3072edo: Difference between revisions

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~~==Theory==~~

3072edo is consistent to the [[11-limit]] and it is an extremely accurate 5-limit tuning, tempering out {{monzo|37 25 -33}} (whoosh) and {{monzo|161 -84 -12}} ([[Kirnberger's atom|atom]]) in the 5-limit; 250047/250000, {{monzo|-2 -25 1 14}}, and {{monzo|-53 -1 9 12}}; in the 7-limit; 9801/9800, 151263/151250, 184549376/184528125, and 73525096183/73466403840 in the 11-limit.

Although consistent to the 11-limit, it makes more sense to actually see 3072edo as a 2.3.5.7.13 subgroup tuning, due to lower relative error. There it tempers out 140625/140608 and 1990656/1990625. Overall in the 13-limit, the patent val still has smaller errors than any other val despite incosistency. In higher limits, it is not as impressive, with only [[53/32]] being 17% off and 2.3.5.67.71 subgroup having less than 4% error.

== Theory ==

3072edo is [[consistent]] to the [[11-odd-limit]] and it is an extremely accurate 5-limit tuning, tempering out {{monzo| 37 25 -33 }} (whoosh) and {{monzo| 161 -84 -12 }} ([[Kirnberger's atom|atom]]) in the 5-limit; 250047/250000 ([[landscape comma]]), {{monzo| -2 -25 1 14 }}, and {{monzo| -53 -1 9 12 }}; in the 7-limit; [[9801/9800]], 151263/151250, 184549376/184528125, and 73525096183/73466403840 in the 11-limit.

Although consistent to the 11-odd-limit, it makes more sense to actually see 3072edo as a 2.3.5.7.13 [[subgroup]] tuning, due to lower relative error. There it tempers out 140625/140608 and 1990656/1990625. Overall in the 13-limit, the [[patent val]] still has smaller errors than any other val despite incosistency. In higher limits, it is not as impressive, with only [[53/32]] being 17% off and 2.3.5.67.71 subgroup having less than 4% error.

=== Significance in digital audio software ===

3072edo's step is known as '''Octamu''' (eighth MIDI-resolution unit, 8mu, 28 = 256 equal divisions of the [[12edo]] semitone). The internal data structure of the 8mu requires two bytes, with the first bits of each byte reserved as a flags to indicate the byte's status as data, and one bit in the first byte to indicate the sign (+ or −) showing the direction of the pitch-bend up or down, and 5 other bits which are not used. The first data byte transmitted is the Least Significant Byte (LSB), equivalent to a fine-tuning. The second data byte transmitted is the Most Significant Byte (MSB), equivalent to a coarse-tuning.

=== Prime harmonics ===

=== Subsets and supersets ===

3072 factors as ~~210 x 3~~, with subset edos {{EDOs|1, 2, 3, 4, 6, 8, 12, 16, 24, 32, 48, 64, 96, 128, 192, 256, 384, 512, 768, 1024, 1536}}.

3072 factors as {{factorization|3072}}, with subset edos {{EDOs| 2, 3, 4, 6, 8, 12, 16, 24, 32, 48, 64, 96, 128, 192, 256, 384, 512, 768, 1024, and 1536 }}.

== Regular temperament properties ==

{| class="wikitable center-4 center-5 center-6"

! rowspan="2" |[[Subgroup]]

! rowspan="2" | [[Subgroup]]

! rowspan="2" |[[Comma list]]

! rowspan="2" | [[Comma list]]

! rowspan="2" |[[Mapping]]

! rowspan="2" | [[Mapping]]

! rowspan="2" |Optimal

! rowspan="2" | Optimal 8ve Stretch (¢)

8ve Stretch (¢)

! colspan="2" | Tuning Error

! colspan="2" |Tuning Error

|-

![[TE error|Absolute]] (¢)

! [[TE error|Absolute]] (¢)

![[TE simple badness|Relative]] (%)

! [[TE simple badness|Relative]] (%)

|-

|2.3.5

| 2.3.5

|{{monzo|37 25 -33}}, {{monzo|161 -84 -12}}

| {{monzo| 37 25 -33 }}, {{monzo| 161 -84 -12 }}

|[{{~~val~~|3072 4869 7133}}]

| {{mapping| 3072 4869 7133 }}

| -0.002

|0.003

| 0.003

|

|-

|2.3.5.7

| 2.3.5.7

|250047/250000, {{monzo|-2 -25 1 14}}, {{monzo|-53 -1 9 12}}

| 250047/250000, {{monzo| -2 -25 1 14 }}, {{monzo| -53 -1 9 12 }}

|[{{~~val~~|3072 4869 7133 8624}}]

| {{mapping| 3072 4869 7133 8624 }}

|0.006

| 0.006

|0.013

| 0.013

|

|-

|2.3.5.7.11

| 2.3.5.7.11

|9801/9800, 151263/151250, 184549376/184528125, 73525096183/73466403840

| 9801/9800, 151263/151250, 184549376/184528125, 73525096183/73466403840

|[{{~~val~~|3072 4869 7133 8624 10627}}]

