Lumatone mapping for 51edo: Difference between revisions
Jump to navigation
Jump to search
ArrowHead294 (talk | contribs) mNo edit summary |
ArrowHead294 (talk | contribs) mNo edit summary |
||
| Line 1: | Line 1: | ||
{{Lumatone mapping intro}} You can use the b val, which can be interpreted as either [[mavila]] or [[undecimation]], but is not a particularly great tuning for either. | {{Lumatone mapping intro}} | ||
== Antidiatonic == | |||
You can use the b val, which can be interpreted as either [[mavila]] or [[undecimation]], but is not a particularly great tuning for either. | |||
{{Lumatone EDO mapping|n=51|start=33|xstep=7|ystep=1}} | {{Lumatone EDO mapping|n=51|start=33|xstep=7|ystep=1}} | ||
== Slendric == | |||
Instead, it is probably better to use one of the mappings that reaches the perfect 5th in three generator steps. Of these, the [[ | Instead, it is probably better to use one of the mappings that reaches the perfect 5th in three generator steps. Of these, the [[Slendric]] mapping has the greater range. | ||
{{Lumatone EDO mapping|n=51|start=24|xstep=10|ystep=-9}} | {{Lumatone EDO mapping|n=51|start=24|xstep=10|ystep=-9}} | ||
== Porcupine == | |||
However, the [[ | However, the [[Porky]] mapping is probably more intuitive to people used to using a heptatonic scale and simple 5-limit ratios in chords. | ||
{{Lumatone EDO mapping|n=51|start=18|xstep=7|ystep=2}} | {{Lumatone EDO mapping|n=51|start=18|xstep=7|ystep=2}} | ||
{{Navbox Lumatone}} | {{Navbox Lumatone}} | ||
Revision as of 15:21, 23 March 2025
There are many conceivable ways to map 51edo onto the onto the Lumatone keyboard. However, it has 3 mutually-exclusive rings of fifths, so the Standard Lumatone mapping for Pythagorean is not one of them.
Antidiatonic
You can use the b val, which can be interpreted as either mavila or undecimation, but is not a particularly great tuning for either.
33
40
41
48
4
11
18
42
49
5
12
19
26
33
40
50
6
13
20
27
34
41
48
4
11
18
0
7
14
21
28
35
42
49
5
12
19
26
33
40
8
15
22
29
36
43
50
6
13
20
27
34
41
48
4
11
18
9
16
23
30
37
44
0
7
14
21
28
35
42
49
5
12
19
26
33
40
17
24
31
38
45
1
8
15
22
29
36
43
50
6
13
20
27
34
41
48
4
11
18
18
25
32
39
46
2
9
16
23
30
37
44
0
7
14
21
28
35
42
49
5
12
19
26
33
40
33
40
47
3
10
17
24
31
38
45
1
8
15
22
29
36
43
50
6
13
20
27
34
41
48
4
11
18
4
11
18
25
32
39
46
2
9
16
23
30
37
44
0
7
14
21
28
35
42
49
5
12
19
26
33
40
47
3
10
17
24
31
38
45
1
8
15
22
29
36
43
50
6
13
20
27
34
4
11
18
25
32
39
46
2
9
16
23
30
37
44
0
7
14
21
28
35
33
40
47
3
10
17
24
31
38
45
1
8
15
22
29
36
43
4
11
18
25
32
39
46
2
9
16
23
30
37
44
33
40
47
3
10
17
24
31
38
45
1
4
11
18
25
32
39
46
2
33
40
47
3
10
4
11
Slendric
Instead, it is probably better to use one of the mappings that reaches the perfect 5th in three generator steps. Of these, the Slendric mapping has the greater range.
24
34
25
35
45
4
14
16
26
36
46
5
15
25
35
17
27
37
47
6
16
26
36
46
5
15
8
18
28
38
48
7
17
27
37
47
6
16
26
36
9
19
29
39
49
8
18
28
38
48
7
17
27
37
47
6
16
0
10
20
30
40
50
9
19
29
39
49
8
18
28
38
48
7
17
27
37
1
11
21
31
41
0
10
20
30
40
50
9
19
29
39
49
8
18
28
38
48
7
17
43
2
12
22
32
42
1
11
21
31
41
0
10
20
30
40
50
9
19
29
39
49
8
18
28
38
3
13
23
33
43
2
12
22
32
42
1
11
21
31
41
0
10
20
30
40
50
9
19
29
39
49
8
18
24
34
44
3
13
23
33
43
2
12
22
32
42
1
11
21
31
41
0
10
20
30
40
50
9
19
4
14
24
34
44
3
13
23
33
43
2
12
22
32
42
1
11
21
31
41
0
10
20
25
35
45
4
14
24
34
44
3
13
23
33
43
2
12
22
32
42
1
11
5
15
25
35
45
4
14
24
34
44
3
13
23
33
43
2
12
26
36
46
5
15
25
35
45
4
14
24
34
44
3
6
16
26
36
46
5
15
25
35
45
4
27
37
47
6
16
26
36
46
7
17
27
37
47
28
38
Porcupine
However, the Porky mapping is probably more intuitive to people used to using a heptatonic scale and simple 5-limit ratios in chords.
18
25
27
34
41
48
4
29
36
43
50
6
13
20
27
38
45
1
8
15
22
29
36
43
50
6
40
47
3
10
17
24
31
38
45
1
8
15
22
29
49
5
12
19
26
33
40
47
3
10
17
24
31
38
45
1
8
0
7
14
21
28
35
42
49
5
12
19
26
33
40
47
3
10
17
24
31
9
16
23
30
37
44
0
7
14
21
28
35
42
49
5
12
19
26
33
40
47
3
10
11
18
25
32
39
46
2
9
16
23
30
37
44
0
7
14
21
28
35
42
49
5
12
19
26
33
27
34
41
48
4
11
18
25
32
39
46
2
9
16
23
30
37
44
0
7
14
21
28
35
42
49
5
12
50
6
13
20
27
34
41
48
4
11
18
25
32
39
46
2
9
16
23
30
37
44
0
7
14
21
29
36
43
50
6
13
20
27
34
41
48
4
11
18
25
32
39
46
2
9
16
23
30
1
8
15
22
29
36
43
50
6
13
20
27
34
41
48
4
11
18
25
32
31
38
45
1
8
15
22
29
36
43
50
6
13
20
27
34
41
3
10
17
24
31
38
45
1
8
15
22
29
36
43
33
40
47
3
10
17
24
31
38
45
1
5
12
19
26
33
40
47
3
35
42
49
5
12
7
14