Pseudo-semaphore: Difference between revisions
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Pseudo-semaphore is a weird temperament in which the third harmonic does not have a single consistent mapping. If you want to force it into the regular mapping paradigm you have to think of it as a 2.3.3'.7 temperament. | '''Pseudo-semaphore''' is a weird temperament in which the third harmonic does not have a single consistent mapping. If you want to force it into the regular mapping paradigm you have to think of it as a 2.3.3'.7 temperament. | ||
It's called "pseudo-semaphore" because it has the same MOS structure as [[ | It's called "pseudo-semaphore" because it has the same MOS structure as [[semaphore]], but [[49/48]] is not tempered out. Perhaps it's better to think of it as [[superpyth]] in which the 4/3 generator has been split in half forming a weird interval that's neither [[8/7]] nor [[7/6]]. | ||
==Interval chain== | == Interval chain == | ||
{| class="wikitable" | {| class="wikitable" | ||
|- | |- | ||
| 204. | |||
| 448. | |||
| 692. | |||
| 936. | |||
| 1180. | |||
| 224. | |||
| 468. | |||
| 712. | |||
| 956. | |||
| 0. | |||
| 244. | |||
| 488. | |||
| 732. | |||
| 976. | |||
| 20. | |||
| 264. | |||
| 508. | |||
| 752. | |||
| 996. | |||
|- | |- | ||
| 9/8 | |||
| 9/7 | |||
| 3/2 (flat) | |||
| 12/7 | |||
| | |||
| 9/8~8/7 | |||
| | |||
| 3/2 (sharp) | |||
| | |||
| 1/1 | |||
| | |||
| 4/3 (flat) | |||
| | |||
| 7/4~16/9 | |||
| | |||
| 7/6 | |||
| 4/3 (sharp) | |||
| 14/9 | |||
| 16/9 | |||
|} | |} | ||
==MOSes== | == MOSes == | ||
===5-note (LLLLs, proper)=== | === 5-note (LLLLs, proper) === | ||
The 5-note MOS is not much use because only one of the two different mappings shows up. You'd be better off using [[ | |||
The 5-note MOS is not much use because only one of the two different mappings shows up. You'd be better off using [[semaphore]][5] or [[superpyth]][5] (or [[5edo]]). | |||
{| class="wikitable" | {| class="wikitable" | ||
|- | |- | ||
| Small ("minor") interval | |||
| 224. | |||
| 468. | |||
| 712. | |||
| 956. | |||
|- | |- | ||
| JI intervals represented | |||
| 9/8~8/7 | |||
| | |||
| 3/2 | |||
| | |||
|- | |- | ||
| Large ("major") interval | |||
| 244. | |||
| 488. | |||
| 732. | |||
| 976. | |||
|- | |- | ||
| JI intervals represented | |||
| | |||
| 4/3 | |||
| | |||
| 7/4~16/9 | |||
|} | |} | ||
===9-note (LLsLsLsLs, improper)=== | === 9-note (LLsLsLsLs, improper) === | ||
Here's where all the action begins. Note that this nine-note scale contains nine 4/ | |||
Here's where all the action begins. Note that this nine-note scale contains nine [[4/3]]s and nine [[3/2]]s. The only way this is possible with a single mapping for 3 is an equal temperament, and all of these 4/3s and 3/2s are much more accurate than in [[9edo]]. | |||
{| class="wikitable" | {| class="wikitable" | ||
|- | |- | ||
| Small ("minor") interval | |||
| 20. | |||
| 244. | |||
| 264. | |||
| 488. | |||
| 508. | |||
| 732. | |||
| 752. | |||
| 976. | |||
|- | |- | ||
| JI intervals represented | |||
| | |||
| | |||
| 7/6 | |||
| 4/3 (flat) | |||
| 4/3 (sharp) | |||
| | |||
| 14/9 | |||
| 7/4~16/9 | |||
|- | |- | ||
| Large ("major") interval | |||
| 224. | |||
| 448. | |||
| 468. | |||
| 692. | |||
| 712. | |||
| 936. | |||
| 956. | |||
| 1180. | |||
|- | |- | ||
| JI intervals represented | |||
| 9/8~8/7 | |||
| 9/7 | |||
| | |||
| 3/2 (flat) | |||
| 3/2 (sharp) | |||
| 12/7 | |||
| | |||
| | |||
|} | |} | ||
[[Category:Temperament]] | |||
Revision as of 00:08, 2 January 2021
Pseudo-semaphore is a weird temperament in which the third harmonic does not have a single consistent mapping. If you want to force it into the regular mapping paradigm you have to think of it as a 2.3.3'.7 temperament.
It's called "pseudo-semaphore" because it has the same MOS structure as semaphore, but 49/48 is not tempered out. Perhaps it's better to think of it as superpyth in which the 4/3 generator has been split in half forming a weird interval that's neither 8/7 nor 7/6.
Interval chain
| 204. | 448. | 692. | 936. | 1180. | 224. | 468. | 712. | 956. | 0. | 244. | 488. | 732. | 976. | 20. | 264. | 508. | 752. | 996. |
| 9/8 | 9/7 | 3/2 (flat) | 12/7 | 9/8~8/7 | 3/2 (sharp) | 1/1 | 4/3 (flat) | 7/4~16/9 | 7/6 | 4/3 (sharp) | 14/9 | 16/9 |
MOSes
5-note (LLLLs, proper)
The 5-note MOS is not much use because only one of the two different mappings shows up. You'd be better off using semaphore[5] or superpyth[5] (or 5edo).
| Small ("minor") interval | 224. | 468. | 712. | 956. |
| JI intervals represented | 9/8~8/7 | 3/2 | ||
| Large ("major") interval | 244. | 488. | 732. | 976. |
| JI intervals represented | 4/3 | 7/4~16/9 |
9-note (LLsLsLsLs, improper)
Here's where all the action begins. Note that this nine-note scale contains nine 4/3s and nine 3/2s. The only way this is possible with a single mapping for 3 is an equal temperament, and all of these 4/3s and 3/2s are much more accurate than in 9edo.
| Small ("minor") interval | 20. | 244. | 264. | 488. | 508. | 732. | 752. | 976. |
| JI intervals represented | 7/6 | 4/3 (flat) | 4/3 (sharp) | 14/9 | 7/4~16/9 | |||
| Large ("major") interval | 224. | 448. | 468. | 692. | 712. | 936. | 956. | 1180. |
| JI intervals represented | 9/8~8/7 | 9/7 | 3/2 (flat) | 3/2 (sharp) | 12/7 |