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{{Infobox ET}} | {{Infobox ET}} | ||
{{ED intro}} It is also known as the '''Triple Bohlen–Pierce scale''' ('''Triple BP'''), since it divides each step of the equal-tempered [[Bohlen–Pierce]] scale ([[13edt]]) into three equal parts. | |||
39edt can be described as approximately 24.606[[edo]]. This implies that each step of 39edt can be approximated by 5 steps of [[123edo]]. 39edt contains within it a close approximation of [[4ed11/5]]: every seventh step of 39edt equates to a step of 4ed11/5. | 39edt can be described as approximately 24.606[[edo]]. This implies that each step of 39edt can be approximated by 5 steps of [[123edo]]. 39edt contains within it a close approximation of [[4ed11/5]]: every seventh step of 39edt equates to a step of 4ed11/5. | ||
== Theory == | == Theory == | ||
It is a strong no-twos 13-limit system, a fact first noted by [[Paul Erlich]]; in fact it has a better no-twos 13-[[odd limit]] relative error than any other edt up to [[914edt]]. Like [[26edt]] and [[52edt]], it is a multiple of 13edt and so contains the Bohlen-Pierce scale, being [[contorted]] in the no-twos 7-limit, tempering out the same BP commas, [[245/243]] and [[3125/3087]], as 13edt. In the [[11-limit]] it tempers out [[1331/1323]] and in the [[13-limit]] [[275/273]], [[1575/1573]], and [[847/845]]. An efficient traversal is therefore given by [[Mintra]] temperament, which in the 13-limit tempers out 275/273 and | It is a strong no-twos 13-limit system, a fact first noted by [[Paul Erlich]]; in fact it has a better no-twos 13-[[odd limit]] relative error than any other edt up to [[914edt]]. Like [[26edt]] and [[52edt]], it is a multiple of 13edt and so contains the Bohlen-Pierce scale, being [[contorted]] in the no-twos 7-limit, tempering out the same BP commas, [[245/243]] and [[3125/3087]], as 13edt. In the [[11-limit]] it tempers out [[1331/1323]] and in the [[13-limit]] [[275/273]], [[1575/1573]], and [[847/845]]. An efficient traversal is therefore given by [[Mintra]] temperament, which in the 13-limit tempers out 275/273 and 1331/1323 alongside 245/243, and is generated by the interval of [[11/7]], which serves as a [[macrodiatonic]] "superpyth" fourth and splits the [[BPS]] generator of [[9/7]], up a tritave, in three. | ||
If octaves are inserted, 39edt is related to the 49f&172f temperament in the full 13-limit, known as [[Sensamagic clan#Triboh|triboh]], tempering out 245/243, 275/273, 847/845 and 1575/1573, which has mapping [{{val|1 0 0 0 0 0}}, {{val|0 39 57 69 85 91}}]. This has a POTE generator which is an approximate 77/75 of 48.822 cents. 39edt is the ninth [[ | If octaves are inserted, 39edt is related to the {{nowrap|49f & 172f}} temperament in the full 13-limit, known as [[Sensamagic clan#Triboh|triboh]], tempering out 245/243, 275/273, 847/845 and 1575/1573, which has mapping [{{val|1 0 0 0 0 0}}, {{val|0 39 57 69 85 91}}]. This has a POTE generator which is an approximate 77/75 of 48.822 cents. 39edt is the ninth [[The Riemann zeta function and tuning#Removing primes|no-twos zeta peak edt]]. | ||
