Chords of octacot: Difference between revisions

Below are listed the [[11-odd-limit]] [[dyadic chord]]s of [[11-limit]] [[octacot]] temperament. The essentially just chords are typed as otonal, utonal, or ambitonal. Those requiring tempering only by [[540/539]] are [[swetismic chords|swetismic]], by [[441/440]] [[werckismic chords|werckismic]], by [[243/242]] [[rastmic chords|rastmic]], by [[245/243]] [[sensamagic chords|sensamagic]], by [[245/242]] [[frostmic chords|frostmic]], and by [[100/99]] [[ptolemismic chords|ptolemismic]]. Those requiring tempering by any two of 540/539, 441/440 or 243/242 are labeled [[jove chords|jove]], those requiring any two of 441/440, 245/242 or 100/99 [[nakika chords|nakika]], those requiring any two of 540/539, 245/243 or 100/99 [[octarod chords|octarod]]. Finally, those requiring any three independent commas of those discussed above are essentially octacot and are labeled octacot.  

Octacot has [[mos]] of size 13, 14, 27, 41, and 68. Even 13 notes is enough to supply plenty of harmony, including hexads. It should be noted that 88-[[cent]] equal temperament ([[88cET]]) is identical to the generator chain of octacot in the 11\150 generator tuning. Hence, if the chains listed under chords are interpreted to belong to the correct octave, the tables below may also be viewed as tables of the chords of 88cET. The transversals become transversals of 88cET if we leave them unchanged up to 11/6, and raise 9/8, 5/4, and 11/8 to 9/4, 5/2, and 11/4.

== Triads ==

{| class="wikitable center-1"

