Mapping
sharpness = 2 ; L = 3 ; s = 1
| Degree
|
Name
|
Approximate Ratios
|
Approximate Ratios
|
Name
|
Degree
|
| 0
|
root
|
1/1
|
2/1
|
octave
|
17
|
| 1
|
min2
|
25/24
|
48/25
|
Maj7
|
16
|
| 2
|
neu2
|
14/13, 13/12, 12/11
|
11/6, 24/13, 13/7
|
neu7
|
15
|
| 3
|
Maj2
|
9/8, 8/7
|
7/4, 16/9
|
min7
|
14
|
| 4
|
min3
|
20/17, 13/11
|
22/13, 17/10
|
Maj6
|
13
|
| 5
|
neu3
|
11/9, 16/13
|
13/8, 18/11
|
neu6
|
12
|
| 6
|
Maj3
|
14/11
|
11/7
|
min6
|
11
|
| 7
|
4
|
4/3
|
3/2
|
5
|
10
|
| 8
|
neu4, dim5
|
18/13
|
13/9
|
neu5, Aug4
|
9
|
Some chords
Triads
| Maj2 5
|
0, 3, 10
|
| 4 min7
|
0, 7, 14
|
| 4 5
|
0, 7, 10
|
|
| 5 min7
|
0, 10, 14
|
| min3 4
|
0, 4, 7
|
| Maj2 Maj6
|
0, 3, 13
|
|
| 5 Maj6
|
0, 10, 13
|
| Maj2 4
|
0, 3, 7
|
| min3 min7
|
0, 4, 14
|
|
| Maj3 5
|
0, 6, 10
|
| min3 min6
|
0, 4, 11
|
| 4 Maj6
|
0, 7, 13
|
|
| min3 5
|
0, 4, 10
|
| Maj3 Maj6
|
0, 6, 13
|
| 4 min6
|
0, 7, 11
|
|
| neu3 5
|
0, 5, 10
|
| neu3 neu6
|
0, 5, 12
|
| 4 neu6
|
0, 7, 12
|
|
| 5 neu7
|
0, 10, 15
|
| neu3 4
|
0, 5, 7
|
| neu2 neu6
|
0, 2, 12
|
|
| 5 neu6
|
0, 10, 12
|
| neu2 4
|
0, 2, 7
|
| neu3 neu7
|
0, 5, 15
|
|
| neu2 5
|
0, 2, 10
|
| neu4 neu7
|
0, 8, 15
|
| 4 neu5
|
0, 7, 9
|
|
| neu4 5
|
0, 8, 10
|
| neu2 neu5
|
0, 2, 9
|
| 4 neu7
|
0, 7, 15
|
|
Tetrads
Pentads
Hexads
Heptads
Octoads
MOS Regular Temperaments