User:Hotcrystal0/Sandbox

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{{Infobox Interval|debug=1 | Monzo = -17 60 0 -12 0 -12 | Name = N/A | Comma = yes }} {{Infobox Interval|355/113|debug=1 | Name = N/A }} {{Infobox Interval|2187/1250|debug=1 | Name = N/A }} {{Infobox Interval|442/295|debug=1 | Name = N/A }}

someone tell me how to insert the infobox without having to add the categories
nevermind I figured it out

← 27ed22/7 28ed22/7 29ed22/7 →
Prime factorization 22 × 7
Step size 70.8033 ¢ 
Octave 17\28ed22/7 (1203.66 ¢)
(semiconvergent)
Twelfth 27\28ed22/7 (1911.69 ¢)
Consistency limit 5
Distinct consistency limit 5

2187/1250

Edo approximations for Hotcrystal0/Sandbox (968.43 ¢)
≤ 80edo, relative error ≤ 10%
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 approximations for Hotcrystal0/Sandbox (599.91 ¢)
≤ 80edo, relative error ≤ 10%
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 →
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

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.


Approximation of prime harmonics in 17945edo
Harmonic 2 3 5 7 11 13 17 19 23 29 31
Error Absolute (¢) +0.0000 -0.0102 +0.0000 +0.0011 +0.0334 -0.0261 +0.0321 -0.0040 -0.0214 -0.0314 -0.0035
Relative (%) +0.0 -15.2 +0.0 +1.6 +50.0 -39.1 +47.9 -5.9 -31.9 -46.9 -5.3
Steps
(reduced) 		17945
(0) 		28442
(10497) 		41667
(5777) 		50378
(14488) 		62080
(8245) 		66404
(12569) 		73350
(1570) 		76229
(4449) 		81175
(9395) 		87176
(15396) 		88903
(17123)

ed16/15 testing

← 1ed16/15 2ed16/15 3ed16/15 →
Prime factorization 2 (prime) (highly composite)
Step size 55.8656 ¢ 
Octave 21\2ed16/15 (1173.18 ¢)
(semiconvergent)
Twelfth 34\2ed16/15 (1899.43 ¢) (→ 17\1ed16/15)
Consistency limit 3
Distinct consistency limit 3

2 equal divisions of 16/15 (abbreviated 2ed16/15) is a nonoctave tuning system that divides the interval of 16/15 into 2 equal parts of about 55.9 ¢ each. Each step represents a frequency ratio of (16/15)1/2, or the square root of 16/15.

.



← 2ed16/15 3ed16/15 4ed16/15 →
Prime factorization 3 (prime)
Step size 37.2438 ¢ 
Octave 32\3ed16/15 (1191.8 ¢)
(convergent)
Twelfth 51\3ed16/15 (1899.43 ¢) (→ 17\1ed16/15)
Consistency limit 4
Distinct consistency limit 4

3 equal divisions of 16/15 (abbreviated 3ed16/15) is a nonoctave tuning system that divides the interval of 16/15 into 3 equal parts of about 37.2 ¢ each. Each step represents a frequency ratio of (16/15)1/3, or the cube root of 16/15.

.



← 3ed16/15 4ed16/15 5ed16/15 →
Prime factorization 22 (highly composite)
Step size 27.9328 ¢ 
Octave 43\4ed16/15 (1201.11 ¢)
(convergent)
Twelfth 68\4ed16/15 (1899.43 ¢) (→ 17\1ed16/15)
Consistency limit 8
Distinct consistency limit 8

4 equal divisions of 16/15 (abbreviated 4ed16/15) is a nonoctave tuning system that divides the interval of 16/15 into 4 equal parts of about 27.9 ¢ each. Each step represents a frequency ratio of (16/15)1/4, or the 4th root of 16/15.

.



← 4ed16/15 5ed16/15 6ed16/15 →
Prime factorization 5 (prime)
Step size 22.3463 ¢ 
Octave 54\5ed16/15 (1206.7 ¢)
Twelfth 85\5ed16/15 (1899.43 ¢) (→ 17\1ed16/15)
Consistency limit 3
Distinct consistency limit 3

5 equal divisions of 16/15 (abbreviated 5ed16/15) is a nonoctave tuning system that divides the interval of 16/15 into 5 equal parts of about 22.3 ¢ each. Each step represents a frequency ratio of (16/15)1/5, or the 5th root of 16/15.

