User:UnbihexiumFan/Temperaments: Difference between revisions
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A collection of temperaments that I have found that may or may not have yet been discovered. | A collection of temperaments that I have found that may or may not have yet been discovered. If you find any inaccuracies feel free to point them out on the [[User talk:UnbihexiumFan/Temperaments|talk page]]. | ||
== Stearnsmic 7/4-period temperaments == | == Stearnsmic 7/4-period temperaments == | ||
| Line 102: | Line 102: | ||
'''Bolded''' ratios are 7/4-reduced harmonics up to 21. | '''Bolded''' ratios are 7/4-reduced harmonics up to 21. | ||
=== | === 7/4.2.3.5 extension === | ||
Each half-octave can be equated with [[7/5]]~[[10/7]], tempering out [[50/49]]. While the resulting temperament is not very accurate, it gives a fairly simple mapping of pental thirds. It has a [[comma basis]] of [[50/49]] and [[245/243]]. This temperament is equivalent to [[hedgehog]] but with a 7/4 period. The 11th harmonic can be added by equating [[10/9]] with [[11/10]], tempering out [[100/99]]. The resulting temperament has subgroup 7/4.2.3.5.11 and comma basis [[50/49]], [[100/99]], and [[55/54]]. | |||
Interval chain: | |||
{| class="wikitable" | |||
! # Gens | |||
! Cents<ref name="SSW2">Optimal generator from the [https://sevish.com/scaleworkshop Sevish Scale Workshop], subgroup given as 7/4.2.3.5/4.11/10</ref> | |||
! Approximate ratios | |||
! # Gens | |||
! Cents<ref name="SSW2" /> | |||
! Approximate ratios | |||
|- | |||
| +0 | |||
| 0.0 | |||
| '''[[1/1]]''' | |||
| -0 | |||
| 968.83 | |||
| '''[[7/4]]''' | |||
|- | |||
| +1 | |||
| 700.10 | |||
| [[3/2]] | |||
| -1 | |||
| 268.73 | |||
| [[7/6]], [[25/21]], [[33/28]] | |||
|- | |||
| +2 | |||
| 431.37 | |||
| [[9/7]], [[14/11]] | |||
| -2 | |||
| 537.46 | |||
| [[49/36]], [[11/8]], [[15/11]], [[25/18]], [[27/20]] | |||
|- | |||
| +3 | |||
| 162.64 | |||
| [[10/9]], [[11/10]], [[12/11]] | |||
| -3 | |||
| 806.18 | |||
| [[35/22]] | |||
|- | |||
| +4 | |||
| 862.74 | |||
| [[5/3]] | |||
| -4 | |||
| 106.09 | |||
| [[21/20]], [[15/14]], [[35/33]] | |||
|- | |||
| +5 | |||
| 594.01 | |||
| [[10/7]], [[7/5]] | |||
| -5 | |||
| 374.81 | |||
| [[5/4]], [[27/22]] | |||
|- | |||
| +6 | |||
| 325.28 | |||
| [[6/5]], [[11/9]], [[40/33]] | |||
| -6 | |||
| 643.54 | |||
| [[35/24]] | |||
|- | |||
| +7 | |||
| 56.56 | |||
| [[36/35]], [[22/21]], [[28/27]], [[56/55]] | |||
| -7 | |||
| 912.27 | |||
| [[27/16]], [[55/32]] | |||
|- | |||
| +8 | |||
| 756.65 | |||
| [[11/7]], [[14/9]], [[54/35]] | |||
| -8 | |||
| 212.17 | |||
| [[9/8]] | |||
|- | |||
| +9 | |||
| 487.93 | |||
| [[4/3]], [[33/25]] | |||
| -9 | |||
| 480.90 | |||
| [[21/16]] | |||
|- | |||
| +10 | |||
| 219.20 | |||
| '''[[8/7]]''' | |||
| -10 | |||
| 749.63 | |||
| [[49/32]], [[25/16]] | |||
|- | |||
| +11 | |||
