Lumatone mapping for 47edo: Difference between revisions
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{{Lumatone mapping intro}} The flat one is slightly closer, making it the [[patent val]]. | |||
== Diatonic == | |||
=== Flat fifth === | |||
{{Lumatone EDO mapping|n=47|start=37|xstep=7|ystep=-1}} | {{Lumatone EDO mapping|n=47|start=37|xstep=7|ystep=-1}} | ||
=== Sharp fifth === | |||
{{Lumatone EDO mapping|n=47|start=14|xstep=9|ystep=-8}} | {{Lumatone EDO mapping|n=47|start=14|xstep=9|ystep=-8}} | ||
== Baldy == | |||
Instead, it is probably better to treat it as a no-3's subgroup temperament, which the [[baldy]] mapping does quite effectively. | Instead, it is probably better to treat it as a no-3's subgroup temperament, which the [[baldy]] mapping does quite effectively. | ||
{{Lumatone EDO mapping|n=47|start=29|xstep=8|ystep=-1}} | {{Lumatone EDO mapping|n=47|start=29|xstep=8|ystep=-1}} | ||
{{Navbox Lumatone}} | {{Navbox Lumatone}} | ||
Latest revision as of 15:18, 23 March 2025
There are many conceivable ways to map 47edo onto the onto the Lumatone keyboard. However, as both of its fifths are about as far away from just as possible, neither the sharp or the flat versions of the Standard Lumatone mapping for Pythagorean work particularly well. The flat one is slightly closer, making it the patent val.
Diatonic
Flat fifth
37
44
43
3
10
17
24
42
2
9
16
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1
8
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36
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3
10
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0
7
14
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35
42
2
9
16
23
30
37
44
6
13
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41
1
8
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0
7
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9
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9
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11
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7
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8
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0
7
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40
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10
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38
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3
Sharp fifth
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24
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7
16
25
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43
5
14
23
8
17
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6
15
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4
0
9
18
27
36
45
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16
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14
23
1
10
19
28
37
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8
17
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6
15
24
33
42
4
40
2
11
20
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38
0
9
18
27
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45
7
16
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34
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5
14
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3
12
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30
39
1
10
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17
26
35
44
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15
24
33
42
4
33
42
4
13
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31
40
2
11
20
29
38
0
9
18
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7
16
25
34
43
5
14
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43
5
14
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32
41
3
12
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30
39
1
10
19
28
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17
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6
15
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15
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4
13
22
31
40
2
11
20
29
38
0
9
18
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16
25
34
43
5
43
5
14
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32
41
3
12
21
30
39
1
10
19
28
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8
17
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35
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6
15
24
33
42
4
13
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31
40
2
11
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29
38
0
9
18
27
36
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43
5
14
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3
12
21
30
39
1
10
19
28
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15
24
33
42
4
13
22
31
40
2
11
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14
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32
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3
12
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30
39
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24
33
42
4
13
22
31
43
5
14
23
32
15
24
Baldy
Instead, it is probably better to treat it as a no-3's subgroup temperament, which the baldy mapping does quite effectively.
29
37
36
44
5
13
21
35
43
4
12
20
28
36
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3
11
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12
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1
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2
10
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26
34
42
3
11
19
27
35
0
8
16
24
32
40
1
9
17
25
33
41
2
10
18
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34
42
3
11
7
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23
31
39
0
8
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1
9
17
25
33
41
2
10
18
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34
42
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14
22
30
38
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7
15
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39
0
8
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40
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9
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2
10
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14
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15
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8
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40
1
9
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8
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40
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9
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13
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29
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14
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0
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14
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13
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11
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3
11
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