4973edo: Difference between revisions
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{{EDO intro|4973}} It is a very strong [[7-limit]] system: it tempers out the [[unnoticeable comma]] {{monzo| 1 -15 -18 23 }} and supports a number of [[very high accuracy temperaments|very high accuracy 7-limit rank-3 temperaments]]. In the 5-limit it [[support]]s [[whoosh]], the [[441edo|441]] & [[730edo|730]] temperament. It is a [[zeta peak integer edo]]. | {{EDO intro|4973}} It is a very strong [[7-limit]] system: it tempers out the [[unnoticeable comma]] {{monzo| 1 -15 -18 23 }} and supports a number of [[very high accuracy temperaments|very high accuracy 7-limit rank-3 temperaments]]. In the 5-limit it [[support]]s [[whoosh]], the [[441edo|441]] & [[730edo|730]] temperament. It is a [[zeta peak integer edo]]. | ||
Revision as of 04:23, 9 July 2023
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This page presents a novelty topic.
It may contain ideas which are less likely to find practical applications in music, or numbers or structures that are arbitrary or exceedingly small, large, or complex. Novelty topics are often developed by a single person or a small group. As such, this page may also contain idiosyncratic terms, notation, or conceptual frameworks. |
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Template:EDO intro It is a very strong 7-limit system: it tempers out the unnoticeable comma [1 -15 -18 23⟩ and supports a number of very high accuracy 7-limit rank-3 temperaments. In the 5-limit it supports whoosh, the 441 & 730 temperament. It is a zeta peak integer edo.
Prime harmonics
| Harmonic | 2 | 3 | 5 | 7 | 11 | 13 | 17 | 19 | 23 | 29 | 31 | |
|---|---|---|---|---|---|---|---|---|---|---|---|---|
| Error | Absolute (¢) | +0.0000 | -0.0045 | +0.0124 | +0.0058 | +0.0595 | -0.0692 | +0.0114 | +0.0136 | +0.0788 | +0.0629 | -0.0527 |
| Relative (%) | +0.0 | -1.9 | +5.2 | +2.4 | +24.7 | -28.7 | +4.7 | +5.6 | +32.6 | +26.1 | -21.8 | |
| Steps (reduced) |
4973 (0) |
7882 (2909) |
11547 (1601) |
13961 (4015) |
17204 (2285) |
18402 (3483) |
20327 (435) |
21125 (1233) |
22496 (2604) |
24159 (4267) |
24637 (4745) | |