| 919.30 | |||
| '''[[12/7]]''' | |||
| -11 | |||
| 49.53 | |||
| [[49/48]], [[25/24]], [[33/32]] | |||
|} | |||
'''Bolded''' ratios are 7/4-reduced harmonics up to 21. The 7/4-reduced 5th harmonic, [[80/49]], is found at +15 generators, and the 7/4-reduced 11th harmonic, [[2816/2401]], is found at +28 generators. | |||
[[18ed7/4]] provides a good tuning for this temperament. | |||
=== 7/4.2.3.11/5.13.17 extension === | |||
The 17th harmonic can be added by equating [[17/12]] and [[24/17]] with the half-octave, tempering [[442/441]], the 13th harmonic can be added by equating [[27/26]] and [[28/27]], tempering [[729/728]], and the interval [[11/5]] can be added by equating [[54/49]] with [[11/10]], tempering out [[540/539]]. This provides a high-accuracy temperament with a [[comma basis]] of 442/441, 729/728, 289/288, and 540/539. | The 17th harmonic can be added by equating [[17/12]] and [[24/17]] with the half-octave, tempering [[442/441]], the 13th harmonic can be added by equating [[27/26]] and [[28/27]], tempering [[729/728]], and the interval [[11/5]] can be added by equating [[54/49]] with [[11/10]], tempering out [[540/539]]. This provides a high-accuracy temperament with a [[comma basis]] of 442/441, 729/728, 289/288, and 540/539. | ||
Interval chain: | |||
{| class="wikitable" | {| class="wikitable" | ||
! # Gens | ! # Gens | ||
! Cents<ref name="SSW" | ! Cents<ref name="SSW" /> | ||
! Approximate ratios | ! Approximate ratios | ||
! # Gens | ! # Gens | ||
| Line 263: | Line 368: | ||
'''Bolded''' ratios are 7/4-reduced harmonics up to 21. The 7/4-reduced 17th harmonic, [[17408/16807]], is found at +36 generators. | '''Bolded''' ratios are 7/4-reduced harmonics up to 21. The 7/4-reduced 17th harmonic, [[17408/16807]], is found at +36 generators. | ||
[[29ed7/4]] provides a good tuning for this temperament. | |||
== 243/242+2079/2048-based temperaments == | |||
These temperaments temper out the rastma, [[243/242]], and an unnamed comma [[2079/2048]]. They are similar to [[mohajira]], but they can be tuned sharper to provide a better perfect fifth. In fact, mohajira is one possible full 11-limit extension, though this will focus on tunings sharper than mohajira. | |||
Interval chain in the 2.3.7.11-limit: | |||
{| class="wikitable" | |||
! Note name | |||
! # Gens | |||
! Cents | |||
! Approximate ratios | |||
! Note name | |||
! # Gens | |||
! Cents | |||
! Approximate ratios | |||
|- | |||
| C | |||
| +0 | |||
| 0.00 | |||
| [[1/1]] | |||
| -0 | |||
| C | |||
| 1200.00 | |||
| [[2/1]] | |||
|- | |||
| E{{demiflat}} | |||
| +1 | |||
| 349.08 | |||
| [[11/9]]~[[27/22]] | |||
| -1 | |||
| A{{demiflat}} | |||
| 850.92 | |||
| [[18/11]]~[[44/27]] | |||
|- | |||
| G | |||
| +2 | |||
| 698.15 | |||
| '''[[3/2]]''' | |||
| -2 | |||
| F | |||
| 501.85 | |||
| [[4/3]] | |||
|- | |||
| B{{demiflat}} | |||
