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| {{Infobox MOS | | {{Infobox MOS}} |
| | Name = superdiatonic
| | |
| | Periods = 1
| | {{MOS intro}} |
| | nLargeSteps = 7
| | Scales of this form are strongly associated with [[Armodue theory]], as applied to septimal mavila and Hornbostel temperaments. [[Trismegistus]] is also a usable temperament. |
| | nSmallSteps = 2
| | == Name == |
| | Equalized = 5
| | The [[TAMNAMS]] name for this pattern is '''armotonic''', in reference to Armodue theory. '''Superdiatonic''' is also in use. |
| | Paucitonic = 4
| | |
| | Pattern = LLLsLLLLs | | == Scale properties == |
| | Neutral = 5L 4s | | {{TAMNAMS use}} |
| | |
| | === Intervals === |
| | {{MOS intervals}} |
| | |
| | === Generator chain === |
| | {{MOS genchain}} |
| | |
| | === Modes === |
| | {{MOS mode degrees}} |
| | |
| | === Proposed mode names === |
| | The Ad- mode names proposed by [[groundfault]] have the feature of matching up the middle 7 modes with the antidiatonic mode names in the generator arc. |
| | {{MOS modes |
| | | Table Headers= |
| | Super- Mode Names $ |
| | Ad- Mode Names (ground) $ |
| | | Table Entries= |
| | Superlydian $ |
| | TBD $ |
| | Superionian $ |
| | Adlocrian $ |
| | Supermixolydian $ |
| | Adphrygian $ |
| | Supercorinthian $ |
| | Adaeolian $ |
| | Superolympian $ |
| | Addorian $ |
| | Superdorian $ |
| | Admixolydian $ |
| | Superaeolian $ |
| | Adionian $ |
| | Superphrygian $ |
| | Adlydian $ |
| | Superlocrian $ |
| | TBD |
| }} | | }} |
|
| |
|
| This page is about of a [[MOSScales|MOSScale]] with 7 large steps and 2 small steps arranged LLLsLLLLs (or any rotation of that, such as LLsLLLsLL).
| | == Note names== |
| == Name == | | 7L 2s, when viewed under Armodue theory, can be notated using Armodue notation. |
| The name '''superdiatonic''' has been established by [[Armodue]] theorists, and so [[TAMNAMS]] adopts it as well.
| | |
| == Temperaments == | | == Theory == |
| If you're looking for highly accurate scales (that is, ones that approximate JI closely), there are much better scale patterns to look at. However, if your harmonic entropy is coarse enough (that is, if 678 cents is an acceptable '3/2' to you), then [[Pelogic family#Mavila|mavila]] is an important harmonic entropy minimum here. So a general name for this MOS pattern could be "Mavila Superdiatonic" or simply 'Superdiatonic'.
| | === Temperament interpretations === |
| | [[Pelogic family#Mavila|Mavila]] is an important harmonic entropy minimum here, insofar as 670-680{{c}} can be considered a fifth. Other temperaments include septimal mavila, hornbostel, and trismegistus. |
|
| |
|
| These scales are strongly associated with the [[Armodue]] project/system applied to septimal mavila and Hornbostel temperaments.
| |
| == Intervals ==
| |
| Note: In TAMNAMS, a k-step interval class in superdiatonic may be called a "k-step", "k-mosstep", or "k-armstep". 1-indexed terms such as "mos(k+1)th" are discouraged for non-diatonic mosses.
| |
| == Scale tree == | | == Scale tree == |
| Optional types of 'JI [[Blown_Fifth|Blown Fifth]]' Generators: 31/21, 34/23, 65/44, 71/48, 99/67, 105/71, 108/73, 133/90, 145/98, 176/119 & 250/169.