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space

more space

even more space

Edphi testing

← 15edϕ 16edϕ 17edϕ →
Prime factorization 24
Step size 52.0681 ¢ 
Octave 23\16edϕ (1197.57 ¢)
(semiconvergent)
Twelfth 37\16edϕ (1926.52 ¢)
Consistency limit 2
Distinct consistency limit 2
← 17edϕ 18edϕ 19edϕ →
Prime factorization 2 × 32
Step size 46.2828 ¢ 
Octave 26\18edϕ (1203.35 ¢) (→ 13\9edϕ)
Twelfth 41\18edϕ (1897.59 ¢)
(semiconvergent)
Consistency limit 10
Distinct consistency limit 9
← 24edϕ 25edϕ 26edϕ →
Prime factorization 52
Step size 33.3236 ¢ 
Octave 36\25edϕ (1199.65 ¢)
(convergent)
Twelfth 57\25edϕ (1899.45 ¢)
(semiconvergent)
Consistency limit 8
Distinct consistency limit 8
← 33edϕ 34edϕ 35edϕ →
Prime factorization 2 × 17
Step size 24.5027 ¢ 
Octave 49\34edϕ (1200.63 ¢)
(semiconvergent)
Twelfth 78\34edϕ (1911.21 ¢) (→ 39\17edϕ)
Consistency limit 6
Distinct consistency limit 6 




@RULE unnamed_rule

This rule's "base rule" is B2c3-cknr4ei5y/S12a3-cj4t5ei6ci, though it is probably heavily modified from that rule.

@TABLE

n_states:3
neighborhood:Moore
symmetries:rotate4reflect

var a={0,1,2}
var b={0,1,2}
var c={0,1,2}
var d={0,1,2}
var e={0,1,2}
var f={0,1,2}
var g={0,1,2}
var h={0,1,2}
var i = {0,1}
var j = {0,1}
var k = {0,1}
var l = {0,1}
var I = {0,1}
var J = {0,1}
var K = {0,1}
var L = {0,1}
var m = {0,2}
var n = {0,2}
var o = {0,2}
var p = {0,2}
var q = {1,2}
var r = {1,2}
var s = {1,2}
var t = {1,2}
var Q = {1,2}
var R = {1,2}
var S = {1,2}
var T = {1,2}

# Birth

0,2,1,0,0,0,0,0,1,2
0,2,2,0,0,0,0,0,2,2

0,0,1,0,1,0,0,0,0,1
0,q,r,s,0,0,0,0,0,1
0,q,r,0,0,0,s,0,0,1
0,q,r,0,0,0,0,s,0,1
0,q,r,0,0,0,0,0,s,1
0,q,0,r,0,s,0,0,0,1
0,1,0,0,1,0,1,0,0,1
0,1,0,1,0,1,0,1,0,1
0,1,1,0,1,1,0,0,0,1
0,1,1,0,1,1,0,1,0,1

0,2,2,0,0,0,0,0,0,1
0,1,2,1,0,0,0,0,0,1
0,1,0,0,0,1,0,0,0,2
0,1,0,0,0,2,0,0,0,2
0,0,1,0,0,0,2,0,0,1
0,q,0,0,2,0,0,0,0,2
0,2,0,0,q,0,0,0,0,1
0,0,2,0,2,0,0,0,0,2
0,1,0,2,0,1,0,1,0,2
0,2,1,0,1,2,1,2,1,2

# Survival

1,1,0,0,0,0,0,0,0,1
1,0,1,0,0,0,0,0,0,1
1,1,1,0,0,0,0,0,0,1
1,1,1,1,0,0,0,0,0,1
1,1,1,0,1,0,0,0,0,1
1,1,1,0,0,1,0,0,0,1
1,1,1,0,0,0,1,0,0,1
1,1,1,0,0,0,0,0,1,1
1,1,0,1,0,1,0,0,0,1
1,1,0,1,0,0,1,0,0,1
1,1,0,0,1,0,1,0,0,1
1,1,1,0,0,1,0,0,1,1
1,1,1,1,1,1,0,0,0,1
1,1,1,0,1,0,1,0,1,1
1,1,1,1,1,1,0,1,0,1
1,1,1,0,1,1,1,0,1,1

2,0,0,0,0,0,0,0,0,2
2,0,1,0,1,0,1,0,1,2
2,0,2,0,2,0,2,0,2,2
2,0,2,0,0,0,2,0,0,2
2,0,2,0,2,0,0,0,0,2
1,1,1,1,1,m,n,o,1,2
2,2,2,2,i,j,0,0,0,2
2,q,0,r,0,s,0,t,0,2

# Death

1,a,b,c,d,e,f,g,h,0
2,a,b,c,d,e,f,g,h,0

@COLORS
1 255 255 255
2 255 0 255
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