|-

! Chord

! Transversal

! Type

|-

| 1

| 0–2–4

| 1–10/9–11/9

| otonal

|-

| 2

| 0–2–5

| 1–10/9–9/7

| sensamagic

|-

| 3

| 0–3–5

| 1–7/6–9/7

| sensamagic

|-

| 4

| 0–2–7

| 1–10/9–10/7

| utonal

|-

| 5

| 0–3–7

| 1–7/6–10/7

| swetismic

|-

| 6

| 0–4–7

| 1–11/9–10/7

| swetismic

|-

| 7

| 0–5–7

| 1–9/7–10/7

| otonal

|-

| 8

| 0–3–8

| 1–7/6–3/2

| otonal

|-

| 9

| 0–4–8

| 1–11/9–3/2

| rastmic

|-

| 10

| 0–5–8

| 1–9/7–3/2

| utonal

|-

| 11

| 0–2–9

| 1–11/10–11/7

| utonal

|-

| 12

| 0–4–9

| 1–11/9–11/7

| utonal

|-

| 13

| 0–5–9

| 1–9/7–11/7

| otonal

|-

| 14

| 0–7–9

| 1–10/7–11/7

| otonal

|-

| 15

| 0–2–10

| 1–10/9–5/3

| utonal

|-

| 16

| 0–3–10

| 1–7/6–5/3

| otonal

|-

| 17

| 0–5–10

| 1–9/7–5/3

| sensamagic

|-

| 18

| 0–7–10

| 1–10/7–5/3

| utonal

|-

| 19

| 0–8–10

| 1–3/2–5/3

| otonal

|-

| 20

| 0–2–11

| 1–10/9–7/4

| werckismic

|-

| 21

| 0–3–11

| 1–7/6–7/4

| utonal

|-

| 22

| 0–4–11

| 1–11/9–7/4

| werckismic

|-

| 23

| 0–7–11

| 1–10/7–7/4

| werckismic

|-

| 24

| 0–8–11

| 1–3/2–7/4

| otonal

|-

| 25

| 0–9–11

| 1–11/7–7/4

| werckismic

|-

| 26

| 0–2–12

| 1–11/10–11/6

| utonal

|-

| 27

| 0–3–12

| 1–7/6–11/6

| otonal

|-

| 28

| 0–4–12

| 1–11/9–11/6

| utonal

|-

| 29

| 0–5–12

| 1–9/7–11/6

| swetismic

|-

| 30

| 0–7–12

| 1–10/7–11/6

| swetismic

|-

| 31

| 0–8–12

| 1–3/2–11/6

| otonal

|-

| 32

| 0–9–12

| 1–11/7–11/6

| utonal

|-

| 33

| 0–10–12

| 1–5/3–11/6

| otonal

|-

| 34

| 0–4–16

| 1–11/9–9/8

| rastmic

|-

| 35

| 0–5–16

| 1–9/7–9/8

| utonal

|-

| 36

| 0–7–16

| 1–10/7–9/8

| werckismic

|-

| 37

| 0–8–16

| 1–3/2–9/8

| ambitonal

|-

| 38

| 0–9–16

| 1–11/7–9/8

| werckismic

|-

| 39

| 0–11–16

| 1–7/4–9/8

| otonal

|-

| 40

| 0–12–16

| 1–11/6–9/8

| rastmic

|-

| 41

| 0–2–18

| 1–10/9–5/4

| utonal

|-

| 42

| 0–7–18

| 1–10/7–5/4

| utonal

|-

| 43

| 0–8–18

| 1–3/2–5/4

| otonal

|-

| 44

| 0–9–18

| 1–11/7–5/4

| frostmic

|-

| 45

| 0–10–18

| 1–5/3–5/4

| utonal

|-

| 46

| 0–11–18

| 1–7/4–5/4

| otonal

|-

| 47

| 0–16–18

| 1–9/8–5/4

| otonal

|-

| 48

| 0–2–20

| 1–11/10–11/8

| utonal

|-

| 49

| 0–4–20

| 1–11/9–11/8

| utonal

|-

| 50

| 0–8–20

| 1–3/2–11/8

| otonal

|-

| 51

| 0–9–20

| 1–11/7–11/8

| utonal

|-

| 52

| 0–10–20

| 1–5/3–11/8

| ptolemismic

|-

| 53

| 0–11–20

| 1–7/4–11/8

| otonal

|-

| 54

| 0–12–20

| 1–11/6–11/8

| utonal

|-

| 55

| 0–16–20

| 1–9/8–11/8

| otonal

|-

| 56

| 0–18–20

| 1–5/4–11/8

| otonal

|}

== Tetrads ==

{| class="wikitable center-1"