| | {{MOS tuning spectrum |
| | | | 1/1 = Near exact-7/6 [[Pelogic_family#Armodue|Armodue]] |
| {| class="wikitable" | | | 4/3 = Near exact-20/17 [[Pentagoth]] |
| |- | | | 7/5 = Near exact-5/4 [[Mavila]] |
| ! colspan="3" | Generator
| | | 3/2 = Near exact-13/11 Pentagoth |
| ! | <span style="display: block; text-align: center;">'''Generator size (cents)'''</span>
| | | 7/4 = Near exact-7/4 [[Pelogic_family#Armodue|Armodue]] |
| ! | Pentachord steps
| | | 10/3 = Near exact-6/5 [[Mavila]] |
| ! | Comments
| | | 6/1 = [[Gravity]] ↓ |
| |-
| | }} |
| | | 4\[[7edo|7]]
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| | | | |
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| | | 685.714
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| | | 1 1 1 0
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| |-
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| |53\93
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| |683.871
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| |13 13 13 1
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| |-
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| | | 102\[[179edo|179]]
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| | | | |
| | | 683.798
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| | | 25 25 25 2
| |
| | | Approximately 0.03 cents away from [[95/64]]
| |
| |-
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| |49\86
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| |
| |
| |
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| |683.721
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| |12 12 12 1
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| |-
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| |94\165
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| |
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| |683.636
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| |23 23 23 2
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| |-
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| |45\79
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| |683.544
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| |11 11 11 1
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| |-
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| |86\151
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| |683.444
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| |21 21 21 2
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| |-
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| |41\72
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| |683.333
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| |10 10 10 1
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| |-
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| |78\137
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| |683.212
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| |19 19 19 2
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| |-
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| |37\65
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| |683.077
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| |9 9 9 1
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| |-
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| |70\123
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| |682.927
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| |17 17 17 2
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| |-
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| | | 33\[[58edo|58]]
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| | | | |
| | |
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| | | 682.758
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| | | 8 8 8 1
| |
| | | 2 generators equal 11/10, 6 equal 4/3, creating a hybrid Mavila/Porcupine scale with three perfect 5ths as well as the flat ones.
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| |-
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| |62\109
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| |682.569
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| |15 15 15 2
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| |-
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| |29\51
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| |682.353
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| |7 7 7 1
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| |-
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| |54\95
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| |682.105
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| |13 13 13 2
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| |-
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| |25\44
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| |681.818
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| |6 6 6 1
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| |-
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| |46\81
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| |681.4815
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| |11 11 11 2
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| |-
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| | | 21\37
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| | |
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| | | 681.081
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| | | 5 5 5 1
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| | |
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| |-
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| |59\104
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| |680.769
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| |14 14 14 3
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| |-
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| |38\67
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| |680.597
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| |9 9 9 2
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| |-
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| |55\97
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| |680.412
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| |13 13 13 3
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| |-
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| | | 17\30
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| | |
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| | | 680
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| | | 4 4 4 1
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| | | L/s = 4
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| |-
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| |47\83
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| |679.518
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| |11 11 11 3
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| |-
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| | | 30\53
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| | |
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| | | 679.245
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| | | 7 7 7 2
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| |-
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| | | 43\76
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| | | 678.947
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| | | 10 10 10 3
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| | |
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| |-
