 = D F#v A C = D7(v3) = "D seven down-three", or D F#v A B = D6(v3) = "D six down-three"
 -6-9-12 = D F# A C = D7 = "D seven", or D F# A B = D6 = "D six"
+-5-9-14 = D F#v A C#v = D.vM7 = "D dot down major-seven"
+-4-9-13 = D F^ A C^ = D.^m7 = "D dot up minor-seven", or D F^ A B^ = D.^m6 = "D dot up minor-six"
 edo: D * E * * F * G * A * B * * C * D, 1 key per #/b, ups and downs not needed.
@@ Line 1,925: / Line 1,930: @@
 C Eb Gb^ = Cdim(^5) = &amp;quot;C dim up-five&amp;quot;&lt;br /&gt;
 C Eb^ Gb = Cdim(^3) = &amp;quot;C dim up-three&amp;quot; (in certain EDOs, Cdim(~3) = &amp;quot;C dim mid-three&amp;quot;)&lt;br /&gt;
-(note that here &amp;quot;up-three&amp;quot; means upminor 3rd, not upmajor 3rd, because &amp;quot;dim&amp;quot; indicates a minor 3rd)&lt;br /&gt;
+(here &amp;quot;up-three&amp;quot; means upminor 3rd, not upmajor 3rd, because &amp;quot;dim&amp;quot; indicates a minor 3rd)&lt;br /&gt;
 C Eb^ Gb^ = Cdim(^3,^5) = &amp;quot;C dim up-three up-five&amp;quot; (in certain EDOs, C~(^b5) = &amp;quot;C mid upflat-five&amp;quot;)&lt;br /&gt;
 &lt;br /&gt;
@@ Line 1,962: / Line 1,967: @@
 C Eb^ G Bb = Cm7(^3) = &amp;quot;C minor seven up-three&amp;quot; (in certain EDOs, C7(~3) = &amp;quot;C seven mid-three&amp;quot;)&lt;br /&gt;
 C Eb G Bb^ = Cm(^7) = &amp;quot;C minor up-seven&amp;quot; (in certain EDOs, Cm(~7) = &amp;quot;C minor mid-seven&amp;quot;)&lt;br /&gt;
-C Eb^ G Bb^ = C.^m7 = &amp;quot;C dot upminor seven&amp;quot; (in certain EDOs, C.~7 = &amp;quot;C dot mid seven&amp;quot;)&lt;br /&gt;
+C Eb^ G Bb^ = C.^m7 = &amp;quot;C dot up minor-seven&amp;quot; (in certain EDOs, C.~7 = &amp;quot;C dot mid seven&amp;quot;)&lt;br /&gt;
 &lt;br /&gt;
 C E G B = CM7 = &amp;quot;C major seven&amp;quot; (in perfect EDOs, C7 = &amp;quot;C seven&amp;quot;)&lt;br /&gt;
 C Ev G B = CM7(v3) = &amp;quot;C major seven down-three&amp;quot;&lt;br /&gt;
 C E G Bv = C(vM7) = &amp;quot;C downmajor-seven&amp;quot;&lt;br /&gt;
-C Ev G Bv = C.vM7 = &amp;quot;C dot downmajor-seven&amp;quot;&lt;br /&gt;
+C Ev G Bv = C.vM7 = &amp;quot;C dot down major-seven&amp;quot;&lt;br /&gt;
 &lt;br /&gt;
 C Eb Gb Bbb = Cdim7 = &amp;quot;C dim seven&amp;quot; (in perfect EDOs, C7 = &amp;quot;C seven&amp;quot;)&lt;br /&gt;
@@ Line 1,973: / Line 1,978: @@
 C Eb Gb^ Bbb = Cdim7(v5) = &amp;quot;C dim seven up-five&amp;quot;&lt;br /&gt;
 C Eb Gb Bbb^ = Cdim(^d7) = &amp;quot;C dim updim-seven&amp;quot;&lt;br /&gt;
-C Eb^ Gb Bbb^ = C.^dim7 = &amp;quot;C dot updim seven&amp;quot;&lt;br /&gt;
+C Eb^ Gb Bbb^ = C.^dim7 = &amp;quot;C dot up dim-seven&amp;quot;&lt;br /&gt;
-C Eb^ Gb^ Bbb^ = C.^dim7(^5) = &amp;quot;C dot updim seven up-five&amp;quot;&lt;br /&gt;
+C Eb^ Gb^ Bbb^ = C.^dim7(^5) = &amp;quot;C dot up dim-seven up-five&amp;quot;&lt;br /&gt;
 &lt;br /&gt;
 C Eb Gb Bb = Cm7(b5) = &amp;quot;C minor seven flat-five&amp;quot; or &amp;quot;C half-dim&amp;quot; (in perfect EDOs, C7 = &amp;quot;C seven&amp;quot;)&lt;br /&gt;
@@ Line 1,981: / Line 1,986: @@
 C Eb Gb Bb^ = Cdim(^7) = &amp;quot;C dim up-seven&amp;quot; or &amp;quot;C half-dim up-seven&amp;quot;&lt;br /&gt;
