Sensi extensions: Difference between revisions
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[[Sensi]] has multiple competing [[extension]]s to the [[11-limit]]. The simplest [[7-limit]] [[comma]]s of sensi are [[126/125|starling (126/125)]] and [[245/243|sensamagic (245/243)]], and it can be viewed as the merge of the two corresponding [[rank-3 temperament]]s. These rank-3 temperaments are associated with distinct paths to the 11-limit. On one hand, [[starling]] strongly suggests tempering out [[176/175]], leading to thrush ({126/125, 176/175}). Notice the factorization 126/125 = (176/175)(441/440). On the other, [[sensamagic]] strongly suggests tempering out [[385/384]], leading to undecimal sensamagic ({245/243, 385/384}). Notice the factorization 245/243 = (385/384)(896/891). Taking either path for sensi leads us to one of the following entries: | [[Sensi]] has multiple competing [[extension]]s to the [[11-limit]]. The simplest [[7-limit]] [[comma]]s of sensi are [[126/125|starling (126/125)]] and [[245/243|sensamagic (245/243)]], and it can be viewed as the merge of the two corresponding [[rank-3 temperament]]s. These rank-3 temperaments are associated with distinct paths to the 11-limit. On one hand, [[starling]] strongly suggests tempering out [[176/175]], leading to thrush ({126/125, 176/175}). Notice the factorization 126/125 = (176/175)(441/440). On the other, [[sensamagic]] strongly suggests tempering out [[385/384]], leading to undecimal sensamagic ({245/243, 385/384}). Notice the factorization 245/243 = (385/384)(896/891). Taking either path for sensi leads us to one of the following entries: | ||
* '''Sensor''' (19 & 27) – tempering out 126/125, 245/243, 385/384 | |||
* '''Sensor''' (19 & 27) | * '''Sensus''' (19e & 27e) – tempering out 126/125, 176/175, 245/243 | ||
* '''Sensus''' (19e & 27e) | |||
The two unite in [[46edo|46et]], where both 176/175 and 385/384, as well as their sum, [[121/120]], are tempered out. They can be extended to the 13- and 17-limit naturally by adding [[91/90]] and [[154/153]] to the comma list in this order. Then the generator represents [[9/7]], [[13/10]], and [[22/17]]. | The two unite in [[46edo|46et]], where both 176/175 and 385/384, as well as their sum, [[121/120]], are tempered out. They can be extended to the 13- and 17-limit naturally by adding [[91/90]] and [[154/153]] to the comma list in this order. Then the generator represents [[9/7]], [[13/10]], and [[22/17]]. | ||
In addition, there are some low-complexity low-accuracy entries: | In addition, there are some low-complexity low-accuracy entries: | ||
* '''Sensis''' (19 & 27e) | * '''Sensis''' (19 & 27e) – tempering out 56/55, 100/99, 245/243 | ||
* '''Sensa''' (19e & 27) | * '''Sensa''' (19e & 27) – tempering out 55/54, 77/75, 99/98 | ||
Another possible path which relates a sense of compromise is to temper out [[121/120]], leading to bisensi. This has the effect of slicing the octave in two, and is supported by [[38edo|38df]], 46, and [[54edo|54c]]. | Another possible path which relates a sense of compromise is to temper out [[121/120]], leading to bisensi. This has the effect of slicing the octave in two, and is supported by [[38edo|38df]], 46, and [[54edo|54c]]. | ||
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{| class="wikitable right-1 right-2" | {| class="wikitable right-1 right-2" | ||
|- | |- | ||
! rowspan=2 | | ! rowspan=2 | # | ||
! rowspan=2 | Cents* | ! rowspan=2 | Cents<sup>*</sup> | ||
! colspan=5 | Approximate Ratios | ! colspan=5 | Approximate Ratios | ||
|- | |- | ||
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| | | | ||
|} | |} | ||
< | |||
: <sup>*</sup> in 2.3.5.7.13.17/11 subgroup CTE tuning | |||
== Tuning spectra == | == Tuning spectra == | ||
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{| class="wikitable center-1 center-2" | {| class="wikitable center-1 center-2" | ||
|- | |- | ||
! [[Eigenmonzo|Eigenmonzo<br | ! [[Eigenmonzo|Eigenmonzo<br>(Unchanged-interval]]) | ||
! Generator (¢) | ! Generator (¢) | ||
! Comments | ! Comments | ||
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{| class="wikitable center-1 center-2" | {| class="wikitable center-1 center-2" | ||
|- | |- | ||
! Eigenmonzo<br | ! Eigenmonzo<br>(Unchanged-interval) | ||
! Generator (¢) | ! Generator (¢) | ||
! Comments | ! Comments | ||
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{| class="wikitable center-1 center-2" | {| class="wikitable center-1 center-2" | ||
|- | |- | ||
! Eigenmonzo<br | ! Eigenmonzo<br>(Unchanged-interval) | ||
! Generator (¢) | ! Generator (¢) | ||
! Comments | ! Comments | ||
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{| class="wikitable center-1 center-2" | {| class="wikitable center-1 center-2" | ||
|- | |- | ||
! Eigenmonzo<br | ! Eigenmonzo<br>(Unchanged-interval) | ||
! Generator (¢) | ! Generator (¢) | ||
! Comments | ! Comments | ||
Revision as of 20:10, 8 October 2024
Sensi has multiple competing extensions to the 11-limit. The simplest 7-limit commas of sensi are starling (126/125) and sensamagic (245/243), and it can be viewed as the merge of the two corresponding rank-3 temperaments. These rank-3 temperaments are associated with distinct paths to the 11-limit. On one hand, starling strongly suggests tempering out 176/175, leading to thrush ({126/125, 176/175}). Notice the factorization 126/125 = (176/175)(441/440). On the other, sensamagic strongly suggests tempering out 385/384, leading to undecimal sensamagic ({245/243, 385/384}). Notice the factorization 245/243 = (385/384)(896/891). Taking either path for sensi leads us to one of the following entries:
- Sensor (19 & 27) – tempering out 126/125, 245/243, 385/384
- Sensus (19e & 27e) – tempering out 126/125, 176/175, 245/243
The two unite in 46et, where both 176/175 and 385/384, as well as their sum, 121/120, are tempered out. They can be extended to the 13- and 17-limit naturally by adding 91/90 and 154/153 to the comma list in this order. Then the generator represents 9/7, 13/10, and 22/17.