| {{mapping| 3072 4869 7133 8624 10627 }}

|0.013

| 0.013

|0.019

| 0.019

|

|-

|2.3.5.7.11.13

| 2.3.5.7.11.13

|9801/9800, 140625/140608, 151263/151250, 196625/196608, 3327500/3326427

| 9801/9800, 140625/140608, 151263/151250, 196625/196608, 3327500/3326427

|[{{~~val~~|3072 4869 7133 8624 10627 11638}}]

| {{mapping| 3072 4869 7133 8624 10627 11638 }}

|0.006

| 0.006

|0.022

| 0.022

|

|}

==See also==

*[[Equal-step tuning|Equal multiplications]] of MIDI-resolution units

== See also ==

**[[24edo]] (1mu tuning)

* [[Equal-step tuning|Equal multiplications]] of MIDI-resolution units

**[[48edo]] (2mu tuning)

** [[24edo]] (1mu tuning)

**[[96edo]] (3mu tuning)

** [[48edo]] (2mu tuning)

**[[192edo]] (4mu tuning)

** [[96edo]] (3mu tuning)

**[[384edo]] (5mu tuning)

** [[192edo]] (4mu tuning)

**[[768edo]] (6mu tuning)

** [[384edo]] (5mu tuning)

**[[1536edo]] (7mu tuning)

** [[768edo]] (6mu tuning)

**[[6144edo]] (9mu tuning)

** [[1536edo]] (7mu tuning)

**[[12288edo]] (10mu tuning)

** [[6144edo]] (9mu tuning)

**[[24576edo]] (11mu tuning)

** [[12288edo]] (10mu tuning)

**[[49152edo]] (12mu tuning)

** [[24576edo]] (11mu tuning)

**[[98304edo]] (13mu tuning)

** [[49152edo]] (12mu tuning)

**[[196608edo]] (14mu tuning)

** [[98304edo]] (13mu tuning)

** [[196608edo]] (14mu tuning)

== Music ==

; [[Eliora]]

* ''[https://www.youtube.com/watch?v=sksIgNTJ-XY Etude for Celtic Harp in Whoosh ~~(Op. 3, No. 5)]~~'' (2023)

* [https://www.youtube.com/watch?v=sksIgNTJ-XY ''Etude for Celtic Harp in Whoosh''] (2023)

[[Category:Listen]]

