Ah yes, 5/3: my favourite just interval. It’s of the most stable intervals while being a little more complex and flavourful than 3/2, for example. In fact in no-2s temperament, it is the most consonant interval between the unison and the period, and forms the bottom interval of the 3:5:7:9 chord. This interval gets a rating of 5 out of 3. 19-EDO does an unbeatably fantastic job of approximating 5/3, while being a small yet solid temperament for the 2.3.5.7.13 subgroup. Also, I like what you did with the harmonic mean and arithmetic mean there. I actually just realized that they’re both equidistant from the geometric mean!
@@G8tr1522 The mapping for 2.3.5.7.13 is [⟨19 30 44 53 70]] so to make such a chord in degree notation, it would be: 0-11-14-9-17. 19-edo can definitely approximately the 9th harmonic consistently, as 9 is 3×3, as can every tuning system that approximates the 3rd harmonic within 25 cents of relative error.
I made it in dorico so I didnt use an scl or tun file but from C it would go something like 1/1 - C 9/8 - D 7/6 - Eb< 6/5 - Eb^ 5/4 - Ev 4/3 - F 7/5 - Gb
i'm a simple man. i see mannfishh i click. as always -- source of beauty and springboard for further exploration. thanks!!
If you like microtonal music you're very complex
I've never seen someone use just intonation as beautifully as mannfishh
hi, I miss your music and videos. I like them very much
Ahhh, mannfishh, bubbe, welcome back. That was 🤌🤌🤌
Ah yes, 5/3: my favourite just interval. It’s of the most stable intervals while being a little more complex and flavourful than 3/2, for example. In fact in no-2s temperament, it is the most consonant interval between the unison and the period, and forms the bottom interval of the 3:5:7:9 chord. This interval gets a rating of 5 out of 3.
19-EDO does an unbeatably fantastic job of approximating 5/3, while being a small yet solid temperament for the 2.3.5.7.13 subgroup.
Also, I like what you did with the harmonic mean and arithmetic mean there. I actually just realized that they’re both equidistant from the geometric mean!
wait, so what 19-edo intervals do i use to get 2:3:5:7:13?
and you're saying i can't approximate the 9?
@@G8tr1522 The mapping for 2.3.5.7.13 is [⟨19 30 44 53 70]] so to make such a chord in degree notation, it would be: 0-11-14-9-17.
19-edo can definitely approximately the 9th harmonic consistently, as 9 is 3×3, as can every tuning system that approximates the 3rd harmonic within 25 cents of relative error.
Ouch that was good, do you have some info of the TUN so i can just input and use this scale from the vid?
I made it in dorico so I didnt use an scl or tun file but from C it would go something like
1/1 - C
9/8 - D
7/6 - Eb<
6/5 - Eb^
5/4 - Ev
4/3 - F
7/5 - Gb
@@mannfishh tank bro
Thank you dear mannfishh 🎹👏
i needed this
where mannfishh?
i have no idea what's happening but it sounds pretty good
where did you go? i must know more about microtonality!
incredibly common mannfish mega W
Why are you not doing anything?!
where is he?
so nice
Idea: Miku pizza songs, but microtonal.
what program do you use?
dorico pro
a more normal ratio than the usual but pretty sounding nonetheless
Is there a video with 19/10?
Do it with an octave
ua-cam.com/video/R0AidRIqZsE/v-deo.html
What about 13/7
This is beautiful, well done. 😘🎶🌈💚🏳️🌈🦄⚧️🏳️⚧️💖💙💜⚡🧠♾️