In addition, there are some low-complexity low-accuracy entries:
- Sensis (19 & 27e) – tempering out 56/55, 100/99, 245/243
- Sensa (19e & 27) – tempering out 55/54, 77/75, 99/98
Another possible path which relates a sense of compromise is to temper out 121/120, leading to bisensi. This has the effect of slicing the octave in two, and is supported by 38df, 46, and 54c.
Interval chain
In the following table, odd harmonics and subharmonics 1–21 are in bold.
| # | Cents* | Approximate Ratios | ||||
|---|---|---|---|---|---|---|
| Sensi | Sensor | Sensis | Sensus | Sensa | ||
| 0 | 0.0 | 1/1 | ||||
| 1 | 443.4 | 9/7, 13/10, 22/17 | 14/11, 17/13 | |||
| 2 | 886.8 | 5/3 | 17/10, 18/11, 22/13, 28/17 | |||
| 3 | 130.2 | 13/12, 14/13, 15/14 | 12/11, 17/16 | 11/10, 18/17 | ||
| 4 | 573.6 | 7/5, 18/13 | 11/8, 24/17 | 15/11, 17/12 | ||
| 5 | 1017.0 | 9/5 | 20/11 | 11/6, 30/17 | ||
| 6 | 260.4 | 7/6, 15/13 | 13/11, 20/17 | |||
| 7 | 703.8 | 3/2 | 26/17 | |||
| 8 | 1147.2 | 27/14, 35/18 | ||||
| 9 | 390.6 | 5/4 | 14/11 | |||
| 10 | 834.0 | 13/8, 21/13 | 18/11, 28/17 | |||
| 11 | 77.4 | 21/20, 25/24 | 18/17 | 17/16 | ||
| 12 | 520.8 | 27/20 | 15/11 | 11/8 | ||
| 13 | 964.2 | 7/4 | 30/17 | |||
| 14 | 207.6 | 9/8 | 17/15 | |||
| 15 | 651.0 | 35/24 | 16/11 | 22/15 | ||
| 16 | 1094.5 | 15/8 | 32/17 | 17/9 | ||
| 17 | 337.9 | 39/32 | 11/9, 17/14 | |||
| 18 | 781.3 | 25/16 | 11/7 | |||
| 19 | 24.7 | 49/48, 65/64, 81/80 | ||||
| 20 | 468.1 | 21/16 | 17/13 | |||
| 21 | 911.5 | 27/16 | 17/10, 22/13 | |||
| 22 | 154.9 | 35/32 | 12/11 | 11/10 | ||
| 23 | 598.3 | 45/32 | 24/17 | 17/12 | ||
| 24 | 1041.7 | 117/64 | 20/11 | 11/6 | ||
| 25 | 285.1 | 75/64 | 13/11, 20/17 | |||
| 26 | 728.5 | 49/32 | 26/17 | |||
| 27 | 1171.9 | 63/32 | ||||
| 28 | 415.3 | 81/64 | 14/11 | |||
| 29 | 858.7 | 105/64 | 18/11, 28/17 | |||
| 30 | 102.1 | 135/128 | 18/17 | 17/16 | ||
| 31 | 545.5 | 175/128 | 15/11 | 11/8 | ||
| 32 | 988.9 | 225/128 | 30/17 | |||
- * in 2.3.5.7.13.17/11 subgroup CTE tuning
Tuning spectra
Sensor
Gencom: [2 9/7; 91/90 126/125 169/168 385/384]
Gencom mapping: [⟨1 -1 -1 -2 9 0], ⟨0 7 9 13 -15 10]]
| Eigenmonzo (Unchanged-interval) |
Generator (¢) | Comments |
|---|---|---|
| 9/7 | 435.084 | |
| 15/14 | 439.814 | |
| 18/13 | 440.846 | |
| 15/13 | 441.290 | |
| 6/5 | 442.179 | |
| 14/13 | 442.766 | |
| 5/4 | 442.924 | 5-odd-limit minimax |
| 16/15 | 443.017 | |
| 11/10 | 443.125 | |
| 15/11 | 443.127 | |
| 4/3 | 443.136 | 15-odd-limit minimax |
| 11/9 | 443.193 | |
| 12/11 | 443.211 | |
| 11/8 | 443.245 | |