When treated as an octave-repeating tuning with the sharp octave of 25 steps (about 1219 cents), and the other primes chosen by their best octave-reduced mappings, it functions as a tuning of [[mavila]] temperament, analogous to [[25edo]]'s mavila. | |||
Mavila is one of the few places where octave-stretching makes sense, due to how flat the fifth and often the major third are; this fifth of 683 cents is much more recognizable as a perfect fifth of 3/2 than the 672-cent tuning with just octaves. | |||
{{Harmonics in equal|39|3|1|intervals=prime|columns=12}} | {{Harmonics in equal|39|3|1|intervals=prime|columns=12}} | ||
== Intervals == | == Intervals == | ||
| Line 20: | Line 22: | ||
! [[Cent]]s | ! [[Cent]]s | ||
! [[Hekt]]s | ! [[Hekt]]s | ||
! [[4L 5s (3/1-equivalent)|Enneatonic]] degree | ! [[4L 5s (3/1-equivalent)|Enneatonic]]<br />degree | ||
! Corresponding | ! Corresponding 3.5.7.11.13 subgroup<br />intervals | ||
! [[Lambda ups and downs notation|Lambda]] <br />(sLsLsLsLs,<br />J = 1/1) | ! [[Lambda ups and downs notation|Lambda]]<br />(sLsLsLsLs,<br />{{nowrap|J {{=}} 1/1}}) | ||
! Mintaka[7]<br />(E macro-Phrygian) | ! Mintaka[7]<br />(E macro-Phrygian) | ||
|- | |- | ||
| Line 37: | Line 39: | ||
| 33.3 | | 33.3 | ||
| SP1 | | SP1 | ||
| [[77/75]] (+3. | | [[77/75]] (+3.2¢); [[65/63]] (−5.3¢) | ||
| ^J | | ^J | ||
| ^E, vF | | ^E, vF | ||
| Line 45: | Line 47: | ||
| 66.7 | | 66.7 | ||
| sA1/sm2 | | sA1/sm2 | ||
| [[35/33]] ( | | [[35/33]] (−4.3¢); [[81/77]] (+9.9¢) | ||
| vK | | vK | ||
| F | | F | ||
| Line 53: | Line 55: | ||
| 100 | | 100 | ||
| A1/m2 | | A1/m2 | ||
| [[99/91]] (+0. | | [[99/91]] (+0.4¢); [[49/45]] (−1.1¢); [[27/25]] (+13.1¢) | ||
| K | | K | ||
| ^F, vGb, Dx | | ^F, vGb, Dx | ||
| Line 61: | Line 63: | ||
| 133.3 | | 133.3 | ||
| SA1/Sm2 | | SA1/Sm2 | ||
| [[55/49]] ( | | [[55/49]] (−4.9¢); [[91/81]] (−6.5¢); [[39/35]] (+7.7¢) | ||
| ^K | | ^K | ||
| Gb, vE# | | Gb, vE# | ||
| Line 69: | Line 71: | ||
| 166.7 | | 166.7 | ||
| sM2/sd3 | | sM2/sd3 | ||
| [[15/13]] ( | | [[15/13]] (−3.9¢); [[63/55]] (+8.7¢) | ||
| vK#, vLb | | vK#, vLb | ||
| ^Gb, E# | | ^Gb, E# | ||
| Line 77: | Line 79: | ||
| 200 | | 200 | ||
| M2/d3 | | M2/d3 | ||
| [[77/65]] ( | | [[77/65]] (−0.7¢); [[13/11]] (+3.4¢); [[25/21]] (−9.2¢) | ||
| K#, Lb | | K#, Lb | ||
| vF#, ^E# | | vF#, ^E# | ||
| Line 85: | Line 87: | ||
| 233.3 | | 233.3 | ||
| SM2/Sd3 | | SM2/Sd3 | ||
| [[11/9]] ( | | [[11/9]] (−6.0¢); [[91/75]] (+6.6¢) | ||
| ^K#, ^Lb | | ^K#, ^Lb | ||
| F# | | F# | ||
| Line 93: | Line 95: | ||
| 266.7 | | 266.7 | ||
| sA2/sP3/sd4 | | sA2/sP3/sd4 | ||
| [[49/39]] ( | | [[49/39]] (−5.0¢); [[81/65]] (+9.2¢) | ||
| vL | | vL | ||
| vG, ^F# | | vG, ^F# | ||
| Line 101: | Line 103: | ||
| 300 | | 300 | ||
| A2/P3/d4 | | A2/P3/d4 | ||
| [[9/7]] (+3. | | [[9/7]] (+3.8¢); [[35/27]] (−10.3¢) | ||
| L | | L | ||
| G | | G | ||
| Line 109: | Line 111: | ||
| 333.3 | | 333.3 | ||
| SA2/SP3/Sd4 | | SA2/SP3/Sd4 | ||
