26edt: Difference between revisions

26edt corresponds to 16.404…[[edo]]. It is [[contorted]] in the 7-limit, tempering out the same commas, [[245/243]] and [[3125/3087]], as [[13edt]]. In the 11-limit it tempers out 125/121 and 3087/3025, in the 13-limit 175/169, 147/143, and 847/845, and in the 17-limit 119/117. It is the seventh [[The Riemann zeta function and tuning#Removing primes|zeta peak tritave division]].

A reason to double 13edt to 26edt is to approximate the [[8/1|8th]], [[13/1|13th]], [[17/1|17th]], [[20/1|20th]], and [[22/1|22nd]] [[harmonic]]s particularly well{{dubious}}. Moreover, it has an exaggerated [[5L 2s (3/1-equivalent)|triatonic]] scale with 11:16:21 supermajor triads, though only the 16:11 is particularly just due to its best 16 still being 28.04 cents sharp, or just about as bad as the 25 of 12edo (which is 27.373 cents sharp, an essentially just 100:63).

While retaining 13edt's mapping of primes 3, 5, and 7, 26edt adds an accurate prime 17 to the mix, tempering out [[2025/2023]] to split the [[BPS]] generator of [[9/7]] into two intervals of [[17/15]]. This 17/15 generates [[Dubhe]] temperament and mos scales of {{mos scalesig|8L 1s<3/1>|link=1}} and {{mos scalesig|9L 8s<3/1>|link=1}} that can be used as a simple traversal of 26edt. Among the 3.5.7.17-[[subgroup]] intervals, the accuracy of [[21/17]] should be highlighted, forming a 21-strong [[consistent circle]] that traverses the edt.

{| class="wikitable center-all right-2 right-3"

! [[4L 5s (3/1-equivalent)|Enneatonic]] degree

! Corresponding<br>3.5.7.17 subgroup intervals

! Dubhe<br>(LLLLLLLLs,<br />J = 1/1)

! [[Lambda ups and downs notation|Lambda]]<br>(sLsLsLsLs,<br />E = 1/1)

| [[51/49]] (+3.9¢); [[85/81]] (−10.3¢)

| J#

| ^E, vF

| [[49/45]] (−1.1¢); [[27/25]] (+13.1¢)

| Kb

| F

| [[135/119]] (+1.1¢); [[17/15]] (+2.8¢)

| K

| ^F, vF#, vGb

| [[25/21]] (−9.2¢)

| K#

| F#, Gb

| [[21/17]] (−0.06¢)

| Lb

| vG, ^F#, ^Gb

| [[9/7]] (+3.8¢)

| L

| G

| [[85/63]] (−6.5¢)

| L#

| ^G, vH

| [[7/5]] (+2.7¢)

| Mb

| H

| [[51/35]] (+6.6¢); [[119/81]] (−7.6¢); [[25/17]] (−9.3¢)

| M

| ^H, vH#, vJb

| [[75/49]] (−5.4¢)

| M#

| H#, Jb

| [[119/75]] (+5.5¢); [[27/17]] (+3.8¢)

| Nb

| vJ, ^H#, ^Jb

| A4/M5

| [[5/3]] (−6.5¢)

| N

| J

| [[85/49]] (−2.6¢), [[147/85]] (+2.6¢)

| N#

| ^J, vA

| [[9/5]] (+6.5¢)

| Ob

| A

| [[225/119]] (−5.5¢); [[17/9]] (−3.8¢)

| O

| ^A, vA#, vBb

| [[49/25]] (+5.4¢)

| O#

| A#, Bb

| [[35/17]] (−6.6¢); [[243/119]] (+7.6¢); [[51/25]] (+9.3¢)

| Pb

| vB, ^A#, ^Bb

| [[15/7]] (−2.7¢)

| P

| B

| [[189/85]] (+6.5¢)

| P#

| ^B, vC

| P8/d9

| [[7/3]] (−3.8¢)

| Qb

| C

| [[17/7]] (+0.06¢)

| Q

| ^C, vC#, vDb

| [[63/25]] (+9.2¢)

| Q#

| C#, Db

| [[119/45]] (−1.1¢); [[45/17]] (−2.8¢)

| Rb

| vD, ^C#, ^Db

| [[135/49]] (+1.1¢); [[25/9]] (−13.1¢)

| R

| D

| [[49/17]] (−3.9¢); [[243/85]] (+10.3¢)

| R#, Jb

| ^D, vE

It is a weird coincidence{{dubious}} how 26edt intones many [[26edo]] intervals within ±6.5{{c}} when it is supposed to have nothing to do with this other tuning:

| −3.470

| −2.168

| −1.666

* ''The Eel And Loach To Attack In Lasciviousness Are Insane'' – [https://www.youtube.com/watch?v=AhWJ2yJsODs video] | [https://web.archive.org/web/20201127012842/http://micro.soonlabel.com/gene_ward_smith/Others/Omega9/Omega9%20-%20The%20Eel%20And%20Loach%20To%20Attack%20In%20Lasciviousness%20Are%20Insane.mp3 play]