Could you make an updated version of your "Harmonics addition"? Like you had that shifting: 6n+6 (all) -> 6n+5 -> 6n+4 (3n+2) -> 6n+3 (odd) -> 6n+2 (3n+1) -> 6n+1 And then you can get new harmonics with adding them like: 6n+2 (3n+1) + 6n+5 = 6n+4 (3n+2) octave lower 6n+4 (3n+2) + 6n+1 = 6n+2 (3n+1) octave lower 6n+2 (3n+1) + 6n+4 (3n+2) = triodd 6n+1 + 6n+5 = odd-triodd ...and so on.
It'd be interesting to see an analysis of the average number of intersections and the shortness of route between two random points.
Cool
Thanks
Could you make an updated version of your "Harmonics addition"?
Like you had that shifting:
6n+6 (all) -> 6n+5 -> 6n+4 (3n+2) -> 6n+3 (odd) -> 6n+2 (3n+1) -> 6n+1
And then you can get new harmonics with adding them like:
6n+2 (3n+1) + 6n+5 = 6n+4 (3n+2) octave lower
6n+4 (3n+2) + 6n+1 = 6n+2 (3n+1) octave lower
6n+2 (3n+1) + 6n+4 (3n+2) = triodd
6n+1 + 6n+5 = odd-triodd
...and so on.
Maybe sometime next year
I know this isn't related to the video but I tried to contact you via email and you haven't responded. Could you please get in touch with me?
I will sometime next week because I'm busy with things now