49/25: Difference between revisions
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34edo doesn't map it to 33\34 |
wart notation |
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'''49/25''', the '''jubilismic suboctave''', is a [[jubilisma]] short of the [[2/1|octave]]. As a stack of two [[7/5]] diminished fifths, it can be thought of as a diminished ninth. It is also called the '''BP eighth''' in the [[Bohlen–Pierce]] scale. | '''49/25''', the '''jubilismic suboctave''', is a [[jubilisma]] short of the [[2/1|octave]]. As a stack of two [[7/5]] diminished fifths, it can be thought of as a diminished ninth. It is also called the '''BP eighth''' in the [[Bohlen–Pierce]] scale. | ||
It is approximated by many notable tunings besides Bohlen–Pierce, including but not limited to [[27edo]], [[34edo]], [[53edo]] and [[72edo]], though for 34edo neither the [[patent val]] nor 34d actually maps it to the closest step, but the [[68edo]] mapping must be used instead. | It is approximated by many notable tunings besides Bohlen–Pierce, including but not limited to [[27edo]], [[34edo]], [[53edo]] and [[72edo]], though for 34edo neither the [[patent val]] nor the 34d val (written with [[wart notation]]) actually maps it to the closest step, but the [[68edo]] mapping must be used instead. | ||
== Approximation == | == Approximation == | ||
Latest revision as of 00:57, 27 April 2026
| Interval information |
BP eighth
49/25, the jubilismic suboctave, is a jubilisma short of the octave. As a stack of two 7/5 diminished fifths, it can be thought of as a diminished ninth. It is also called the BP eighth in the Bohlen–Pierce scale.
It is approximated by many notable tunings besides Bohlen–Pierce, including but not limited to 27edo, 34edo, 53edo and 72edo, though for 34edo neither the patent val nor the 34d val (written with wart notation) actually maps it to the closest step, but the 68edo mapping must be used instead.
Approximation
| Edo | Step size | Cents (¢) | Absolute error (¢) | Relative error (%) |
|---|---|---|---|---|
| 2 | 2\2 | 1200.00 | +34.98 | +5.83 |
| 3 | 3\3 | 1200.00 | +34.98 | +8.74 |
| 31 | 30\31 | 1161.29 | -3.73 | -9.65 |
| 32 | 31\32 | 1162.50 | -2.52 | -6.73 |
| 33 | 32\33 | 1163.64 | -1.39 | -3.82 |
| 34 | 33\34 | 1164.71 | -0.32 | -0.90 |
| 35 | 34\35 | 1165.71 | +0.69 | +2.01 |
| 36 | 35\36 | 1166.67 | +1.64 | +4.93 |
| 37 | 36\37 | 1167.57 | +2.54 | +7.84 |
| 66 | 64\66 | 1163.64 | -1.39 | -7.63 |
| 67 | 65\67 | 1164.18 | -0.85 | -4.72 |
| 68 | 66\68 | 1164.71 | -0.32 | -1.80 |
| 69 | 67\69 | 1165.22 | +0.19 | +1.11 |
| 70 | 68\70 | 1165.71 | +0.69 | +4.02 |
| 71 | 69\71 | 1166.20 | +1.17 | +6.94 |
| 72 | 70\72 | 1166.67 | +1.64 | +9.85 |
See also
- 50/49 – its octave complement