6L 2s
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There is only one significant (though small) harmonic entropy minimum with this MOS pattern: hedgehog, in which two generators are 6/5 and three are 4/3, same as porcupine.
In addition to the true MOS, LLLsLLLs, there is also a near-MOS, LLLLsLLs, in which the period is the only interval with more than two flavors. The true MOS is always proper, because there is only one small step per period, but the near-MOS is only proper if the generator is smaller than 2\14 (which includes hedgehog).
| Generator | Cents | Comments | |||||
|---|---|---|---|---|---|---|---|
| 1\8 | 150 | ||||||
| 3\22 | 163.64 | Hedgehog is around here | |||||
| 164.99 | |||||||
| 8\58 | 165.52 | ||||||
| 13\94 | 165.96 | Golden hedgehog/echidna | |||||
| 5\36 | 166.67 | ||||||
| 167.72 | |||||||
| 2\14 | 171.43 | Boundary of propriety for near-MOS
Optimum rank range (L/s=2/1) for MOS | |||||
| 5\34 | 176.47 | ||||||
| 13\88 | 177.27 | ||||||
| 8\54 | 177.78 | ||||||
| 178.15 | L/s = e | ||||||
| 3\20 | 180 | L/s = 3 | |||||
| 180.815 | L/s = pi | ||||||
| 4/26 | 184.615 | L/s = 4 | |||||
| 1\6 | 200 | ||||||