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{{Wikipedia|Pythagorean tuning}} | {{Wikipedia| Pythagorean tuning }} | ||
The '''3-limit''' consists of all [[just intonation]] intervals whose [[Ratio|numerators and denominators]] are both products of the primes 2 and 3. Some examples of 3-limit intervals are [[3/2]], [[4/3]], [[9/8]]. All 3-limit intervals can be written as <math>2^a \cdot 3^b</math>, where ''a'' and ''b'' can be any (positive, negative or zero) integer. When octave-reduced, if b is non-zero, a and b are opposite signs. In other words, one number in the ratio is a power of 2 and the other number is a power of 3. Confining intervals to the 3-limit is known as [[Pythagorean tuning]], and the Pythagorean tuning used in Europe during the Middle Ages is the seed out of which grew the common-practice tradition of Western music, as well as genres derived from it. The 3-limit can be considered a [[Rank-2 temperament|rank-2]] [[temperament]] which [[Tempering out|tempers out]] no [[comma]]s. | |||
== Terminology == | |||
A 3-limit interval is also known as a Pythagorean interval. Recently, composers [[Catherine Lamb]] and [[Marc Sabat]] have adopted ''tertial'' for intervals of [[harmonic class|HC3]]{{citation needed}}, not to be confused with ''tertian'' which is the adjective associated with the third [[5L 2s|diatonic]] degree. | |||
== Edo approximation == | |||
[[Edo]]s which do relatively well at approximating 3-limit intervals can be found as the denominators of the convergents and semiconvergents of the [[wikipedia: Continued fraction|continued fraction]] for the logarithm base 2 of 3. These are {{EDOs| 1, 2, 3, 5, 7, 12, 17, 29, 41, 53, 94, 147, 200, 253, 306, 359, 665, … }} ({{OEIS|A206788}}) | |||
Another approach is to find edos which have more accurate approximation to 3 than all smaller edos. This results in {{EDOs|1, 2, 3, 5, 7, 12, 29, 41, 53, 200, 253, 306, 359, 665, 8286, 8951, 9616, 10281, 10946, 11611, 12276, 12941, 13606, 14271, 14936, 15601, 31867 }}, … ({{OEIS|A060528}}) | |||
A stricter approach is to find edos with an increasingly stronger [[consistent circle]] of 3/2. These are {{EDOs|1, 12, 53, 665, 190537, … }} (with strengths 1, 2, 3, 11, 28, … respectively) | |||
== Table of intervals == | |||
3-limit intervals up to [[odd-limit]] 19683: | 3-limit intervals up to [[odd-limit]] 19683: | ||
{| class="wikitable center-1 right-3" | {| class="wikitable center-1 right-3 center-6 center-7" | ||
|- | |- | ||
! Ratio | ! [[Ratio]] | ||
! [[Monzo]] | ! [[Monzo]] | ||
! Size ([[ | ! Size ([[Cent|¢]]) | ||
! colspan="2" | [[Kite's color notation|Color | ! colspan="2" | [[Kite's color notation|Color Name]] | ||
! colspan="2" | | ! colspan="2" | Diatonic Category | ||
|- | |- | ||
| [[1/1]] | | [[1/1]] | ||
| Line 22: | Line 29: | ||
| w1 | | w1 | ||
| wa unison | | wa unison | ||
| | | P1 | ||
| C | | C | ||
|- | |- | ||
| Line 30: | Line 37: | ||
| Lw1 | | Lw1 | ||
| lawa 1sn | | lawa 1sn | ||
| | | A1 | ||
| C# | | C# | ||
|- | |- | ||
| Line 38: | Line 45: | ||
| sw2 | | sw2 | ||
| sawa 2nd | | sawa 2nd | ||
| | | m2 | ||
| Db | | Db | ||
|- | |- | ||
| Line 46: | Line 53: | ||
| w2 | | w2 | ||
| wa 2nd | | wa 2nd | ||
| | | M2 | ||
| D | | D | ||
|- | |- | ||
| Line 54: | Line 61: | ||
| Lw2 | | Lw2 | ||
| lawa 2nd | | lawa 2nd | ||
| | | A2 | ||
| D# | | D# | ||
|- | |- | ||
| Line 62: | Line 69: | ||
| w3 | | w3 | ||
| wa 3rd | | wa 3rd | ||
| | | m3 | ||
| Eb | | Eb | ||
|- | |- | ||
| Line 70: | Line 77: | ||
| Lw3 | | Lw3 | ||
| lawa 3rd | | lawa 3rd | ||
| | | M3 | ||
| E | | E | ||
|- | |- | ||
| Line 78: | Line 85: | ||
| sw4 | | sw4 | ||
| sawa 4th | | sawa 4th | ||
| | | d4 | ||
| Fb | | Fb | ||
|- | |- | ||
| Line 86: | Line 93: | ||
| w4 | | w4 | ||
| wa 4th | | wa 4th | ||
| | | P4 | ||
| F | | F | ||
|- | |- | ||
| Line 94: | Line 101: | ||
| Lw4 | | Lw4 | ||
| lawa 4th | | lawa 4th | ||
| | | A4 | ||
| F# | | F# | ||
|- | |- | ||
| Line 102: | Line 109: | ||
| sw5 | | sw5 | ||
| sawa 5th | | sawa 5th | ||
| | | d5 | ||
| Gb | | Gb | ||
|- | |- | ||
| Line 110: | Line 117: | ||
