User:Ganaram inukshuk/Sandbox: Difference between revisions
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→Mos intro text: Sandboxing example usage of mos intro module; work-in-progress |
→SB tree: Testing out SB tree template |
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=== SB tree === | === SB tree === | ||
{{ | {{SB tree|Depth=4|Edge Extend=3}} | ||
=== Mos intro text === | === Mos intro text === | ||
Revision as of 01:12, 26 May 2023
This is a sandbox page for me (Ganaram) to test out a few things before deploying things. (Expect some mess.)
Math symbols test
Isolated symbols
[math]\displaystyle{ T := [ t_1, t_2, ..., t_m ] }[/math] [math]\displaystyle{ S := [ s_1, s_2, ..., s_m ] }[/math] [math]\displaystyle{ P := [ p_1, p_2, ..., p_n ] }[/math]
Sample text
Pulled from muddle page.
Let the target scale T be a sequence of steps [ t1, t2, t3, ... , tm ], the parent scale P be a sequence of steps [ p1, p2, p3, ... , pn ], and the resulting muddle scale S be a sequence of steps [ s1, s2, s3, ... , sm ]. Note that the number of steps in P must be equal to the sum of all ti from T. Also note that both ti and pi are both numeric values, as with si.
The first step s1 of the muddle scale is the sum of the first t1 steps from P, the next step s2 is the sum of the next t2 steps after that (after the previous t1 steps), the next step s3 is the sum of the next t3 steps after that (after the previous t1+t2 steps), and so on, where the last step sm is the sum of the last tm steps from P. For example, if s1 is made from the first 3 steps of P (p1, p2, and p3), then the next step p2 is the sum of the next t2 steps after p3, meaning the sum starts at (and includes) p4.
Interval and degree tables
The following two tables were made using a custom program (dubbed Moscalc and Modecalc) whose output is formatted for use with MediaWiki.
| Mode | UDP | Rotational order | mosunison | 1-mosstep | 2-mosstep | 3-mosstep | 4-mosstep | 5-mosstep | 6-mosstep | mosoctave |
|---|---|---|---|---|---|---|---|---|---|---|
| LssLsss | 6|0 | 0 | 0 | L | L+s | L+2s | 2L+2s | 2L+3s | 2L+4s | 2L+5s |
| LsssLss | 5|1 | 3 | 0 | L | L+s | L+2s | L+3s | 2L+3s | 2L+4s | 2L+5s |
| sLssLss | 4|2 | 6 | 0 | s | L+s | L+2s | L+3s | 2L+3s | 2L+4s | 2L+5s |
| sLsssLs | 3|3 | 2 | 0 | s | L+s | L+2s | L+3s | L+4s | 2L+4s | 2L+5s |
| ssLssLs | 2|4 | 5 | 0 | s | 2s | L+2s | L+3s | L+4s | 2L+4s | 2L+5s |
| ssLsssL | 1|5 | 1 | 0 | s | 2s | L+2s | L+3s | L+4s | L+5s | 2L+5s |
| sssLssL | 0|6 | 4 | 0 | s | 2s | 3s | L+3s | L+4s | L+5s | 2L+5s |
| Mode | UDP | Rotational order | 0-mosdegree | 1-mosdegree | 2-mosdegree | 3-mosdegree | 4-mosdegree | 5-mosdegree | 6-mosdegree | 7-mosdegree |
|---|---|---|---|---|---|---|---|---|---|---|
| LssLsss | 6|0 | 0 | perfect | major | major | perfect | augmented | major | major | perfect |
| LsssLss | 5|1 | 3 | perfect | major | major | perfect | perfect | major | major | perfect |
| sLssLss | 4|2 | 6 | perfect | minor | major | perfect | perfect | major | major | perfect |
| sLsssLs | 3|3 | 2 | perfect | minor | major | perfect | perfect | minor | major | perfect |
| ssLssLs | 2|4 | 5 | perfect | minor | minor | perfect | perfect | minor | major | perfect |
| ssLsssL | 1|5 | 1 | perfect | minor | minor | perfect | perfect | minor | minor | perfect |
| sssLssL | 0|6 | 4 | perfect | minor | minor | diminished | perfect | minor | minor | perfect |
Note: don't merge cells on a table with sorting.
