7L 2s
| ↖ 6L 1s | ↑ 7L 1s | 8L 1s ↗ |
| ← 6L 2s | 7L 2s | 8L 2s → |
| ↙ 6L 3s | ↓ 7L 3s | 8L 3s ↘ |
┌╥╥╥╥┬╥╥╥┬┐ │║║║║│║║║││ │││││││││││ └┴┴┴┴┴┴┴┴┴┘
sLLLsLLLL
7L 2s, named armotonic in TAMNAMS, is a 2/1-equivalent (octave-equivalent) moment of symmetry scale containing 7 large steps and 2 small steps, repeating every octave. Generators that produce this scale range from 666.7 ¢ to 685.7 ¢, or from 514.3 ¢ to 533.3 ¢. Scales of this form are strongly associated with Armodue theory, as applied to septimal mavila and Hornbostel temperaments.
Name
The TAMNAMS name for this pattern is armotonic, in reference to Armodue theory. Superdiatonic is also in use.
Intervals
- This article assumes TAMNAMS for naming step ratios, mossteps, and mosdegrees.
| Intervals | Steps subtended |
Range in cents | ||
|---|---|---|---|---|
| Generic | Specific | Abbrev. | ||
| 0-armstep | Perfect 0-armstep | P0arms | 0 | 0.0 ¢ |
| 1-armstep | Minor 1-armstep | m1arms | s | 0.0 ¢ to 133.3 ¢ |
| Major 1-armstep | M1arms | L | 133.3 ¢ to 171.4 ¢ | |
| 2-armstep | Minor 2-armstep | m2arms | L + s | 171.4 ¢ to 266.7 ¢ |
| Major 2-armstep | M2arms | 2L | 266.7 ¢ to 342.9 ¢ | |
| 3-armstep | Minor 3-armstep | m3arms | 2L + s | 342.9 ¢ to 400.0 ¢ |
| Major 3-armstep | M3arms | 3L | 400.0 ¢ to 514.3 ¢ | |
| 4-armstep | Perfect 4-armstep | P4arms | 3L + s | 514.3 ¢ to 533.3 ¢ |
| Augmented 4-armstep | A4arms | 4L | 533.3 ¢ to 685.7 ¢ | |
| 5-armstep | Diminished 5-armstep | d5arms | 3L + 2s | 514.3 ¢ to 666.7 ¢ |
| Perfect 5-armstep | P5arms | 4L + s | 666.7 ¢ to 685.7 ¢ | |
| 6-armstep | Minor 6-armstep | m6arms | 4L + 2s | 685.7 ¢ to 800.0 ¢ |
| Major 6-armstep | M6arms | 5L + s | 800.0 ¢ to 857.1 ¢ | |
| 7-armstep | Minor 7-armstep | m7arms | 5L + 2s | 857.1 ¢ to 933.3 ¢ |
| Major 7-armstep | M7arms | 6L + s | 933.3 ¢ to 1028.6 ¢ | |
| 8-armstep | Minor 8-armstep | m8arms | 6L + 2s | 1028.6 ¢ to 1066.7 ¢ |
| Major 8-armstep | M8arms | 7L + s | 1066.7 ¢ to 1200.0 ¢ | |
| 9-armstep | Perfect 9-armstep | P9arms | 7L + 2s | 1200.0 ¢ |
Note names
7L 2s, when viewed under Armodue theory, can be notated using Armodue notation.
Theory
Temperament interpretations
Mavila is an important harmonic entropy minimum here, insofar as 678¢ can be considered a fifth. Other temperaments include septimal mavila and Hornbostel.
Modes
| UDP | Cyclic order |
Step pattern |
Scale degree (armdegree) | |||||||||
|---|---|---|---|---|---|---|---|---|---|---|---|---|
| 0 | 1 | 2 | 3 | 4 | 5 | 6 | 7 | 8 | 9 | |||
| 8|0 | 1 | LLLLsLLLs | Perf. | Maj. | Maj. | Maj. | Aug. | Perf. | Maj. | Maj. | Maj. | Perf. |
| 7|1 | 6 | LLLsLLLLs | Perf. | Maj. | Maj. | Maj. | Perf. | Perf. | Maj. | Maj. | Maj. | Perf. |
| 6|2 | 2 | LLLsLLLsL | Perf. | Maj. | Maj. | Maj. | Perf. | Perf. | Maj. | Maj. | Min. | Perf. |
| 5|3 | 7 | LLsLLLLsL | Perf. | Maj. | Maj. | Min. | Perf. | Perf. | Maj. | Maj. | Min. | Perf. |
| 4|4 | 3 | LLsLLLsLL | Perf. | Maj. | Maj. | Min. | Perf. | Perf. | Maj. | Min. | Min. | Perf. |
| 3|5 | 8 | LsLLLLsLL | Perf. | Maj. | Min. | Min. | Perf. | Perf. | Maj. | Min. | Min. | Perf. |
| 2|6 | 4 | LsLLLsLLL | Perf. | Maj. | Min. | Min. | Perf. | Perf. | Min. | Min. | Min. | Perf. |
| 1|7 | 9 | sLLLLsLLL | Perf. | Min. | Min. | Min. | Perf. | Perf. | Min. | Min. | Min. | Perf. |
| 0|8 | 5 | sLLLsLLLL | Perf. | Min. | Min. | Min. | Perf. | Dim. | Min. | Min. | Min. | Perf. |
Proposed mode names
The Ad- mode names are proposed by groundfault. This naming has the feature of matching up the middle 7 modes with the antidiatonic mode names in the generator arc.
| UDP | Cyclic order |
Step pattern |
|---|---|---|
| 8|0 | 1 | LLLLsLLLs |
| 7|1 | 6 | LLLsLLLLs |
| 6|2 | 2 | LLLsLLLsL |
| 5|3 | 7 | LLsLLLLsL |
| 4|4 | 3 | LLsLLLsLL |
| 3|5 | 8 | LsLLLLsLL |
| 2|6 | 4 | LsLLLsLLL |
| 1|7 | 9 | sLLLLsLLL |
| 0|8 | 5 | sLLLsLLLL |