@@ Line 1: / Line 1: @@
 {{Infobox ET}}
 {{EDO intro|3072}}
-==Theory==
-edo is consistent to the [[11-limit]] and it is an extremely accurate 5-limit tuning, tempering out {{monzo|37 25 -33}} (whoosh) and {{monzo|161 -84 -12}} ([[Kirnberger's atom|atom]]) in the 5-limit; 250047/250000, {{monzo|-2 -25 1 14}}, and {{monzo|-53 -1 9 12}}; in the 7-limit; 9801/9800, 151263/151250, 184549376/184528125, and 73525096183/73466403840 in the 11-limit.
-Although consistent to the 11-limit, it makes more sense to actually see 3072edo as a 2.3.5.7.13 subgroup tuning, due to lower relative error. There it tempers out 140625/140608 and 1990656/1990625. Overall in the 13-limit, the patent val still has smaller errors than any other val despite incosistency. In higher limits, it is not as impressive, with only [[53/32]] being 17% off and 2.3.5.67.71 subgroup having less than 4% error.
+== Theory ==
+edo is [[consistent]] to the [[11-odd-limit]] and it is an extremely accurate 5-limit tuning, tempering out {{monzo| 37 25 -33 }} (whoosh) and {{monzo| 161 -84 -12 }} ([[Kirnberger's atom|atom]]) in the 5-limit; 250047/250000 ([[landscape comma]]), {{monzo| -2 -25 1 14 }}, and {{monzo| -53 -1 9 12 }}; in the 7-limit; [[9801/9800]], 151263/151250, 184549376/184528125, and 73525096183/73466403840 in the 11-limit.
+Although consistent to the 11-odd-limit, it makes more sense to actually see 3072edo as a 2.3.5.7.13 [[subgroup]] tuning, due to lower relative error. There it tempers out 140625/140608 and 1990656/1990625. Overall in the 13-limit, the [[patent val]] still has smaller errors than any other val despite incosistency. In higher limits, it is not as impressive, with only [[53/32]] being 17% off and 2.3.5.67.71 subgroup having less than 4% error.
 === Significance in digital audio software ===
 edo's step is known as '''Octamu''' (eighth MIDI-resolution unit, 8mu, 2<sup>8</sup> = 256 equal divisions of the [[12edo]] semitone). The internal data structure of the 8mu requires two bytes, with the first bits of each byte reserved as a flags to indicate the byte's status as data, and one bit in the first byte to indicate the sign (+ or &minus;) showing the direction of the pitch-bend up or down, and 5 other bits which are not used. The first data byte transmitted is the Least Significant Byte (LSB), equivalent to a fine-tuning. The second data byte transmitted is the Most Significant Byte (MSB), equivalent to a coarse-tuning.
 === Prime harmonics ===
-{{harmonics in equal|3072}}
+{{Harmonics in equal|3072}}
 === Subsets and supersets ===
-factors as 2<sup>10</sup> x 3, with subset edos {{EDOs|1, 2, 3, 4, 6, 8, 12, 16, 24, 32, 48, 64, 96, 128, 192, 256, 384, 512, 768, 1024, 1536}}.
+factors as {{factorization|3072}}, with subset edos {{EDOs| 2, 3, 4, 6, 8, 12, 16, 24, 32, 48, 64, 96, 128, 192, 256, 384, 512, 768, 1024, and 1536 }}.
 == Regular temperament properties ==
 {| class="wikitable center-4 center-5 center-6"
-! rowspan="2" |[[Subgroup]]
+! rowspan="2" | [[Subgroup]]
-! rowspan="2" |[[Comma list]]
+! rowspan="2" | [[Comma list]]
-! rowspan="2" |[[Mapping]]
+! rowspan="2" | [[Mapping]]
-! rowspan="2" |Optimal
+! rowspan="2" | Optimal<br>8ve Stretch (¢)
-ve Stretch (¢)
+! colspan="2" | Tuning Error
-! colspan="2" |Tuning Error
 |-
-![[TE error|Absolute]] (¢)
+! [[TE error|Absolute]] (¢)
-![[TE simple badness|Relative]] (%)
+! [[TE simple badness|Relative]] (%)
 |-
-|2.3.5
+| 2.3.5
-|{{monzo|37 25 -33}}, {{monzo|161 -84 -12}}
+| {{monzo| 37 25 -33 }}, {{monzo| 161 -84 -12 }}
-|[{{val|3072 4869 7133}}]
+| {{mapping| 3072 4869 7133 }}
 | -0.002
-|0.003
+| 0.003
 |
 |-
-|2.3.5.7
+| 2.3.5.7
-|250047/250000, {{monzo|-2 -25 1 14}}, {{monzo|-53 -1 9 12}}
+| 250047/250000, {{monzo| -2 -25 1 14 }}, {{monzo| -53 -1 9 12 }}
-|[{{val|3072 4869 7133 8624}}]
+| {{mapping| 3072 4869 7133 8624 }}
-|0.006
+| 0.006
-|0.013
+| 0.013
 |
 |-
-|2.3.5.7.11
+| 2.3.5.7.11
-|9801/9800, 151263/151250, 184549376/184528125, 73525096183/73466403840
+| 9801/9800, 151263/151250, 184549376/184528125, 73525096183/73466403840
-|[{{val|3072 4869 7133 8624 10627}}]
+| {{mapping| 3072 4869 7133 8624 10627 }}
-|0.013
+| 0.013
-|0.019
+| 0.019
 |
 |-
-|2.3.5.7.11.13
+| 2.3.5.7.11.13
-|9801/9800, 140625/140608, 151263/151250, 196625/196608, 3327500/3326427
+| 9801/9800, 140625/140608, 151263/151250, 196625/196608, 3327500/3326427
-|[{{val|3072 4869 7133 8624 10627 11638}}]
+| {{mapping| 3072 4869 7133 8624 10627 11638 }}
-|0.006
+| 0.006
-|0.022
+| 0.022
 |
 |}
-==See also==
-*[[Equal-step tuning|Equal multiplications]] of MIDI-resolution units
+== See also ==
-**[[24edo]] (1mu tuning)
+* [[Equal-step tuning|Equal multiplications]] of MIDI-resolution units
-**[[48edo]] (2mu tuning)
+** [[24edo]] (1mu tuning)
-**[[96edo]] (3mu tuning)
+** [[48edo]] (2mu tuning)
-**[[192edo]] (4mu tuning)
+** [[96edo]] (3mu tuning)
-**[[384edo]] (5mu tuning)
+** [[192edo]] (4mu tuning)
-**[[768edo]] (6mu tuning)
+** [[384edo]] (5mu tuning)
-**[[1536edo]] (7mu tuning)
+** [[768edo]] (6mu tuning)
-**[[6144edo]] (9mu tuning)
+** [[1536edo]] (7mu tuning)
-**[[12288edo]] (10mu tuning)
+** [[6144edo]] (9mu tuning)
-**[[24576edo]] (11mu tuning)
+** [[12288edo]] (10mu tuning)
-**[[49152edo]] (12mu tuning)
+** [[24576edo]] (11mu tuning)
-**[[98304edo]] (13mu tuning)
+** [[49152edo]] (12mu tuning)
-**[[196608edo]] (14mu tuning)
+** [[98304edo]] (13mu tuning)
+** [[196608edo]] (14mu tuning)
 == Music ==
 ; [[Eliora]]
-* ''[https://www.youtube.com/watch?v=sksIgNTJ-XY Etude for Celtic Harp in Whoosh (Op. 3, No. 5)]'' (2023)
+* [https://www.youtube.com/watch?v=sksIgNTJ-XY ''Etude for Celtic Harp in Whoosh''] (2023)
 [[Category:Listen]]