| Mode | Mode name | UDP | Rotational order | mosunison | 1-mosstep | 2-mosstep | 3-mosstep | 4-mosstep | 5-mosstep | 6-mosstep | mosoctave |
|---|---|---|---|---|---|---|---|---|---|---|---|
| LssLsss | antilocrian | 6|0 | 0 | 0 | L | L+s | L+2s | 2L+2s | 2L+3s | 2L+4s | 2L+5s |
| LsssLss | antiphrygian | 5|1 | 3 | 0 | L | L+s | L+2s | L+3s | 2L+3s | 2L+4s | 2L+5s |
| sLssLss | anti-aeolian | 4|2 | 6 | 0 | s | L+s | L+2s | L+3s | 2L+3s | 2L+4s | 2L+5s |
| sLsssLs | antidorian | 3|3 | 2 | 0 | s | L+s | L+2s | L+3s | L+4s | 2L+4s | 2L+5s |
| ssLssLs | antimixolydian | 2|4 | 5 | 0 | s | 2s | L+2s | L+3s | L+4s | 2L+4s | 2L+5s |
| ssLsssL | anti-ionian | 1|5 | 1 | 0 | s | 2s | L+2s | L+3s | L+4s | L+5s | 2L+5s |
| sssLssL | antilydian | 0|6 | 4 | 0 | s | 2s | 3s | L+3s | L+4s | L+5s | 2L+5s |
| Mode | Mode name | UDP | Rotational order | 0-mosdegree | 1-mosdegree | 2-mosdegree | 3-mosdegree | 4-mosdegree | 5-mosdegree | 6-mosdegree | 7-mosdegree |
|---|---|---|---|---|---|---|---|---|---|---|---|
| LssLsss | antilocrian | 6|0 | 0 | perfect | major | major | perfect | augmented | major | major | perfect |
| LsssLss | antiphrygian | 5|1 | 3 | perfect | major | major | perfect | perfect | major | major | perfect |
| sLssLss | anti-aeolian | 4|2 | 6 | perfect | minor | major | perfect | perfect | major | major | perfect |
| sLsssLs | antidorian | 3|3 | 2 | perfect | minor | major | perfect | perfect | minor | major | perfect |
| ssLssLs | antimixolydian | 2|4 | 5 | perfect | minor | minor | perfect | perfect | minor | major | perfect |
| ssLsssL | anti-ionian | 1|5 | 1 | perfect | minor | minor | perfect | perfect | minor | minor | perfect |
| sssLssL | antilydian | 0|6 | 4 | perfect | minor | minor | diminished | perfect | minor | minor | perfect |
Alternate mos tables
| Pattern | Number of notes | Number of periods | Name | Prefix |
|---|---|---|---|---|
| 1L 1s | 2 | 1 | trivial | triv- |
| 1L 1s | 2 | 1 | monowood | monowd- |
| 1L 2s | 3 | 1 | antrial | atri- |
| 2L 1s | 3 | 1 | trial | tri- |
| 1L 3s | 4 | 1 | antetric | atetra- |
| 2L 2s | 4 | 2 | biwood | biwd- |
| 3L 1s | 4 | 1 | tetric | tetra- |
| 1L 4s | 5 | 1 | pedal | ped- |
| 2L 3s | 5 | 1 | pentic | pent- |
| 3L 2s | 5 | 1 | antipentic | apent- |
| 4L 1s | 5 | 1 | manual | manu- |
| 1L 5s | 6 | 1 | antimachinoid | amech- |
| 2L 4s | 6 | 2 | anticitric | acitro- |
| 3L 3s | 6 | 3 | triwood | triwd- |
| 4L 2s | 6 | 2 | citric | citro- |
| 5L 1s | 6 | 1 | machinoid | mech- |
| 1L 6s | 7 | 1 | onyx | on- |
| 2L 5s | 7 | 1 | antidiatonic | pel- |
| 3L 4s | 7 | 1 | mosh | mosh- |
| 4L 3s | 7 | 1 | smitonic | smi- |
| 5L 2s | 7 | 1 | diatonic | none |
| 6L 1s | 7 | 1 | arch(a)eotonic | arch- |
| 1L 7s | 8 | 1 | antipine | apine- |
| 2L 6s | 8 | 2 | antiekic | anek- |
| 3L 5s | 8 | 1 | checkertonic | check- |
| 4L 4s | 8 | 4 | tetrawood; diminished | tetwd- |
| 5L 3s | 8 | 1 | oneirotonic | neiro- |