|-

! Chord

! Transversal

! Type

|-

| 1

| 0–2–4–7

| 1–10/9–11/9–10/7

| octarod

|-

| 2

| 0–2–5–7

| 1–10/9–9/7–10/7

| sensamagic

|-

| 3

| 0–3–5–7

| 1–7/6–9/7–10/7

| octarod

|-

| 4

| 0–3–5–8

| 1–7/6–9/7–3/2

| sensamagic

|-

| 5

| 0–2–4–9

| 1–11/10–11/9–11/7

|-

| 0–2–5–9

| 1–10/9–9/7–11/7

| octarod

|-

| 7

| 0–2–7–9

| 1–10/9–10/7–11/7

| ptolemismic

|-

| 8

| 0–4–7–9

| 1–11/9–10/7–11/7

| octarod

|-

| 9

| 0–5–7–9

| 1–9/7–10/7–11/7

| otonal

|-

| 10

| 0–2–5–10

| 1–10/9–9/7–5/3

| sensamagic

|-

| 0–3–5–10

| 1–7/6–9/7–5/3

| sensamagic

|-

| 12

| 0–2–7–10

| 1–10/9–10/7–5/3

| utonal

|-

| 13

| 0–3–7–10

| 1–7/6–10/7–5/3

| swetismic

|-

| 14

| 0–5–7–10

| 1–9/7–10/7–5/3

| sensamagic

|-

| 15

| 0–3–8–10

| 1–7/6–3/2–5/3

| otonal

|-

| 16

| 0–5–8–10

| 1–9/7–3/2–5/3

| sensamagic

|-

| 17

| 0–2–4–11

| 1–10/9–11/9–7/4

|-

| 0–2–7–11

| 1–10/9–10/7–7/4

| werckismic

|-

| 19

| 0–3–7–11

| 1–7/6–10/7–7/4

| jove

|-

| 20

| 0–4–7–11

| 1–11/9–10/7–7/4

| jove

|-

| 21

| 0–3–8–11

| 1–7/6–3/2–7/4

| ambitonal

|-

| 22

| 0–4–8–11

| 1–11/9–3/2–7/4

| jove

|-

| 23

| 0–2–9–11

| 1–10/9–11/7–7/4

| nakika

|-

| 24

| 0–4–9–11

| 1–11/9–11/7–7/4

| werckismic

|-

| 25

| 0–7–9–11

| 1–10/7–11/7–7/4

| nakika

|-

| 26

| 0–2–4–12

| 1–11/10–11/9–11/6

| utonal

|-

| 27

| 0–2–5–12

| 1–10/9–9/7–11/6

| octarod

|-

| 28

| 0–3–5–12

| 1–7/6–9/7–11/6

| octarod

|-

| 29

| 0–2–7–12

| 1–10/9–10/7–11/6

| octarod

|-

| 30

| 0–3–7–12

| 1–7/6–10/7–11/6

| swetismic

|-

| 31

| 0–4–7–12

| 1–11/9–10/7–11/6

| swetismic

|-

| 32

| 0–5–7–12

| 1–9/7–10/7–11/6

| swetismic

|-

| 33

| 0–3–8–12

| 1–7/6–3/2–11/6

| otonal

|-

| 0–4–8–12

| 1–11/9–3/2–11/6

| rastmic

|-

| 35

| 0–5–8–12

| 1–9/7–3/2–11/6

| swetismic

|-

| 36

| 0–2–9–12

| 1–11/10–11/7–11/6

| utonal

|-

| 37

| 0–4–9–12

| 1–11/9–11/7–11/6

| utonal

|-

| 38

| 0–5–9–12

| 1–9/7–11/7–11/6

| swetismic

|-

| 39

| 0–7–9–12

| 1–10/7–11/7–11/6

| octarod

|-

| 40

| 0–2–10–12

| 1–10/9–5/3–11/6

| ptolemismic

|-

| 41

| 0–3–10–12

| 1–7/6–5/3–11/6

| otonal

|-

| 42

| 0–5–10–12

| 1–9/7–5/3–11/6

| octarod

|-

| 43

| 0–7–10–12

| 1–10/7–5/3–11/6

| octarod

|-

| 44

| 0–8–10–12

| 1–3/2–5/3–11/6

| otonal

|-

| 45

| 0–4–7–16

| 1–11/9–10/7–9/8

| jove

|-

| 46

| 0–5–7–16

| 1–9/7–10/7–9/8

| werckismic

|-

| 47

| 0–4–8–16

| 1–11/9–3/2–9/8

| rastmic

|-

| 48

| 0–5–8–16

| 1–9/7–3/2–9/8

| utonal

|-

| 49

| 0–4–9–16

| 1–11/9–11/7–9/8

| jove

|-

| 50

| 0–5–9–16

| 1–9/7–11/7–9/8

| werckismic

|-

| 51

| 0–7–9–16

| 1–10/7–11/7–9/8

