User:BudjarnLambeth: Difference between revisions

Line 202:

* This: [[User:BudjarnLambeth/Cultural appropriation-o-meter]]

* We all take ourselves too seriously and should have a little more fun 🎉

* It’s fine to explore the 2.3.5.101 [[subgroup]] if you want to. It doesn’t matter that it’s less [[consonant]] than 2.3.5.7. Explore it anyway and see what happens. Do some stuff with [[:Category:Novelties|arbitrary numbers]] that don’t make logical sense and just see what comes of it. That’s where the fun is!

* I would prefer to use a temperament [[Temperament naming|named]] something fun like “waterslide” or “jinglebells” even if it has lots of error, over one named something dry and bland like “countertrihexakleismatic” even if it’s super [[damage|accurate]] and technically [[badness|better]] - a bland name can kill a temperament’s appeal, a fun name can create appeal out of nothing.

* Most of the ‘mathematically best options’ in music tuning have already been found, so ~~when making new discoveries now~~, ~~it’s makes more sense spending time to find something that sounds new~~ or ~~interesting or has some intriguing story behind it~~, ~~than it is trying~~ to ~~find a~~ more ~~mathematically optimal thing~~ - ~~maths still matters~~, ~~because there’s~~ no ~~point finding a temperament~~ that ~~sounds like sandpaper~~, ~~but~~ it just ~~not everything~~ has to be the ~~mathematically perfect choice is all I’m saying~~. ~~Good enough~~ is ~~good enough~~.

* Most of the ‘mathematically best options’ in music tuning that can be found, have already been found. We 2020s theorists missed out on the initial [[RTT]] gold rush of the 1990s and 2000s, so we’re not ever going to discover low-[[badness]] temperaments in the full [[5-limit]], [[7-limit]] or [[11-limit]], we were born too late to explore those. But we were born just in time to explore more niche, out-of-left-field things. The 90s/00s theorists built the fundamental bedrock. Our job now is decorate its edges with interesting little edge cases and offshoots, be those things like higher limit extensions, no-n subgroup temperaments, dual-n subgroup temperaments, anything like that. Their job in 1990-2010 was to ask “what are the most concordant tunings possible?”. Or job in 2020-2040 is to ask “if we take one of those concordant temperaments and do this to it, what happens? Is it still useable? Is it interesting?”

* ~~It’s fine~~ to ~~explore~~ the 2.3.~~5.101~~ [[~~subgroup~~]] ~~if you want to. It doesn’t matter that it’s less~~ [[~~consonant~~]] ~~than 2.3.5.7. Explore it anyway~~ and ~~see what happens. Do some stuff with~~ [[~~:Category:Novelties|arbitrary numbers~~]] that ~~don’t make logical sense~~ and ~~just see what comes~~ of it. ~~That’s where~~ the ~~fun~~ is!

* For those who are interested in making more major discoveries than that, though, the fields that are still wide open are [[just intonation]] and [[equal-step tunings]].

** There probably are JI scales out there that are very very consonant, and also xenharmonic at the same time, that no one has ever found yet. There are so many approaches to JI, from [[primodality]] to [[combination product set]]s and so on, and most of them have been barely scratched at all in terms of discovering techniques to approach each of the tunings generated with that method. JI right now in 2024 is wide open in the same was RTT was in 1990.

** When it comes to equal tunings, most of the consonant ones have been ''found'' already, but most of them haven’t been ''used'', or at least not more than 2 or 3 times. Imagine all the consonant scales that might exist as subsets of medium to large [[EDO]]s, [[EDT]]s and [[EDF]]s that no one has found yet. Because how do you even start sitting through hundreds and thousands of possible subsets to find the good ones? Well that’s your job, theorist :) Again, I feel ''this'' field is as wide open in 2024 as RTT was in 1990. One of you reading this might very well name a scale that’s as important to some equal tuning as the major scale is to [[12edo]].

@@ Line 202: / Line 202: @@
 * This: [[User:BudjarnLambeth/Cultural appropriation-o-meter]]
 * We all take ourselves too seriously and should have a little more fun 🎉
+* It’s fine to explore the 2.3.5.101 [[subgroup]] if you want to. It doesn’t matter that it’s less [[consonant]] than 2.3.5.7. Explore it anyway and see what happens. Do some stuff with [[:Category:Novelties|arbitrary numbers]] that don’t make logical sense and just see what comes of it. That’s where the fun is!
 * I would prefer to use a temperament [[Temperament naming|named]] something fun like “waterslide” or “jinglebells” even if it has lots of error, over one named something dry and bland like “countertrihexakleismatic” even if it’s super [[damage|accurate]] and technically [[badness|better]] - a bland name can kill a temperament’s appeal, a fun name can create appeal out of nothing.
-* Most of the ‘mathematically best options’ in music tuning have already been found, so when making new discoveries now, it’s makes more sense spending time to find something that sounds new or interesting or has some intriguing story behind it, than it is trying to find a more mathematically optimal thing - maths still matters, because there’s no point finding a temperament that sounds like sandpaper, but it just not everything has to be the mathematically perfect choice is all I’m saying. Good enough is good enough.
+* Most of the ‘mathematically best options’ in music tuning that can be found, have already been found. We 2020s theorists missed out on the initial [[RTT]] gold rush of the 1990s and 2000s, so we’re not ever going to discover low-[[badness]] temperaments in the full [[5-limit]], [[7-limit]] or [[11-limit]], we were born too late to explore those. But we were born just in time to explore more niche, out-of-left-field things. The 90s/00s theorists built the fundamental bedrock. Our job now is decorate its edges with interesting little edge cases and offshoots, be those things like higher limit extensions, no-n subgroup temperaments, dual-n subgroup temperaments, anything like that. Their job in 1990-2010 was to ask “what are the most concordant tunings possible?”. Or job in 2020-2040 is to ask “if we take one of those concordant temperaments and do this to it, what happens? Is it still useable? Is it interesting?”
-* It’s fine to explore the 2.3.5.101 [[subgroup]] if you want to. It doesn’t matter that it’s less [[consonant]] than 2.3.5.7. Explore it anyway and see what happens. Do some stuff with [[:Category:Novelties|arbitrary numbers]] that don’t make logical sense and just see what comes of it. That’s where the fun is!
+* For those who are interested in making more major discoveries than that, though, the fields that are still wide open are [[just intonation]] and [[equal-step tunings]].
+** There probably are JI scales out there that are very very consonant, and also xenharmonic at the same time, that no one has ever found yet. There are so many approaches to JI, from [[primodality]] to [[combination product set]]s and so on, and most of them have been barely scratched at all in terms of discovering techniques to approach each of the tunings generated with that method. JI right now in 2024 is wide open in the same was RTT was in 1990.
+** When it comes to equal tunings, most of the consonant ones have been ''found'' already, but most of them haven’t been ''used'', or at least not more than 2 or 3 times. Imagine all the consonant scales that might exist as subsets of medium to large [[EDO]]s, [[EDT]]s and [[EDF]]s that no one has found yet. Because how do you even start sitting through hundreds and thousands of possible subsets to find the good ones? Well that’s your job, theorist :) Again, I feel ''this'' field is as wide open in 2024 as RTT was in 1990. One of you reading this might very well name a scale that’s as important to some equal tuning as the major scale is to [[12edo]].
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