| w5 | | w5 | ||
| wa 5th | | wa 5th | ||
| | | P5 | ||
| G | | G | ||
|- | |- | ||
| Line 118: | Line 125: | ||
| Lw5 | | Lw5 | ||
| lawa 5th | | lawa 5th | ||
| | | A5 | ||
| G# | | G# | ||
|- | |- | ||
| Line 126: | Line 133: | ||
| sw6 | | sw6 | ||
| sawa 6th | | sawa 6th | ||
| | | m6 | ||
| Ab | | Ab | ||
|- | |- | ||
| Line 134: | Line 141: | ||
| w6 | | w6 | ||
| wa 6th | | wa 6th | ||
| | | M6 | ||
| A | | A | ||
|- | |- | ||
| Line 142: | Line 149: | ||
| sw7 | | sw7 | ||
| sawa 7th | | sawa 7th | ||
| | | d7 | ||
| Bbb | | Bbb | ||
|- | |- | ||
| Line 150: | Line 157: | ||
| w7 | | w7 | ||
| wa 7th | | wa 7th | ||
| | | m7 | ||
| Bb | | Bb | ||
|- | |- | ||
| Line 158: | Line 165: | ||
| Lw7 | | Lw7 | ||
| lawa 7th | | lawa 7th | ||
| | | M7 | ||
| B | | B | ||
|- | |- | ||
| Line 166: | Line 173: | ||
| sw8 | | sw8 | ||
| sawa 8ve | | sawa 8ve | ||
| | | d8 | ||
| Cb | | Cb | ||
|- | |- | ||
| Line 174: | Line 181: | ||
| w8 | | w8 | ||
| wa 8ve | | wa 8ve | ||
| | | P8 | ||
| C | | C | ||
|} | |} | ||
== Music == | |||
; [[E8 Heterotic]] | |||
* [https://youtu.be/NPoyCQ7aYY8?si=bnAq4FJ7f8s3AagZ "Elements - Metal"] from ''Elements'' (2019–2020) | |||
; [[Francium]] | |||
* [https://www.youtube.com/watch?v=tzFK7uzAR1g ''Pythagorean Metal''] (2023) | |||
; [[John Doe]] | |||
* [https://m.youtube.com/watch?v=GF7lTvOQ9r8 ''Building (A New Sun)''] (2017) | |||
===== [[Charles Ives]] ===== | |||
[[Johnny Reinhard]]'s 2023 book, ''[https://www.visionedition.com/publication/the-transcendental-tuning-of-charles-ives/ The Transcendental Tuning of Charles Ives]'', lays the foundation for AFMM's realizations of some of Ives' works, employing chains of up to 29 perfect fifths. | |||
* [https://johnnyreinhard.bandcamp.com/album/charles-ives-string-quartet-2-by-flux-quartet-three-quartone-pieces-for-2-pianos-played-by-pierce-jonas-the-unanswered-question-universe-symphony-realized-by-reinhard-michael-thorne-three-page-so String Quartet #2, The Unanswered Question, Three-Page Sonata, Universe Symphony] | |||
* [https://johnnyreinhard.bandcamp.com/album/charles-ives-transcendental-concord-sonata-by-charles-ives-for-two-pianos-in-spiral-of-fifths-tuning-performed-by-pianists-gabriel-zucker-and-erika-dohi-american-festival-of-microtonal-music Concord Sonata] | |||
* [https://www.youtube.com/watch?v=V8HkPie8y08 The Unanswered Question] | |||
* [https://www.youtube.com/watch?v=OT2E13p3sLw Universe Symphony] | |||
; [[Peter Kosmorsky|Peter 'Rush' Kosmorsky]] | |||
* ''String Trio no. 2'' (2013) – [https://soundcloud.com/peter-rush-kosmorsky/string-trio-no-2-for-three-strings SoundCloud] | [http://micro.soonlabel.com/gene_ward_smith/Others/Kosmorsky/__String_Trio_no__2_by_Peter__Rush__Kosmorsky.mp3 play] – in [[Pythagorean17|Pythagorean[17]]] | |||
; [[Zhea Erose]] | |||
* [https://www.youtube.com/watch?v=ISHYKXPaL5o ''Circles of Indigo - Dreamsura''] (2023) | |||
== See also == | == See also == | ||
* [[Pythagorean tuning]] | |||
* [[Harmonic limit]] | * [[Harmonic limit]] | ||
* [[3-odd-limit]] | * [[3-odd-limit]] | ||
| Line 184: | Line 215: | ||
[[Category:3-limit| ]] <!-- main article --> | [[Category:3-limit| ]] <!-- main article --> | ||
[[Category:Rank 2]] | [[Category:Rank-2 temperaments]] | ||
Latest revision as of 16:58, 28 March 2026
The 3-limit consists of all just intonation intervals whose numerators and denominators are both products of the primes 2 and 3. Some examples of 3-limit intervals are 3/2, 4/3, 9/8. All 3-limit intervals can be written as [math]\displaystyle{ 2^a \cdot 3^b }[/math], where a and b can be any (positive, negative or zero) integer. When octave-reduced, if b is non-zero, a and b are opposite signs. In other words, one number in the ratio is a power of 2 and the other number is a power of 3. Confining intervals to the 3-limit is known as Pythagorean tuning, and the Pythagorean tuning used in Europe during the Middle Ages is the seed out of which grew the common-practice tradition of Western music, as well as genres derived from it. The 3-limit can be considered a rank-2 temperament which tempers out no commas.