| +3 | |||
| 1047.23 | |||
| [[11/6]] | |||
| -3 | |||
| D{{demiflat}} | |||
| 152.77 | |||
| [[12/11]] | |||
|- | |||
| D | |||
| +4 | |||
| 196.30 | |||
| '''[[9/8]]''' | |||
| -4 | |||
| B{{flat}} | |||
| 1003.7 | |||
| [[16/9]] | |||
|- | |||
| F{{demisharp}} | |||
| +5 | |||
| 545.38 | |||
| '''[[11/8]]''' | |||
| -5 | |||
| G{{demiflat}} | |||
| 654.62 | |||
| [[16/11]] | |||
|- | |||
| A | |||
| +6 | |||
| 894.46 | |||
| [[27/16]] | |||
| -6 | |||
| E{{flat}} | |||
| 305.54 | |||
| [[32/27]] | |||
|- | |||
| C{{demisharp}} | |||
| +7 | |||
| 43.53 | |||
| [[33/32]]~[[64/63]] | |||
| -7 | |||
| C{{demiflat}} | |||
| 1156.47 | |||
| | |||
|- | |||
| E | |||
| +8 | |||
| 392.61 | |||
| [[81/64]] | |||
| -8 | |||
| A{{flat}} | |||
| 807.39 | |||
| | |||
|- | |||
| G{{demisharp}} | |||
| +9 | |||
| 741.68 | |||
| [[32/21]] | |||
| -9 | |||
| F{{demiflat}} | |||
| 458.32 | |||
| '''[[21/16]]''' | |||
|- | |||
| B | |||
| +10 | |||
| 1090.76 | |||
| | |||
| -10 | |||
| D{{flat}} | |||
| 109.24 | |||
| | |||
|- | |||
| D{{demisharp}} | |||
| +11 | |||
| 239.84 | |||
| [[8/7]] | |||
| -11 | |||
| B{{sesquiflat}} | |||
| 960.16 | |||
| '''[[7/4]]''' | |||
|- | |||
| F{{sharp}} | |||
| +12 | |||
| 588.91 | |||
| | |||
| -12 | |||
| G{{flat}} | |||
| 611.09 | |||
| | |||
|- | |||
| A{{demisharp}} | |||
| +13 | |||
| 937.99 | |||
| [[12/7]] | |||
| -13 | |||
| E{{sesquiflat}} | |||
| 262.01 | |||
| [[7/6]] | |||
|- | |||
| C{{sharp}} | |||
| +14 | |||
| 87.06 | |||
| [[22/21]] | |||
| -14 | |||
| C{{flat}} | |||
| 1112.94 | |||
| [[21/11]] | |||
|- | |||
| E{{demisharp}} | |||
| +15 | |||
| 436.14 | |||
| [[9/7]] | |||
| -15 | |||
| A{{sesquiflat}} | |||
| 763.86 | |||
| [[14/9]] | |||
|- | |||
| G{{sharp}} | |||
| +16 | |||
| 785.22 | |||
| [[11/7]] | |||
| -16 | |||
| F{{flat}} | |||
| 414.78 | |||
| [[14/11]] | |||
|- | |||
| B{{demisharp}} | |||
| +17 | |||
| 1134.29 | |||
| [[27/14]] | |||
| -17 | |||
| D{{sesquiflat}} | |||
| 65.71 | |||
| [[28/27]] | |||
|- | |||
| D{{sharp}} | |||
| +18 | |||
| 283.37 | |||
| [[33/28]] | |||
| -18 | |||
| B{{flat2}} | |||
| 916.63 | |||
| | |||
|} | |||
'''Bolded''' ratios are octave-reduced harmonics up to 21. | |||
=== No-5's 19-limit extension === | |||
While the major third is too sharp to be seen as [[5/4]], it can be seen as [[24/19]] or [[64/51]]. Treating it equal to both tempers out [[513/512]] and [[4131/4096]], providing a comma basis of [[2057/2052]], [[513/512]], [[154/153]], and [[243/242]]. The 17th harmonic is mapped to the minor second (-10 generators, D{{flat}} on C) and the 19th harmonic is mapped to the minor third (-6 generators, E{{flat}} on C). The 13th harmonic can be added by setting [[28/27]] equal to [[27/26]], tempering out [[729/728]]. This maps the 13th harmonic, [[13/8]], to the sesqui-augmented fifth (+23 generators, G{{sesquisharp}} on C). | |||