Bohlen-Pierce

The Bohlen-Pierce system is a non-octave tuning system of (exact or well-tempered) 13 equal divisions of the perfect twelfth (or tritave). In the Bohlen-Pierce system, the tritave is generally seen as the interval of equivalence, and harmony emphasizes the odd harmonics (such as the chord 3:5:7:9). It is the smallest EDT that has a tuning of lambda, the 9-note scale of the sensamagic temperament (which serves an analogous role to meantone in tritave-based harmony).

13edt's 2/1 is flat about 30 cents, making it most prominently a 3.5.7 subgroup temperament, although it also contains approximations of 19, 23, and 29. 7/3 (the tritave-reduced 7th harmonic) is flattened by a small amount, so that a sharpened 9/7 stacks twice to a flattened 5/3, as in sensamagic temperament. As a full 7-limit temperament, it supports sensi, albeit with a severely flattened octave.

Note: Due to a bug with the template, the step counts are octave-reduced instead of tritave-reduced.

The step of 13edt can be interpreted as the following ratios in the 3.5.7 subgroup.

• 49/45
• 27/25

The "Intervals represented" column reflects the just (well-tempered) tuning of Bohlen-Pierce.

*As a subset of 41edo

39edt, sometimes known as Triple Bohlen-Pierce, additionally adds approximations of the 11th and 13th harmonics to 13edt.

See 41edo.

Bohpier temperament is somewhat analogous to blackwood or compton temperament, but based on 13edt, adding the octave as a separate generator (in this case, the period). It is supported by 41edo.