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| | | 56\99
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| | |
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| | | 678.788
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| | | 13 13 13 4
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| |-
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| | | 69\122
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| | | 678.6885
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| | | 16 16 16 5
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| |-
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| | | 82\145
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| | |
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| | | 678.621
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| | | 19 19 19 6
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| |-
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| | | 95\168
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| | | 678.571
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| | | 22 22 22 7
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| |-
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| | | 678.569
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| | | π π π 1
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| | | L/s = π
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| |- | |
| | | | |
| | | 108\191
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| | |
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| | | 678.534
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| | | 25 25 25 8
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| |-
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| | | 121\214
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| | | 678.505
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| | | 28 28 28 9
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| | | 28;9 Superdiatonic 1/28-tone <span style="font-size: 12.8000001907349px;">(a slight exceeded representation of the ratio 262144/177147, the Pythagorean wolf Fifth)</span>
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| |- | |
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| | | 134\237
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| | | 678.481
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| | | 31 31 31 10
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| | | HORNBOSTEL TEMPERAMENT <span style="font-size: 12.8000001907349px;">(1/31-tone; Optimum high size of Hornbostel '6th')</span>
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| |-
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| | | 13\23
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| | | 678.261
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| | | 3 3 3 1
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| | | HORNBOSTEL TEMPERAMENT <span style="font-size: 12.8000001907349px;">(Armodue 1/3-tone)</span>
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| |-
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| | | 126\223
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| | | 678.027
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| | | 29 29 29 10
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| | | HORNBOSTEL TEMPERAMENT
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| <span style="font-size: 12.8000001907349px;">(Armodue 1/29-tone)</span>
| | [[Category:9-tone scales]] |
| |-
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| | | 113\200
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| | | 678
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| | | 26 26 26 9
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| | | HORNBOSTEL (& [[Alexei_Stepanovich_Ogolevets|OGOLEVETS]]) TEMPERAMENT <span style="font-size: 12.8000001907349px;">(Armodue 1/26-tone; Best equillibrium between 6/5, Phi (833.1 Cent) and Square root of Pi (990.9 Cent), the notes '3', '7' & '8')</span>
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| |-
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| | |
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| | | 100\177
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| | |
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| | | 677.966
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| | | 23 23 23 8
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| |-
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| | | 87\154
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| | | 677.922
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| | | 20 20 20 7
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| |-
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| | | 74\131
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| | | 677.863
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| | | 17 17 17 6
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| | | Armodue-Hornbostel 1/17-tone <span style="font-size: 12.8000001907349px;">(the Golden Tone System of Thorvald Kornerup and a temperament of the Alexei Ogolevets's list of temperaments)</span>
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| |-
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| | | 61\108
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| | | 677.778
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| | | 14 14 14 5
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| | | Armodue-Hornbostel 1/14-tone
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| |-
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| | | 109\193
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| | | 677.720
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| | | 25 25 25 9
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| | | Armodue-Hornbostel 1/25-tone
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| |-
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| | | 48\85
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| | | 677.647
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| | | 11 11 11 4
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| | | Armodue-Hornbostel 1/11-tone <span style="font-size: 12.8000001907349px;">(Optimum accuracy of Phi interval, the note '7')</span>
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| |-
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| | | 677.562
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| | | e e e 1
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| | | L/s = e
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| |-
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| | | 35\62
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| | | 677.419
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| | | 8 8 8 3
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| | | Armodue-Hornbostel 1/8-tone
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| |-
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| | | 92\163
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| | | 677.301
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| | | 21 21 21 8
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| | | 21;8 Superdiatonic 1/21-tone
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| |-
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| | | 677.28
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| | | <span style="background-color: #ffffff; color: #222222; font-family: arial,sans-serif; font-size: small;">φ+1 φ+1 φ+1 1</span>