| 6L 2s | 8 | 2 | ekic | ek- |
| 7L 1s | 8 | 1 | pine | pine- |
| 1L 8s | 9 | 1 | antisubneutralic | ablu- |
| 2L 7s | 9 | 1 | balzano | bal- /bæl/ |
| 3L 6s | 9 | 3 | tcherepnin | cher- |
| 4L 5s | 9 | 1 | gramitonic | gram- |
| 5L 4s | 9 | 1 | semiquartal | cthon- |
| 6L 3s | 9 | 3 | hyrulic | hyru- |
| 7L 2s | 9 | 1 | superdiatonic | arm- |
| 8L 1s | 9 | 1 | subneutralic | blu- |
| 1L 9s | 10 | 1 | antisinatonic | asina- |
| 2L 8s | 10 | 2 | jaric | jara- |
| 3L 7s | 10 | 1 | sephiroid | seph- |
| 4L 6s | 10 | 2 | lime | lime- |
| 5L 5s | 10 | 5 | pentawood | penwd- |
| 6L 4s | 10 | 2 | lemon | lem- |
| 7L 3s | 10 | 1 | dicoid /'daɪkɔɪd/ | dico- |
| 8L 2s | 10 | 2 | taric | tara- |
| 9L 1s | 10 | 1 | sinatonic | sina- |
Scale trees of 1L 1s, 1L 2s, and 2L 1s (sandbox)
| Generator | Bright gen. | Dark gen. | L | s | L/s | Ranges of mosses | |||||
|---|---|---|---|---|---|---|---|---|---|---|---|
| 1\2 | 600.000 | 600.000 | 1 | 1 | 1.000 | ||||||
| 6\11 | 654.545 | 545.455 | 6 | 5 | 1.200 | 2L 5s range (includes 2L 7s and 7L 2s) | |||||
| 5\9 | 666.667 | 533.333 | 5 | 4 | 1.250 | ||||||
| 9\16 | 675.000 | 525.000 | 9 | 7 | 1.286 | ||||||
| 4\7 | 685.714 | 514.286 | 4 | 3 | 1.333 | Basic 2L 3s | |||||
| 11\19 | 694.737 | 505.263 | 11 | 8 | 1.375 | 5L 2s range (includes 7L 5s and 5L 7s) | |||||
| 7\12 | 700.000 | 500.000 | 7 | 5 | 1.400 | ||||||
| 10\17 | 705.882 | 494.118 | 10 | 7 | 1.429 | ||||||
| 3\5 | 720.000 | 480.000 | 3 | 2 | 1.500 | Basic 2L 1s | |||||
| 11\18 | 733.333 | 466.667 | 11 | 7 | 1.571 | 5L 3s range | |||||
| 8\13 | 738.462 | 461.538 | 8 | 5 | 1.600 | ||||||
| 13\21 | 742.857 | 457.143 | 13 | 8 | 1.625 | ||||||
| 5\8 | 750.000 | 450.000 | 5 | 3 | 1.667 | Basic 3L 2s | |||||
| 12\19 | 757.895 | 442.105 | 12 | 7 | 1.714 | 3L 5s range | |||||
| 7\11 | 763.636 | 436.364 | 7 | 4 | 1.750 | ||||||
| 9\14 | 771.429 | 428.571 | 9 | 5 | 1.800 | ||||||
| 2\3 | 800.000 | 400.000 | 2 | 1 | 2.000 | Basic 1L 1s (dividing line between 2L 1s and 1L 2s) | |||||
| 9\13 | 830.769 | 369.231 | 9 | 4 | 2.250 | 3L 4s range (includes 3L 7s and 7L 3s) | |||||
| 7\10 | 840.000 | 360.000 | 7 | 3 | 2.333 | ||||||
| 12\17 | 847.059 | 352.941 | 12 | 5 | 2.400 | ||||||
| 5\7 | 857.143 | 342.857 | 5 | 2 | 2.500 | Basic 3L 1s | |||||
| 13\18 | 866.667 | 333.333 | 13 | 5 | 2.600 | 4L 3s range | |||||
| 8\11 | 872.727 | 327.273 | 8 | 3 | 2.667 | ||||||
| 11\15 | 880.000 | 320.000 | 11 | 4 | 2.750 | ||||||
| 3\4 | 900.000 | 300.000 | 3 | 1 | 3.000 | Basic 1L 2s | |||||
| 10\13 | 923.077 | 276.923 | 10 | 3 | 3.333 | Range of 1L 4s (includes 4L 5s and 5L 4s) | |||||
| 7\9 | 933.333 | 266.667 | 7 | 2 | 3.500 | ||||||
| 11\14 | 942.857 | 257.143 | 11 | 3 | 3.667 | ||||||
| 4\5 | 960.000 | 240.000 | 4 | 1 | 4.000 | Basic 1L 4s | |||||
| 9\11 | 981.818 | 218.182 | 9 | 2 | 4.500 | Range of 4L 1s (includes 5L 1s and 1L 5s) | |||||
| 5\6 | 1000.000 | 200.000 | 5 | 1 | 5.000 | ||||||