| nakika

|-

| 52

| 0–4–11–16

| 1–11/9–7/4–9/8

| jove

|-

| 53

| 0–7–11–16

| 1–10/7–7/4–9/8

| werckismic

|-

| 54

| 0–8–11–16

| 1–3/2–7/4–9/8

| otonal

|-

| 55

| 0–9–11–16

| 1–11/7–7/4–9/8

| werckismic

|-

| 56

| 0–4–12–16

| 1–11/9–11/6–9/8

| rastmic

|-

| 57

| 0–5–12–16

| 1–9/7–11/6–9/8

| jove

|-

| 58

| 0–7–12–16

| 1–10/7–11/6–9/8

| jove

|-

| 59

| 0–8–12–16

| 1–3/2–11/6–9/8

| rastmic

|-

| 60

| 0–9–12–16

| 1–11/7–11/6–9/8

| jove

|-

| 61

| 0–2–7–18

| 1–10/9–10/7–5/4

| utonal

|-

| 62

| 0–2–9–18

| 1–10/9–11/7–5/4

| nakika

|-

| 63

| 0–7–9–18

| 1–10/7–11/7–5/4

| nakika

|-

| 64

| 0–2–10–18

| 1–10/9–5/3–5/4

| utonal

|-

| 0–7–10–18

| 1–10/7–5/3–5/4

| utonal

|-

| 66

| 0–8–10–18

| 1–3/2–5/3–5/4

| ambitonal

|-

| 67

| 0–2–11–18

| 1–10/9–7/4–5/4

| werckismic

|-

| 68

| 0–7–11–18

| 1–10/7–7/4–5/4

| werckismic

|-

| 69

| 0–8–11–18

| 1–3/2–7/4–5/4

| otonal

|-

| 70

| 0–9–11–18

| 1–11/7–7/4–5/4

| nakika

|-

| 71

| 0–7–16–18

| 1–10/7–9/8–5/4

| werckismic

|-

| 72

| 0–8–16–18

| 1–3/2–9/8–5/4

| otonal

|-

| 73

| 0–9–16–18

| 1–11/7–9/8–5/4

| nakika

|-

| 74

| 0–11–16–18

| 1–7/4–9/8–5/4

| otonal

|-

| 75

| 0–2–4–20

| 1–11/10–11/9–11/8

| utonal

|-

| 76

| 0–4–8–20

| 1–11/9–3/2–11/8

| rastmic

|-

| 77

| 0–2–9–20

| 1–11/10–11/7–11/8

| utonal

|-

| 78

| 0–4–9–20

| 1–11/9–11/7–11/8

| utonal

|-

| 0–2–10–20

| 1–10/9–5/3–11/8

| ptolemismic

|-

| 80

| 0–8–10–20

| 1–3/2–5/3–11/8

| ptolemismic

|-

| 81

| 0–2–11–20

| 1–10/9–7/4–11/8

| nakika

|-

| 82

| 0–4–11–20

| 1–11/9–7/4–11/8

| werckismic

|-

| 83

| 0–8–11–20

| 1–3/2–7/4–11/8

| otonal

|-

| 84

| 0–9–11–20

| 1–11/7–7/4–11/8

| werckismic

|-

| 85

| 0–2–12–20

| 1–11/10–11/6–11/8

| utonal

|-

| 86

| 0–4–12–20

| 1–11/9–11/6–11/8

| utonal

|-

| 87

| 0–8–12–20

| 1–3/2–11/6–11/8

| ambitonal

|-

| 88

| 0–9–12–20

| 1–11/7–11/6–11/8

| utonal

|-

| 89

| 0–10–12–20

| 1–5/3–11/6–11/8

| ptolemismic

|-

| 0–4–16–20

| 1–11/9–9/8–11/8

| rastmic

|-

| 91

| 0–8–16–20

| 1–3/2–9/8–11/8

| otonal

|-

| 92

| 0–9–16–20

| 1–11/7–9/8–11/8

| werckismic

|-

| 93

| 0–11–16–20

| 1–7/4–9/8–11/8

| otonal

|-

| 94

| 0–12–16–20

| 1–11/6–9/8–11/8

| rastmic

|-

| 95

| 0–2–18–20

| 1–10/9–5/4–11/8

| ptolemismic

|-

| 96

| 0–8–18–20

| 1–3/2–5/4–11/8

| otonal

|-

| 97

| 0–9–18–20

| 1–11/7–5/4–11/8

| nakika

|-

| 98

| 0–10–18–20

| 1–5/3–5/4–11/8

| ptolemismic

|-

| 99

| 0–11–18–20

| 1–7/4–5/4–11/8

| otonal

|-

| 100

| 0–16–18–20

| 1–9/8–5/4–11/8

| otonal

|}

== Pentads ==

{| class="wikitable center-1"