| [[65/49]] ( | | [[65/49]] (−1.5¢); [[33/25]] (+7.0¢) | ||
| ^L | | ^L | ||
| ^G, vAb | | ^G, vAb | ||
| Line 117: | Line 119: | ||
| 366.7 | | 366.7 | ||
| sA3/sm4/sd5 | | sA3/sm4/sd5 | ||
| [[15/11]] ( | | [[15/11]] (−0.5¢) | ||
| vM | | vM | ||
| Ab | | Ab | ||
| Line 125: | Line 127: | ||
| 400 | | 400 | ||
| A3/m4/d5 | | A3/m4/d5 | ||
| [[7/5]] (+2. | | [[7/5]] (+2.7¢) | ||
| M | | M | ||
| ^Ab, Fx | | ^Ab, Fx | ||
| Line 133: | Line 135: | ||
| 433.3 | | 433.3 | ||
| SA3/Sm4/Sd5 | | SA3/Sm4/Sd5 | ||
| [[13/9]] ( | | [[13/9]] (−2.6¢) | ||
| ^M | | ^M | ||
| vG# | | vG# | ||
| Line 141: | Line 143: | ||
| 466.7 | | 466.7 | ||
| sM4/sm5 | | sM4/sm5 | ||
| [[135/91]] (+0. | | [[135/91]] (+0.07¢); [[49/33]] (−1.6¢); [[81/55]] (+12.6¢) | ||
| vM#, vNb | | vM#, vNb | ||
| G# | | G# | ||
| Line 149: | Line 151: | ||
| 500 | | 500 | ||
| M4/m5 | | M4/m5 | ||
| [[75/49]] ( | | [[75/49]] (−5.4¢); [[117/77]] (+7.2¢) | ||
| M#, Nb | | M#, Nb | ||
| vA, ^G# | | vA, ^G# | ||
| Line 157: | Line 159: | ||
| 533.3 | | 533.3 | ||
| SM4/Sm5 | | SM4/Sm5 | ||
| [[11/7]] ( | | [[11/7]] (−2.2¢); [[39/25]] (+10.4¢) | ||
| ^M#, ^Nb | | ^M#, ^Nb | ||
| A | | A | ||
| Line 165: | Line 167: | ||
| 566.7 | | 566.7 | ||
| sA4/sM5 | | sA4/sM5 | ||
| [[21/13]] ( | | [[21/13]] (−1.2¢) | ||
| vN | | vN | ||
| ^A, vBb | | ^A, vBb | ||
| Line 173: | Line 175: | ||
| 600 | | 600 | ||
| A4/M5 | | A4/M5 | ||
| [[91/55]] (+6. | | [[91/55]] (+6.1¢); [[5/3]] (−6.5¢); [[81/49]] (+7.7¢) | ||
| N | | N | ||
| Bb | | Bb | ||
| Line 181: | Line 183: | ||
| 633.3 | | 633.3 | ||
| SA4/SM5 | | SA4/SM5 | ||
| [[77/45]] ( | | [[77/45]] (−3.3¢) | ||
| ^N | | ^N | ||
| ^Bb, vCb, Gx | | ^Bb, vCb, Gx | ||
| Line 189: | Line 191: | ||
| 666.7 | | 666.7 | ||
| sA5/sm6/sd7 | | sA5/sm6/sd7 | ||
| [[135/77]] (+3. | | [[135/77]] (+3.3¢) | ||
| vO | | vO | ||
| vA#, Cb | | vA#, Cb | ||
| Line 197: | Line 199: | ||
| 700 | | 700 | ||
| A5/m6/d7 | | A5/m6/d7 | ||
| [[165/91]] ( | | [[165/91]] (−6.1¢); [[9/5]] (+6.5¢); [[49/27]] (−7.7¢) | ||
| O | | O | ||
| A#, ^Cb | | A#, ^Cb | ||
| Line 205: | Line 207: | ||
| 733.3 | | 733.3 | ||
| SA5/Sm6/Sd7 | | SA5/Sm6/Sd7 | ||
| [[13/7]] (+1. | | [[13/7]] (+1.2¢) | ||
| ^O | | ^O | ||
| vB, ^A# | | vB, ^A# | ||
| Line 213: | Line 215: | ||
| 766.7 | | 766.7 | ||
| sM6/sm7 | | sM6/sm7 | ||
| [[21/11]] (+2. | | [[21/11]] (+2.2¢); [[25/13]] (−10.4¢) | ||
| vO#, vPb | | vO#, vPb | ||
| B | | B | ||
| Line 221: | Line 223: | ||
| 800 | | 800 | ||
| M6/m7 | | M6/m7 | ||
| [[49/25]] (+5. | | [[49/25]] (+5.4¢); [[77/39]] (−7.2¢) | ||
| O#, Pb | | O#, Pb | ||
| ^B, vC | | ^B, vC | ||
| Line 229: | Line 231: | ||
| 833.3 | | 833.3 | ||
| SM6/Sm7 | | SM6/Sm7 | ||
| [[91/45]] (+0. | | [[91/45]] (+0.07¢); [[99/49]] (+1.6¢); [[55/27]] (−12.6¢) | ||
| ^O#, ^Pb | | ^O#, ^Pb | ||
| C | | C | ||
| Line 237: | Line 239: | ||
| 866.7 | | 866.7 | ||
| sA6/sM7/sd8 | | sA6/sM7/sd8 | ||
| [[27/13]] (+2. | | [[27/13]] (+2.6¢) | ||
| vP | | vP | ||
| ^C, vDb | | ^C, vDb | ||
| Line 245: | Line 247: | ||
| 900 | | 900 | ||