| 6\7 | 1028.571 | 171.429 | 6 | 1 | 6.000 | ||||||
| 1\1 | 1200.000 | 0.000 | 1 | 0 | → inf | ||||||
Module and template sandbox
SB tree
| Ratios | |||||||
|---|---|---|---|---|---|---|---|
| 1/1 | |||||||
| 8/7 | |||||||
| 7/6 | |||||||
| 6/5 | |||||||
| 5/4 | |||||||
| 4/3 | |||||||
| 7/5 | |||||||
| 3/2 | |||||||
| 8/5 | |||||||
| 5/3 | |||||||
| 7/4 | |||||||
| 2/1 | |||||||
| 7/3 | |||||||
| 5/2 | |||||||
| 8/3 | |||||||
| 3/1 | |||||||
| 7/2 | |||||||
| 4/1 | |||||||
| 5/1 | |||||||
| 6/1 | |||||||
| 7/1 | |||||||
| 8/1 | |||||||
| 1/0 | |||||||
Mos intro text
The intro text for a mos page will take on one of six forms:
| Equave | Periods | Intro text |
|---|---|---|
| 2/1 | 1 | 5L 2s, named diatonic in TAMNAMS, is a 2/1-equivalent (octave-equivalent) moment of symmetry scale containing 5 large steps and 2 small steps, repeating every octave. Generators that produce this scale range from 685.7 ¢ to 720 ¢, or from 480 ¢ to 514.3 ¢. |
| 2 | 6L 4s, named lemon in TAMNAMS, is a 2/1-equivalent (octave-equivalent) moment of symmetry scale containing 6 large steps and 4 small steps, with a period of 3 large steps and 2 small steps that repeats every 600.0 ¢, or twice every octave. Generators that produce this scale range from 360 ¢ to 400 ¢, or from 200 ¢ to 240 ¢. | |
| 3 or more | 3L 3s, named triwood in TAMNAMS, is a 2/1-equivalent (octave-equivalent) moment of symmetry scale containing 3 large steps and 3 small steps, with a period of 1 large step and 1 small step that repeats every 400.0 ¢, or 3 times every octave. Generators that produce this scale range from 200 ¢ to 400 ¢, or from 0 ¢ to 200 ¢. Scales of the true MOS form, where every period is the same, are proper because there is only one small step per period. | |
| Non-octave | 1 | 4L 5s⟨3/1⟩ is a 3/1-equivalent (tritave-equivalent) moment of symmetry scale containing 4 large steps and 5 small steps, repeating every interval of 3/1 (1902.0 ¢). Generators that produce this scale range from 422.7 ¢ to 475.5 ¢, or from 1426.5 ¢ to 1479.3 ¢. |
| 2 | 6L 4s⟨3/1⟩ is a 3/1-equivalent (tritave-equivalent) moment of symmetry scale containing 6 large steps and 4 small steps, with a period of 3 large steps and 2 small steps that repeats every 951.0 ¢, or twice every interval of 3/1 (1902.0 ¢). Generators that produce this scale range from 570.6 ¢ to 634 ¢, or from 317 ¢ to 380.4 ¢. | |
| 3 or more | 4L 4s⟨3/1⟩ is a 3/1-equivalent (tritave-equivalent) moment of symmetry scale containing 4 large steps and 4 small steps, with a period of 1 large step and 1 small step that repeats every 475.5 ¢, or 4 times every interval of 3/1 (1902.0 ¢). Generators that produce this scale range from 237.7 ¢ to 475.5 ¢, or from 0 ¢ to 237.7 ¢. Scales of the true MOS form, where every period is the same, are proper because there is only one small step per period. |
- Links to other pages should also be included, mainly "moment-of-symmetry".