|-

! Chord

! Transversal

! Type

|-

| 1

| 0–2–4–7–9

| 1–10/9–11/9–10/7–11/7

| octarod

|-

| 2

| 0–2–5–7–9

| 1–10/9–9/7–10/7–11/7

| octarod

|-

| 3

| 0–2–5–7–10

| 1–10/9–9/7–10/7–5/3

| sensamagic

|-

| 0–3–5–7–10

| 1–7/6–9/7–10/7–5/3

| octarod

|-

| 5

| 0–3–5–8–10

| 1–7/6–9/7–3/2–5/3

| sensamagic

|-

| 6

| 0–2–4–7–11

| 1–10/9–11/9–10/7–7/4

| octacot

|-

| 7

| 0–2–4–9–11

| 1–10/9–11/9–11/7–7/4

| nakika

|-

| 0–2–7–9–11

| 1–10/9–10/7–11/7–7/4

| nakika

|-

| 9

| 1–11/9–10/7–11/7–7/4

| octacot

|-

| 10

| 0–2–4–7–12

| 1–10/9–11/9–10/7–11/6

| octarod

|-

| 11

| 0–2–5–7–12

| 1–10/9–9/7–10/7–11/6

| octarod

|-

| 0–3–5–7–12

| 1–7/6–9/7–10/7–11/6

| octarod

|-

| 13

| 0–3–5–8–12

| 1–7/6–9/7–3/2–11/6

| octarod

|-

| 0–2–4–9–12

| 1–11/10–11/9–11/7–11/6

|-

| 15

| 0–2–5–9–12

| 1–10/9–9/7–11/7–11/6

| octarod

|-

| 16

| 0–2–7–9–12

| 1–10/9–10/7–11/7–11/6

| octarod

|-

| 17

| 0–4–7–9–12

| 1–11/9–10/7–11/7–11/6

| octarod

|-

| 18

| 0–5–7–9–12

| 1–9/7–10/7–11/7–11/6

|-

| 19

| 0–2–5–10–12

| 1–10/9–9/7–5/3–11/6

| octarod

|-

| 20

| 0–3–5–10–12

| 1–7/6–9/7–5/3–11/6

| octarod

|-

| 21

| 0–2–7–10–12

| 1–10/9–10/7–5/3–11/6

| octarod

|-

| 22

| 0–3–7–10–12

| 1–7/6–10/7–5/3–11/6

| octarod

|-

| 23

| 0–5–7–10–12

| 1–9/7–10/7–5/3–11/6

| octarod

|-

| 24

| 0–3–8–10–12

| 1–7/6–3/2–5/3–11/6

| otonal

|-

| 0–5–8–10–12

| 1–9/7–3/2–5/3–11/6

| octarod

|-

| 26

| 0–4–7–9–16

| 1–11/9–10/7–11/7–9/8

| octacot

|-

| 27

| 0–5–7–9–16

| 1–9/7–10/7–11/7–9/8

| nakika

|-

| 28

| 0–4–7–11–16

| 1–11/9–10/7–7/4–9/8

| jove

|-

| 29

| 0–4–8–11–16

| 1–11/9–3/2–7/4–9/8

| jove

|-

| 30

| 0–4–9–11–16

| 1–11/9–11/7–7/4–9/8

| jove

|-

| 31

| 0–7–9–11–16

| 1–10/7–11/7–7/4–9/8

| nakika

|-

| 32

| 0–4–7–12–16

| 1–11/9–10/7–11/6–9/8

| jove

|-

| 0–5–7–12–16

| 1–9/7–10/7–11/6–9/8

| jove

|-

| 34

| 0–4–8–12–16

| 1–11/9–3/2–11/6–9/8

| rastmic

|-

| 35

| 0–5–8–12–16

| 1–9/7–3/2–11/6–9/8

|-

| 36

| 0–4–9–12–16

| 1–11/9–11/7–11/6–9/8

| jove

|-

| 37

| 0–5–9–12–16

|-

| 0–7–9–12–16

| 1–10/7–11/7–11/6–9/8

| octacot

|-

| 39

| 0–2–7–9–18

| 1–10/9–10/7–11/7–5/4

| nakika

|-

| 40

| 0–2–7–10–18

| 1–10/9–10/7–5/3–5/4

| utonal

|-

| 41

| 0–2–7–11–18

| 1–10/9–10/7–7/4–5/4

| werckismic

|-

| 42

| 0–2–9–11–18

| 1–10/9–11/7–7/4–5/4

| nakika

|-

| 43

| 0–7–9–11–18

| 1–10/7–11/7–7/4–5/4

| nakika

|-

| 44

| 0–7–9–16–18

| 1–10/7–11/7–9/8–5/4

| nakika

|-

| 45

| 0–7–11–16–18