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| | | Split φ superdiatonic relation (34;13 - 55;21 - 89;34 - 144;55 - 233;89 - 377;144 - 610;233..)
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| |-
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| | | 57\101
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| | | 677.228
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| | | 13 13 13 5
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| | | 13;5 Superdiatonic 1/13-tone
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| |-
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| | | 22\39
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| | | 676.923
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| | | 5 5 5 2
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| | | Armodue-Hornbostel 1/5-tone <span style="font-size: 12.8000001907349px;">(Optimum low size of Hornbostel '6th')</span>
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| |-
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| | | 75\133
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| | | 676.692
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| | | 17 17 17 7
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| | | 17;7 Superdiatonic 1/17-tone <span style="font-size: 12.8000001907349px;">(Note the very accuracy of the step 75 with the ratio 34/23 with an error of +0.011 Cents)</span>
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| |-
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| | | 53\94
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| | |
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| | | 676.596
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| | | 12 12 12 5
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| |-
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| | | 31\55
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| | | 676.364
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| | | 7 7 7 3
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| | | 7;3 Superdiatonic 1/7-tone
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| |-
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| | | 40\71
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| | | 676.056
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| | | 9 9 9 4
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| | | 9;4 Superdiatonic 1/9-tone
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| |-
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| | | 49\87
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| | |
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| | | 675.862
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| | | 11 11 11 5
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| | | 11;5 Superdiatonic 1/11-tone
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| |-
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| | |
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| | | 58\103
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| | |
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| | | 675.728
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| | | 13 13 13 6
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| | | 13;6 Superdiatonic 1/13-tone
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| |-
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| | | 9\16
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| | | 675
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| | | 2 2 2 1
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| | | <span style="display: block; text-align: left;">'''[BOUNDARY OF PROPRIETY: smaller generators are strictly proper]'''</span>ARMODUE ESADECAFONIA (or Goldsmith Temperament)
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| |-
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| | | 59\105
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| | | 674.286
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| | | 13 13 13 7
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| | | Armodue-Mavila 1/13-tone
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| |-
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| | | 50\89
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| | | 674.157
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| | | 11 11 11 6
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| | | Armodue-Mavila 1/11-tone
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| |-
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| | | 41\73
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| | | 673.973
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| | | 9 9 9 5
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| | | Armodue-Mavila 1/9-tone <span style="font-size: 12.8000001907349px;">(with an approximation of the Perfect Fifth + 1/5 Pyth.Comma [706.65 Cents]: 43\73 is 706.85 Cents)</span>
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| |-
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| | | 32\57
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| | |
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| | | 673.684
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| | | 7 7 7 4
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| | | Armodue-Mavila 1/7-tone <span style="font-size: 12.8000001907349px;">(the 'Commatic' version of Armodue, because its high accuracy of the [[7/4|7/4]] interval, the note '8')</span>
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| |-
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| | |
| |
| | | 673.577
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| | | <span style="background-color: #ffffff;">√3 √3 √3 1</span>
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| | |
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| |-
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| | |
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| | | 55\98
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| | |
| |
| | | 673.469
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| | | 12 12 12 7
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| | |
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| |-
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| | |
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| | | 78\139
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| | |
| |
| | | 673.381
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| | | 17 17 17 10
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| | | Armodue-Mavila 1/17-tone
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| |-
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| | | 101\180
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| | |
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| | | 673.333
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| | | 22 22 22 13
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| | |
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| |-
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| | | 23\41
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| | | 673.171
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| | | 5 5 5 3
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| | | 5;3 Golden Armodue-Mavila 1/5-tone
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| |-
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| | |
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| | | 60\107
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| | | 672.897