 C Eb^ Gb^ Bb = Cm7(^b5,^3) = &amp;quot;C minor seven up-three upflat-five&amp;quot; or &amp;quot;C half-dim up-three up-five&amp;quot;&lt;br /&gt;
-C Eb^ Gb Bb^ = C.^m7(b5) = &amp;quot;C dot upminor seven flat-five&amp;quot; or &amp;quot;C half-dim up-three up-seven&amp;quot;&lt;br /&gt;
+C Eb^ Gb Bb^ = C.^m7(b5) = &amp;quot;C dot up minor-seven flat-five&amp;quot; or &amp;quot;C half-dim up-three up-seven&amp;quot;&lt;br /&gt;
 C Eb Gb^ Bb^ = Cdim(^5,^7) = &amp;quot;C dim up-five up-seven&amp;quot; or &amp;quot;C half-dim up-five up-seven&amp;quot;&lt;br /&gt;
-C Eb^ Gb^ Bb^ = C.^m7(^b5) = &amp;quot;C dot upminor seven upflat-five&amp;quot; or &amp;quot;C half-dim up-three up-five up-seven&amp;quot;&lt;br /&gt;
+C Eb^ Gb^ Bb^ = C.^m7(^b5) = &amp;quot;C dot up minor-seven upflat-five&amp;quot; or &amp;quot;C half-dim up-three up-five up-seven&amp;quot;&lt;br /&gt;
 &lt;br /&gt;
 C E G Bbb = C(bb7) or C(d7) = &amp;quot;C double-flat-seven&amp;quot; or &amp;quot;C major dim-seven&amp;quot; (not &amp;quot;C dim-seven&amp;quot; = Cdim7)&lt;br /&gt;
@@ Line 1,993: / Line 1,998: @@
 C Ev G A = C6(v3) = &amp;quot;C six down-three&amp;quot; (in certain EDOs, C6(~3) = &amp;quot;C six mid-three&amp;quot;)&lt;br /&gt;
 C E G Av = C(v6) = &amp;quot;C down-six&amp;quot; (in certain EDOs, C(~6) = &amp;quot;C mid-six&amp;quot;)&lt;br /&gt;
-C Ev G Av = C.v6 = &amp;quot;C dot down-six&amp;quot; (in certain EDOs, C.~6 = &amp;quot;C dot mid-six&amp;quot;)&lt;br /&gt;
+C Ev G Av = C.v6 = &amp;quot;C dot down six&amp;quot; (in certain EDOs, C.~6 = &amp;quot;C dot mid six&amp;quot;)&lt;br /&gt;
 &lt;br /&gt;
 C Eb G A = Cm6 = &amp;quot;C minor six&amp;quot; (in perfect EDOs, C6 = &amp;quot;C six&amp;quot;)&lt;br /&gt;
@@ Line 2,017: / Line 2,022: @@
 C Dv Ev G Bb = C7(v3,v9) = &amp;quot;C seven down-three down-nine&amp;quot;&lt;br /&gt;
 C Dv E G Bbv = C(v7,v9) = &amp;quot;C down-seven down-nine&amp;quot;&lt;br /&gt;
-C Dv Ev G Bbv = C.v7(v9) = &amp;quot;C dot down-seven down-nine&amp;quot;&lt;br /&gt;
+C Dv Ev G Bbv = C.v7(v9) = &amp;quot;C dot down seven down-nine&amp;quot;&lt;br /&gt;
 C Dv Ev Gv Bbv = C.v7(v5,v9) = &amp;quot;C dot down-seven down-five down-nine&amp;quot;&lt;br /&gt;
 &lt;br /&gt;
@@ Line 2,028: / Line 2,033: @@
 C D Eb^ G Bb = Cm9(^3) = &amp;quot;C minor nine up-three&amp;quot; (in certain EDOs, C9(~3) = &amp;quot;C nine mid-three&amp;quot;)&lt;br /&gt;
 C D Eb G Bb^ = Cm9(^7) = &amp;quot;C minor nine up-seven&amp;quot; (in certain EDOs, Cm9(~7) = &amp;quot;C minor nine mid-seven&amp;quot;)&lt;br /&gt;
-C D Eb^ G Bb^ = C.^m9 = &amp;quot;C dot upminor-nine&amp;quot; (in certain EDOs, C9(~3) = &amp;quot;C nine mid-three&amp;quot;)&lt;br /&gt;
+C D Eb^ G Bb^ = C.^m9 = &amp;quot;C dot up minor-nine&amp;quot; (in certain EDOs, C.~M9 = &amp;quot;C dot mid major nine&amp;quot;)&lt;br /&gt;
 &lt;br /&gt;
-C Db E G Bb = C(b9) = &amp;quot;C flat-nine&amp;quot; (not Cb9 = Cb Db Eb Gb Bbb) (in perfect EDOs, C9 = &amp;quot;C nine&amp;quot;)&lt;br /&gt;
+C Db E G Bb = C7(b9) = &amp;quot;C seven flat-nine&amp;quot; (in perfect EDOs, C9 = &amp;quot;C nine&amp;quot;)&lt;br /&gt;
