81/64
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Ratio | 81/64 |
Factorization | 2-6 × 34 |
Monzo | [-6 4⟩ |
Size in cents | 407.82¢ |
Name | Pythagorean major third |
Color name | Lw3, lawa 3rd |
FJS name | [math]\text{M3}[/math] |
Special properties | reduced |
Tenney height (log2 nd) | 12.3399 |
Weil height (log2 max(n, d)) | 12.6797 |
Wilson height (sopfr (nd)) | 24 |
Harmonic entropy (Shannon, [math]\sqrt{n\cdot d}[/math]) |
~4.5459 bits |
[sound info] | |
open this interval in xen-calc |
The Pythagorean major third, 81/64, may be reached by stacking four perfect fifths (3/2), and reducing by two octaves. In contrast to the more typical 5/4- with which it is conflated in meantone- this interval is a bit more dissonant when not bridged by a stack of 3/2 intervals within in a chord, with a harmonic entropy level somewhere between that of 9/8 and that of 8/7. Thus, some would argue that it is functionally an imperfect dissonance.