| A6/M7/d8 | | A6/M7/d8 | ||
| [[15/7]] ( | | [[15/7]] (−2.7¢) | ||
| P | | P | ||
| Db, vB# | | Db, vB# | ||
| Line 253: | Line 255: | ||
| 933.3 | | 933.3 | ||
| SA6/SM7/Sd8 | | SA6/SM7/Sd8 | ||
| [[11/5]] (+0. | | [[11/5]] (+0.5¢) | ||
| ^P | | ^P | ||
| ^Db, B# | | ^Db, B# | ||
| Line 261: | Line 263: | ||
| 966.7 | | 966.7 | ||
| sP8/sd9 | | sP8/sd9 | ||
| [[147/65]] (+1. | | [[147/65]] (+1.5¢); [[25/11]] (−7.0¢) | ||
| vQ | | vQ | ||
| vC#, ^B# | | vC#, ^B# | ||
| Line 269: | Line 271: | ||
| 1000 | | 1000 | ||
| P8/d9 | | P8/d9 | ||
| [[7/3]] ( | | [[7/3]] (−3.8¢); [[81/35]] (+10.3¢) | ||
| Q | | Q | ||
| C# | | C# | ||
| Line 277: | Line 279: | ||
| 1033.3 | | 1033.3 | ||
| SP8/Sd9 | | SP8/Sd9 | ||
| [[117/49]] (+5. | | [[117/49]] (+5.0¢); [[65/27]] (−9.2¢) | ||
| ^Q | | ^Q | ||
| vD, ^C# | | vD, ^C# | ||
| Line 285: | Line 287: | ||
| 1066.7 | | 1066.7 | ||
| sA8/sm9 | | sA8/sm9 | ||
| [[27/11]] (+6. | | [[27/11]] (+6.0¢); [[225/91]] (+6.6¢) | ||
| vQ#, vRb | | vQ#, vRb | ||
| D | | D | ||
| Line 293: | Line 295: | ||
| 1100 | | 1100 | ||
| A8/m9 | | A8/m9 | ||
| [[195/77]] ( | | [[195/77]] (−0.7¢); [[33/13]] (−3.4¢); [[63/25]] (+9.2¢) | ||
| Q#, Rb | | Q#, Rb | ||
| ^D, vEb | | ^D, vEb | ||
| Line 301: | Line 303: | ||
| 1133.3 | | 1133.3 | ||
| SA8/Sm9 | | SA8/Sm9 | ||
| [[13/5]] (+3. | | [[13/5]] (+3.9¢); [[55/21]] (−8.7¢) | ||
| ^Q#, ^Rb | | ^Q#, ^Rb | ||
| Eb | | Eb | ||
| Line 309: | Line 311: | ||
| 1166.7 | | 1166.7 | ||
| sM9/sd10 | | sM9/sd10 | ||
| [[147/55]] (+4. | | [[147/55]] (+4.9¢); [[243/91]] (+6.5¢); [[35/13]] (−7.7¢) | ||
| vR | | vR | ||
| ^Eb, vFb, Cx | | ^Eb, vFb, Cx | ||
| Line 317: | Line 319: | ||
| 1200 | | 1200 | ||
| M9/d10 | | M9/d10 | ||
| [[91/33]] (+0. | | [[91/33]] (+0.4¢); [[135/49]] (+1.1¢); [[25/9]] (−13.1¢) | ||
| R | | R | ||
| vD#, Fb | | vD#, Fb | ||
| Line 325: | Line 327: | ||
| 1233.3 | | 1233.3 | ||
| SM9/Sd10 | | SM9/Sd10 | ||
| [[99/35]] (+4. | | [[99/35]] (+4.3¢); [[77/27]] (−9.9¢) | ||
| ^R | | ^R | ||
| D#, ^Fb | | D#, ^Fb | ||
| Line 333: | Line 335: | ||
| 1266.7 | | 1266.7 | ||
| sA9/sP10 | | sA9/sP10 | ||
| [[225/77]] ( | | [[225/77]] (−3.2¢); [[189/65]] (+5.3¢) | ||
| vJ | | vJ | ||
| vE, ^D# | | vE, ^D# | ||
| Line 345: | Line 347: | ||
| E | | E | ||
|} | |} | ||
== Approximation to JI == | |||
=== No-2 zeta peak === | |||
{| class="wikitable" | |||
|+ | |||
!Steps | |||
per octave | |||
!Steps | |||
per tritave | |||
!Step size | |||
(cents) | |||
!Height | |||
!Tritave size | |||
(cents) | |||
!Tritave stretch | |||
(cents) | |||
|- | |||
|24.573831630 | |||
|38.948601633 | |||
|48.832433543 | |||
|4.665720 | |||
|1904.464908194 | |||
|2.509907328 | |||
|} | |||
Every 7 steps of the [[172edo|172f]] val is an excellent approximation of the ninth no-2 zeta peak in the 15-limit. | |||
== Music == | |||
; [[Francium]] | |||
* [https://www.youtube.com/watch?v=jstg4_B0jfY ''Strange Juice''] (2025) | |||
;[https://www.youtube.com/@PhanomiumMusic Phanomium] | |||
* ''[https://www.youtube.com/watch?v=GX79ZX1Z8C8 Polygonal]'' (2025) | |||