| 14/11 | 443.482 | 11-odd-limit minimax |
| 10/9 | 443.519 | 9- and 13-odd-limit minimax |
| 13/11 | 443.568 | |
| 8/7 | 443.756 | 7-odd-limit minimax |
| 16/13 | 444.053 | |
| 7/6 | 444.478 | |
| 7/5 | 445.628 | |
| 13/12 | 446.191 | |
| 13/10 | 454.214 |
Sensis
Gencom: [2 9/7; 56/55 78/77 91/90 100/99]
Gencom mapping: [⟨1 -1 -1 -2 2 0], ⟨0 7 9 13 4 10]]
| Eigenmonzo (Unchanged-interval) |
Generator (¢) | Comments |
|---|---|---|
| 9/7 | 435.084 | |
| 11/8 | 437.829 | |
| 15/14 | 439.814 | |
| 18/13 | 440.846 | |
| 15/13 | 441.290 | |
| 6/5 | 442.179 | |
| 14/13 | 442.766 | |
| 5/4 | 442.924 | 5-odd-limit minimax |
| 16/15 | 443.017 | |
| 4/3 | 443.136 | |
| 10/9 | 443.519 | 9-odd-limit minimax |
| 8/7 | 443.756 | 7- and 11-odd-limit minimax |
| 16/13 | 444.053 | 13- and 15-odd-limit minimax |
| 7/6 | 444.478 | |
| 15/11 | 444.746 | |
| 11/9 | 445.259 | |
| 7/5 | 445.628 | |
| 13/12 | 446.191 | |
| 14/11 | 446.390 | |
| 11/10 | 446.999 | |
| 13/11 | 448.202 | |
| 12/11 | 450.212 | |
| 13/10 | 454.214 |
Sensus
Gencom: [2 9/7; 91/90 126/125 169/168 352/351]
Gencom mapping: [⟨1 -1 -1 -2 -8 0], ⟨0 7 9 13 31 10]]
| Eigenmonzo (Unchanged-interval) |
Generator (¢) | Comments |
|---|---|---|
| 9/7 | 435.084 | |
| 15/14 | 439.814 | |
| 18/13 | 440.846 | |
| 15/13 | 441.290 | |
| 6/5 | 442.179 | |
| 14/13 | 442.766 | |
| 5/4 | 442.924 | 5-odd-limit minimax |
| 16/15 | 443.017 | |
| 4/3 | 443.136 | |
| 13/11 | 443.371 | |
| 14/11 | 443.472 | |
| 10/9 | 443.519 | 9-odd-limit minimax |
| 11/8 | 443.591 | |
| 12/11 | 443.723 | |
| 8/7 | 443.756 | 7- and 11-odd-limit minimax |
| 11/10 | 443.864 | |
| 11/9 | 443.965 | |
| 16/13 | 444.053 | 13- and 15-odd-limit minimax |
| 15/11 | 444.203 | |
| 7/6 | 444.478 | |
| 7/5 | 445.628 | |
| 13/12 | 446.191 | |
| 13/10 | 454.214 |
Sensa
Gencom: [2 9/7; 55/54 66/65 77/75 143/140]
Gencom mapping: [⟨1 -1 -1 -2 -1 0], ⟨0 7 9 13 12 10]]
| Eigenmonzo (Unchanged-interval) |
Generator (¢) | Comments |
|---|---|---|
| 14/11 | 417.508 | |
| 11/9 | 426.296 | |
| 15/11 | 434.238 | |
| 9/7 | 435.084 | |
| 15/14 | 439.814 | |
| 18/13 | 440.846 | |
| 15/13 | 441.290 | |
| 6/5 | 442.179 | |
| 14/13 | 442.766 | |
| 5/4 | 442.924 | 5-odd-limit minimax |
| 16/15 | 443.017 | |
| 4/3 | 443.136 | |
| 10/9 | 443.519 | 9-odd-limit minimax |
| 8/7 | 443.756 | 7- and 11-odd-limit minimax |
| 16/13 | 444.053 | 13- and 15-odd-limit minimax |
| 7/6 | 444.478 | |
| 7/5 | 445.628 | |
| 11/8 | 445.943 | |
| 13/12 | 446.191 | |
| 12/11 | 449.873 | |
| 13/10 | 454.214 | |
| 11/10 | 455.001 | |
| 13/11 | 455.395 |