User:Hotcrystal0/Sandbox
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Factorization
2-17 × 360 × 7-12 × 13-12
Monzo
[-17 60 0 -12 0 -12⟩
Size in cents
5.057233¢
Name
N/A
FJS name
[math]\displaystyle{ \text{19d}{-12}_{7,7,7,7,7,7,7,7,7,7,7,7,13,13,13,13,13,13,13,13,13,13,13,13} }[/math]
Special properties
reduced
Tenney norm (log2 nd)
190.191
Weil norm (log2 max(n, d))
190.196
Wilson norm (sopfr(nd))
454
Comma size
small
Open this interval in xen-calc
Ratio
355/113
Subgroup monzo
5.71.113 [1 1 -1⟩
Size in cents
1981.796¢
Name
N/A
FJS name
[math]\displaystyle{ \text{A12}^{5,71}_{113} }[/math]
Tenney norm (log2 nd)
15.2919
Weil norm (log2 max(n, d))
16.9434
Wilson norm (sopfr(nd))
189
Open this interval in xen-calc
Ratio
2187/1250
Factorization
2-1 × 37 × 5-4
Monzo
[-1 7 -4⟩
Size in cents
968.4302¢
Name
N/A
FJS name
[math]\displaystyle{ \text{d7}_{5,5,5,5} }[/math]
Special properties
reduced
Tenney norm (log2 nd)
21.3824
Weil norm (log2 max(n, d))
22.1895
Wilson norm (sopfr(nd))
43
Open this interval in xen-calc
Ratio
442/295
Subgroup monzo
2.5.13.17.59 [1 -1 1 1 -1⟩
Size in cents
699.9977¢
Name
N/A
FJS name
[math]\displaystyle{ \text{dd6}^{13,17}_{5,59} }[/math]
Special properties
reduced
Tenney norm (log2 nd)
16.9925
Weil norm (log2 max(n, d))
17.5758
Wilson norm (sopfr(nd))
96
Open this interval in xen-calc
Prime factorization
5 × 11
Step size
25.5256 ¢
Octave
47\55ed9/4 (1199.7 ¢)
(convergent)
Twelfth
75\55ed9/4 (1914.42 ¢) (→ 15\11ed9/4)
Consistency limit
3
Distinct consistency limit
3
| Interval information |
Audio demonstration
| Interval information |
Audio demonstration
| Interval information |
Audio demonstration
| Interval information |
Audio demonstration
someone tell me how to insert the infobox without having to add the categories
nevermind I figured it out
2187/1250
| Edo | Step size | Cents (¢) | Absolute error (¢) | Relative error (%) |
|---|---|---|---|---|
| 5 | 4\5 | 960.00 | -8.43 | -3.51 |
| 10 | 8\10 | 960.00 | -8.43 | -7.03 |
| 16 | 13\16 | 975.00 | +6.57 | +8.76 |
| 21 | 17\21 | 971.43 | +3.00 | +5.25 |
| 26 | 21\26 | 969.23 | +0.80 | +1.73 |
| 31 | 25\31 | 967.74 | -0.69 | -1.78 |
| 36 | 29\36 | 966.67 | -1.76 | -5.29 |
| 41 | 33\41 | 965.85 | -2.58 | -8.80 |
| 47 | 38\47 | 970.21 | +1.78 | +6.98 |
| 52 | 42\52 | 969.23 | +0.80 | +3.47 |
| 57 | 46\57 | 968.42 | -0.01 | -0.04 |
| 62 | 50\62 | 967.74 | -0.69 | -3.56 |
| 67 | 54\67 | 967.16 | -1.27 | -7.07 |
| 73 | 59\73 | 969.86 | +1.43 | +8.72 |
| 78 | 63\78 | 969.23 | +0.80 | +5.20 |
140/99
| Edo | Step size | Cents (¢) | Absolute error (¢) | Relative error (%) |
|---|---|---|---|---|
| 2 | 1\2 | 600.00 | +0.09 | +0.01 |
| 4 | 2\4 | 600.00 | +0.09 | +0.03 |
| 6 | 3\6 | 600.00 | +0.09 | +0.04 |
| 8 | 4\8 | 600.00 | +0.09 | +0.06 |
| 10 | 5\10 | 600.00 | +0.09 | +0.07 |
| 12 | 6\12 | 600.00 | +0.09 | +0.09 |
| 14 | 7\14 | 600.00 | +0.09 | +0.10 |
| 16 | 8\16 | 600.00 | +0.09 | +0.12 |
| 18 | 9\18 | 600.00 | +0.09 | +0.13 |
| 20 | 10\20 | 600.00 | +0.09 | +0.15 |
| 22 | 11\22 | 600.00 | +0.09 | +0.16 |
| 24 | 12\24 | 600.00 | +0.09 | +0.18 |
| 26 | 13\26 | 600.00 | +0.09 | +0.19 |
| 28 | 14\28 | 600.00 | +0.09 | +0.21 |
| 30 | 15\30 | 600.00 | +0.09 | +0.22 |
| 32 | 16\32 | 600.00 | +0.09 | +0.24 |
| 34 | 17\34 | 600.00 | +0.09 | +0.25 |
| 36 | 18\36 | 600.00 | +0.09 | +0.26 |
| 38 | 19\38 | 600.00 | +0.09 | +0.28 |
| 40 | 20\40 | 600.00 | +0.09 | +0.29 |
| 42 | 21\42 | 600.00 | +0.09 | +0.31 |
| 44 | 22\44 | 600.00 | +0.09 | +0.32 |
| 46 | 23\46 | 600.00 | +0.09 | +0.34 |
| 48 | 24\48 | 600.00 | +0.09 | +0.35 |
| 50 | 25\50 | 600.00 | +0.09 | +0.37 |
| 52 | 26\52 | 600.00 | +0.09 | +0.38 |
| 54 | 27\54 | 600.00 | +0.09 | +0.40 |
| 56 | 28\56 | 600.00 | +0.09 | +0.41 |
| 58 | 29\58 | 600.00 | +0.09 | +0.43 |
| 60 | 30\60 | 600.00 | +0.09 | +0.44 |
| 62 | 31\62 | 600.00 | +0.09 | +0.46 |
| 64 | 32\64 | 600.00 | +0.09 | +0.47 |
| 66 | 33\66 | 600.00 | +0.09 | +0.49 |
| 68 | 34\68 | 600.00 | +0.09 | +0.50 |
| 70 | 35\70 | 600.00 | +0.09 | +0.52 |
| 72 | 36\72 | 600.00 | +0.09 | +0.53 |
| 74 | 37\74 | 600.00 | +0.09 | +0.54 |
| 76 | 38\76 | 600.00 | +0.09 | +0.56 |
| 78 | 39\78 | 600.00 | +0.09 | +0.57 |
| 80 | 40\80 | 600.00 | +0.09 | +0.59 |
| ← 53ed9/4 | 55ed9/4 | 57ed9/4 → |
(convergent)
55 equal divisions of 9/4 (abbreviated 55ed9/4) is a nonoctave tuning system that divides the interval of 9/4 into 55 equal parts of about 25.5 ¢ each. Each step represents a frequency ratio of (9/4)1/55, or the 55th root of 9/4.