Terminology
A 3-limit interval is also known as a Pythagorean interval. Recently, composers Catherine Lamb and Marc Sabat have adopted tertial for intervals of HC3[citation needed], not to be confused with tertian which is the adjective associated with the third diatonic degree.
Edo approximation
Edos which do relatively well at approximating 3-limit intervals can be found as the denominators of the convergents and semiconvergents of the continued fraction for the logarithm base 2 of 3. These are 1, 2, 3, 5, 7, 12, 17, 29, 41, 53, 94, 147, 200, 253, 306, 359, 665, … (OEIS: A206788)
Another approach is to find edos which have more accurate approximation to 3 than all smaller edos. This results in 1, 2, 3, 5, 7, 12, 29, 41, 53, 200, 253, 306, 359, 665, 8286, 8951, 9616, 10281, 10946, 11611, 12276, 12941, 13606, 14271, 14936, 15601, 31867, … (OEIS: A060528)
A stricter approach is to find edos with an increasingly stronger consistent circle of 3/2. These are 1, 12, 53, 665, 190537, … (with strengths 1, 2, 3, 11, 28, … respectively)
Table of intervals
3-limit intervals up to odd-limit 19683:
| Ratio | Monzo | Size (¢) | Color Name | Diatonic Category | ||
|---|---|---|---|---|---|---|
| 1/1 | [0⟩ | 0.000 | w1 | wa unison | P1 | C |
| 2187/2048 | [-11 7⟩ | 113.685 | Lw1 | lawa 1sn | A1 | C# |
| 256/243 | [8 -5⟩ | 90.225 | sw2 | sawa 2nd | m2 | Db |
| 9/8 | [-3 2⟩ | 203.910 | w2 | wa 2nd | M2 | D |
| 19683/16384 | [-14 9⟩ | 317.595 | Lw2 | lawa 2nd | A2 | D# |
| 32/27 | [5 -3⟩ | 294.135 | w3 | wa 3rd | m3 | Eb |
| 81/64 | [-6 4⟩ | 407.820 | Lw3 | lawa 3rd | M3 | E |
| 8192/6561 | [13 -8⟩ | 384.360 | sw4 | sawa 4th | d4 | Fb |
| 4/3 | [2 -1⟩ | 498.045 | w4 | wa 4th | P4 | F |
| 729/512 | [-9 6⟩ | 611.730 | Lw4 | lawa 4th | A4 | F# |
| 1024/729 | [10 -6⟩ | 588.270 | sw5 | sawa 5th | d5 | Gb |
| 3/2 | [-1 1⟩ | 701.955 | w5 | wa 5th | P5 | G |
| 6561/4096 | [-12 8⟩ | 815.640 | Lw5 | lawa 5th | A5 | G# |
| 128/81 | [7 -4⟩ | 792.180 | sw6 | sawa 6th | m6 | Ab |
| 27/16 | [-4 3⟩ | 905.865 | w6 | wa 6th | M6 | A |
| 32768/19683 | [15 -9⟩ | 882.405 | sw7 | sawa 7th | d7 | Bbb |
| 16/9 | [4 -2⟩ | 996.090 | w7 | wa 7th | m7 | Bb |
| 243/128 | [-7 5⟩ | 1109.775 | Lw7 | lawa 7th | M7 | B |
| 4096/2187 | [12 -7⟩ | 1086.315 | sw8 | sawa 8ve | d8 | Cb |
| 2/1 | [1⟩ | 1200.000 | w8 | wa 8ve | P8 | C |
Music
- "Elements - Metal" from Elements (2019–2020)
- Pythagorean Metal (2023)
- Building (A New Sun) (2017)
Charles Ives
Johnny Reinhard's 2023 book, The Transcendental Tuning of Charles Ives, lays the foundation for AFMM's realizations of some of Ives' works, employing chains of up to 29 perfect fifths.
- String Quartet #2, The Unanswered Question, Three-Page Sonata, Universe Symphony
- Concord Sonata
- The Unanswered Question
- Universe Symphony
- String Trio no. 2 (2013) – SoundCloud | play – in Pythagorean[17]