User:Squib
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Todo: short bio thingy, add more todos |
- Squib/Drafts
- Squib/Drafts/10ed5
- Squib/Drafts/1830125∕1830101
- Squib/Drafts/5.7.11.13 subgroup
- Squib/Drafts/75803∕75625
- Squib/Drafts/847∕845
- Squib/Drafts/Miracle extensions and mirage
- Squib/List of edos sorted by accuracy of the perfect fifth
- Squib/List of tunings
- Squib/Simple rank-2 temperaments by subgroup
- Squib/Theory
- Squib/Todo
- Squib/Unnamed music theory
- Squib/sandbox
list of things i do not like about the wiki
this list is here because listing all the things i do like would take too long.
- things on here can be very hard to understand. this is not controversial.
- It's hard to find a page you're looking for even if you know what it's about, but especially if you don't know whether such a page exists in the first place. Important pages for starters should be accessible by following links from the main page. In particular, I'd like a "bird's eye view of bird's eye view pages" page to be linked on the main page.
- Octave equivalence is assumed everywhere. 5/2 and 5/4 are the same as much as 9/8 and 10/9 are the same; treating them the same can be useful in certain contexts, but they are not fundamentally the same thing. And in a space dedicated to exploring new tuning and music, it is very silly and annoying to constantly assume octaves essentially don't matter. (Tritave equivalence isn't a solution, it just moves the problem. I think every pitch should be considered its own thing.)
Random stuff
No-twos commas
No-threes commas
176/175 245/242 1001/1000 6656/6655 170/169 221/220 2200/2197 833/832
19-limit
209/208 476/475 1331/1330 1445/1444 2432/2431 6860/6859 10241/10240
list of interesting edos
19 22 31 34 41 46 53 58 72 87
159 171 205
list of detemperaments
7-limit edos
12: septimal meantone, garibaldi, septimal compton, misty, term, (12 & 270), 12 & 612
19: septimal meantone, sensi, kleismic, parakleismic, enneadecal, (19 & 270), 19 & 2859bcddd (splits 140/1 in 135 parts)
22: 22 & 118, 22 & 171
11-limit rank-twos
miracle: portent, canopus, freya, 31 & 41 & 278cd, ..., 31 & 41 & 994bbbccccddee
orwell: 22 & 31 & 311, 22 & 31 & 494
squares: jove, parimo + breedsma
Commas with monzos containing only ones
Superparticular intervals:
It is very likely that no other such superparticular intervals exist.
Smallest for each prime limit:
2: 2/1
3: 3/2
5: 6/5
7: 15/14
11: 55/42
13: 182/165
17: 715/714
19: 3135/3094
23: 15015/14858
29: 81345/79534
31: 448630/447051
37: 2733549/2714690
41: 17490603/17395070