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| | | 13 13 13 8
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| | | 13;8 Golden Mavila 1/13-tone
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| |-
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| |
| | | 672.85
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| | | <span style="background-color: #ffffff; color: #222222; font-family: arial,sans-serif; font-size: small;">φ φ φ 1</span>
| |
| | | GOLDEN MAVILA (L/s = <span style="background-color: #ffffff; color: #222222; font-family: arial,sans-serif; font-size: small;">φ)</span>
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| |-
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| | | 97\173
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| | | 672.832
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| | | 21 21 21 13
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| | | 21;13 Golden Mavila 1/21-tone <span style="font-size: 12.8000001907349px;">(Phi is the step 120\173)</span>
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| |-
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| | | 37\66
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| | | 672.727
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| | | 8 8 8 5
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| | | 8;5 Golden Mavila 1/8-tone
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| |-
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| | | 51\91
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| | |
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| | | 672.527
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| | | 11 11 11 7
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| | | 11;7 Superdiatonic 1/11-tone
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| |-
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| | |
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| | | 672.523
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| | | π π π 2
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| | |
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| |-
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| | |
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| | |
| |
| | | 116\207
| |
| | | 672.464
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| | | 25 25 25 16
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| | | 25;16 Superdiatonic 1/25-tone
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| |-
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| | |
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| | | 65\116
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| | |
| |
| | | 672.414
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| | | 14 14 14 9
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| | | 14;9 Superdiatonic 1/14-tone
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| |-
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| | |
| |
| | | 79\141
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| | |
| |
| | | 672.340
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| | | 17 17 17 11
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| | | 17;11 Superdiatonic 1/17-tone
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| |-
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| | |
| |
| | | 93\166
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| | |
| |
| | | 672.289
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| | | 20 20 20 13
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| | |
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| |-
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| | |
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| | | 107\191
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| | |
| |
| | | 672.251
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| | | 23 23 23 15
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| | |
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| |-
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| | |
| |
| | | 121\216
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| | |
| |
| | | 672.222
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| | | 26 26 26 17
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| | | 26;17 Superdiatonic 1/26-tone
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| |-
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| | | 135\241
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| | |
| |
| | | 672.199
| |
| | | 29 29 29 19
| |
| | | 29;19 Superdiatonic 1/29-tone
| |
| |-
| |
| | | 14\25
| |
| | |
| |
| | |
| |
| | | 672
| |
| | | 3 3 3 2
| |
| | | 3;2 Golden Armodue-Mavila 1/3-tone
| |
| |-
| |
| | |
| |
| | | 145\259
| |
| | |
| |
| | | 671.815
| |
| | | 31 31 31 21
| |
| | | 31;21 Superdiatonic 1/31-tone
| |
| |-
| |
| | |
| |
| | | 131\234
| |
| | |
| |
| | | 671.795
| |
| | | 28 28 28 19
| |
| | | 28;19 Superdiatonic 1/28-tone
| |
| |-
| |
| | |
| |
| | | 117\209
| |
| | |
| |
| | | 671.770
| |
| | | 25 25 25 17
| |
| | |
| |
| |-
| |
| | |
| |
| | | 103\184
| |
| | |
| |
| | | 671.739
| |
| | | 22 22 22 15
| |
| | |
| |
| |-
| |
| | |
| |
| | | 89\159
| |
| | |
| |
| | | 671.698
| |
| | | 19 19 19 13
| |
| | |
| |
| |-
| |
| | |
| |
| | | 75\134
| |
| | |
| |
| | | 671.642
| |
| | | 16 16 16 11
| |
| | |
| |
| |-
| |
| | |
| |
| | | 61\109
| |
| | |
| |
| | | 671.560
| |
| | | 13 13 13 9
| |
| | |
| |
| |-
| |
| | |
| |
| | | 47\84
| |
| | |
| |
| | | 671.429
| |
| | | 10 10 10 7
| |
| | |
| |
| |-
| |
| |
| |
| |
| |
| |80\143
| |
| |671.329
| |
| |17 17 17 12
| |
| |
| |
| |-
| |
| | |
| |
| | | 33\59
| |
| | |
| |
| | | 671.186
| |
| | | 7 7 7 5
| |
| | |
| |
| |-
| |
| |
| |
| |52\93
| |
| |
| |
| |670.968
| |
| |11 11 11 8
| |
| |
| |
| |-
| |
| | | 19\34
| |
| | |
| |
| | |
| |
| | | 670.588
| |
| | | 4 4 4 3
| |
| | |
| |
| |-
| |
| |
| |
| |43\77
| |
| |
| |
| |670.13
| |
| |9 9 9 7
| |
| |
| |
| |-
| |
| | | 24\43
| |
| | |
| |
| | |
| |
| | | 669.767
| |
| | | 5 5 5 4
| |
| | |
| |
| |-
| |
| |
| |
| |53\95
| |
| |
| |
| |669.474
| |
| |11 11 11 9
| |
| |
| |
| |-
| |
| |29\52
| |
| |
| |
| |
| |
| |669.231
| |
| |6 6 6 5
| |
| |
| |
| |-
| |
| |
| |
| |63\113
| |
| |
| |
| |669.0265
| |
| |13 13 13 11
| |
| |
| |
| |-
| |
| |34\61
| |
| |
| |
| |
| |
| |668.8525
| |
| |7 7 7 6
| |
| |
| |
| |-
| |
| |
| |
| |73\131
| |
| |
| |
| |668.702
| |
| |15 15 15 13
| |
| |
| |
| |-
| |
| |39\70
| |
| |
| |
| |
| |
| |668.571
| |
| |8 8 8 7
| |
| |
| |
| |-
| |
| |
| |
| |83\149
| |
| |
| |
| |668.456
| |
| |17 17 17 15
| |
| |
| |
| |-
| |
| |44\79
| |
| |
| |
| |
| |
| |668.354
| |
| |9 9 9 8
| |
| |
| |
| |-
| |
| |
| |
| |93\167
| |
| |
| |
| |668.2365
| |
| |19 19 19 17
| |
| |
| |
| |-
| |
| |49\88
| |
| |
| |
| |
| |
| |668.182
| |
| |10 10 10 9
| |
| |
| |
| |-
| |
| |
| |
| |103\185
| |
| |
| |
| |668.108
| |
| |21 21 21 9
| |
| |
| |
| |-
| |
| |54\97
| |
| |
| |
| |
| |
| |668.041
| |
| |11 11 11 10
| |
| |
| |
| |-
| |
| |
| |
| |113\203
| |
| |
| |
| |667.98
| |
| |23 23 23 21
| |
| |
| |
| |-
| |
| |59\106
| |
| |
| |
| |
| |
| |667.925
| |
| |12 12 12 11
| |
| |
| |
| |-
| |
| |
| |
| |123\221
| |
| |
| |
| |667.873
| |
| |25 25 25 23
| |
| |
| |
| |-
| |
| |64\115
| |
| |
| |
| |
| |
| |667.826
| |
| |13 13 13 12
| |
| |
| |
| |-
| |
| | | 5\[[9edo|9]]
| |
| | |
| |
| | |
| |
| | | 666.667
| |
| | | 1 1 1 1
| |
| | |
| |
| |}
| |
| [[Category:Abstract MOS patterns]]
| |
| [[Category:Mavila]] | | [[Category:Mavila]] |
| [[Category:Superdiatonic]]
| |