-C Db Ev G Bb = Cb9(v3) = &amp;quot;C flat-nine down-three&amp;quot;&lt;br /&gt;
+C Db Ev G Bb = C7(b9,v3) = &amp;quot;C seven flat-nine down-three&amp;quot;&lt;br /&gt;
-C Db E G Bbv = Cb9(v7) = &amp;quot;C flat-nine down-seven&amp;quot;&lt;br /&gt;
+C Db E G Bbv = C7(b9,v7) = &amp;quot;C seven flat-nine down-seven&amp;quot;&lt;br /&gt;
-C Dbv E G Bb = C7(vb9) = &amp;quot;C seven downflat-nine&amp;quot;, or Cb9(v9) = &amp;quot;C flat-nine down-nine&amp;quot;&lt;br /&gt;
+C Dbv E G Bb = C7(vb9) = &amp;quot;C seven downflat-nine&amp;quot;&lt;br /&gt;
-C Db Ev G Bbv = C.vb9 = &amp;quot;C dot down flat-nine&amp;quot;&lt;br /&gt;
+C Db Ev G Bbv = C.v7(b9) = &amp;quot;C dot down seven flat-nine&amp;quot;&lt;br /&gt;
-C Dbv Ev G Bb = Cb9(v3,v9) = &amp;quot;C flat-nine down-three down-nine&amp;quot;, or C7(v3,vb9)&lt;br /&gt;
+C Dbv Ev G Bb = C7(v3,vb9) = &amp;quot;C seven down-three downflat-nine&amp;quot;&lt;br /&gt;
-C Dbv E G Bbv = Cb9(v7,v9) = &amp;quot;C flat-nine down-seven down-nine&amp;quot;, or C(v7,vb9)&lt;br /&gt;
+C Dbv E G Bbv = C(v7,vb9) = &amp;quot;C down-seven downflat-nine&amp;quot;&lt;br /&gt;
-C Dbv Ev G Bbv = C.v7(vb9) = &amp;quot;C dot down seven downflat-nine&amp;quot;, or C.vb9(v9)&lt;br /&gt;
+C Dbv Ev G Bbv = C.v7(vb9) = &amp;quot;C dot down seven downflat-nine&amp;quot;&lt;br /&gt;
 &lt;br /&gt;
 &lt;u&gt;&lt;strong&gt;Example EDOs:&lt;/strong&gt;&lt;/u&gt;&lt;br /&gt;
@@ Line 2,058: / Line 2,063: @@
 &lt;br /&gt;
 -4-8-11 = D F A Cv = D(v7) = &amp;quot;D down-seven&amp;quot;, or D F A B^ = D(^6) = &amp;quot;D up-six&amp;quot;&lt;br /&gt;
--3-8-11 = D Fv A Cv = D.v7 = &amp;quot;D dot down-seven&amp;quot;&lt;br /&gt;
+-3-8-11 = D Fv A Cv = D.v7 = &amp;quot;D dot down seven&amp;quot;&lt;br /&gt;
--5-8-11 = D F^ A B^ = D.^6 = &amp;quot;D dot up-six&amp;quot;&lt;br /&gt;
+-5-8-11 = D F^ A B^ = D.^6 = &amp;quot;D dot up six&amp;quot;&lt;br /&gt;
 &lt;br /&gt;
 edo: 3 keys per #/b, so ups and downs are needed.&lt;br /&gt;
@@ Line 2,069: / Line 2,074: @@
 -5-9 = D F#v A = D.v = &amp;quot;D dot down&amp;quot; or &amp;quot;D downmajor&amp;quot;&lt;br /&gt;
 -6-9 = D F# A = D = &amp;quot;D&amp;quot; or &amp;quot;D major&amp;quot; (or possibly D G A = Dsus4)&lt;br /&gt;
+-3-9-12 = D F A C = Dm7 = &amp;quot;D minor seven&amp;quot;, or D F A B = Dm6 = &amp;quot;D minor six&amp;quot;&lt;br /&gt;
+-4-9-12 = D F^ A C = Dm7(^3) = &amp;quot;D minor seven up-three&amp;quot;, or D F^ A B = Dm6(^3) = &amp;quot;D minor six up-three&amp;quot;&lt;br /&gt;
+-5-9-12 = D F#v A C = D7(v3) = &amp;quot;D seven down-three&amp;quot;, or D F#v A B = D6(v3) = &amp;quot;D six down-three&amp;quot;&lt;br /&gt;
 -6-9-12 = D F# A C = D7 = &amp;quot;D seven&amp;quot;, or D F# A B = D6 = &amp;quot;D six&amp;quot;&lt;br /&gt;
+-5-9-14 = D F#v A C#v = D.vM7 = &amp;quot;D dot down major-seven&amp;quot;&lt;br /&gt;
+-4-9-13 = D F^ A C^ = D.^m7 = &amp;quot;D dot up minor-seven&amp;quot;, or D F^ A B^ = D.^m6 = &amp;quot;D dot up minor-six&amp;quot;&lt;br /&gt;
 &lt;br /&gt;
 edo: D * E * * F * G * A * B * * C * D, 1 key per #/b, ups and downs not needed.&lt;br /&gt;