Magic
| Magic |
225/224, 245/243 (7-limit)
9-odd-limit: 5.9¢
9-odd-limit: 13 notes
Magic (19 & 22) is a 2.3.5 temperament that equates a stack of five 5/4 major thirds to one 3/1. It also equates 25/24 to 128/125, shrinking the difference between 5/4 and 6/5. It is a 3-cluster temperament, as indicated by the edo join (22 - 19 = 3).
Interval chain
In the following table, odd harmonics 1–15 and their inverses are in bold.
| # | Cents* | Approximate ratios |
|---|---|---|
| 0 | 0.0 | 1/1 |
| 1 | 380.5 | 5/4 |
| 2 | 760.9 | 14/9 |
| 3 | 1141.4 | 27/14, 31/16 |
| 4 | 321.8 | 6/5, 29/24 |
| 5 | 702.3 | 3/2 |
| 6 | 1082.7 | 15/8, 28/15 |
| 7 | 263.2 | 7/6 |
| 8 | 643.7 | 36/25 |
| 9 | 1024.1 | 9/5, 29/16 |
| 10 | 204.6 | 9/8 |
| 11 | 585.0 | 7/5 |
| 12 | 965.5 | 7/4 |
| 13 | 145.9 | 35/32 |
* In 7-limit CWE tuning
Extensions
Magic divides ~16/15 in half (into two 25/24's), so it easily extends to prime 31 (at +3 generators) by tempering out S31 = 961/960. Since in 7-limit Magic, the 16/15 is also a 15/14, we can also extend 2.3.5.7.31 Magic to add prime 29 (at +9 generators) by equating 16/15 to 31/29.
This can be seen from the following S-expression for the Magic comma:
3125/3072 = (25/24)^2/(16/15) = (25/24)*(25/24)/(32/31*31/30) = (25/24)S25*S26*S27*S28*S29*S30/(32/31) = (S25*S26*S27*S28*S29*S30)^2*S31 = (S15*S28*S29*S30)^2*S31
structurally inducing the above 2.3.5.7.29.31 extension.
List of patent vals
The following patent vals support 2.3.5 Magic. Vals that are contorted in 2.3.5 are not included.
| Edo | Extension to 7 | Generator | Fifth |
|---|---|---|---|
| 3 | 400.000 | 800.000 | |
| 25 | 384.000 | 720.000 | |
| 22 | 19 & 22 | 381.818 | 709.091 |
| 107 | 381.308 | 706.542 | |
| 85 | 19 & 22 | 381.176 | 705.882 |
| 63 | 19 & 22 | 380.952 | 704.762 |
| 104 | 380.769 | 703.846 | |
| 41 | 19 & 22 | 380.488 | 702.439 |
| 60 | 19 & 22 | 380.000 | 700.000 |
| 79 | 379.747 | 698.734 | |
| 19 | 19 & 22 | 378.947 | 694.737 |
| 35 | 377.143 | 685.714 | |
| 16 | 375.000 | 675.000 |
| View • Talk • EditRegular temperaments | |
|---|---|
| Rank-2 | |
| Acot | Blackwood (1/5-octave) • Whitewood (1/7-octave) • Compton (1/12-octave) |
| Monocot | Meantone • Schismic • Leapday • Archy |
| Complexity 2 | Diaschismic (diploid monocot) • Pajara (diploid monocot) • Injera (diploid monocot) • Rastmatic (dicot) • Mohajira (dicot) • Intertridecimal (dicot) • Interseptimal (alpha-dicot) |
| Complexity 3 | Augmented (triploid) • Misty (triploid) • Slendric (tricot) • Porcupine (omega-tricot) |
| Complexity 4 | Diminished (tetraploid) • Tetracot (tetracot) • Buzzard (alpha-tetracot) • Squares (beta-tetracot) • Negri (omega-tetracot) |
| Complexity 5-6 | Magic (alpha-pentacot) • Amity (gamma-pentacot) • Kleismic (alpha-hexacot) • Miracle (hexacot) |
| Higher complexity | Orwell (alpha-heptacot) • Sensi (beta-heptacot) • Octacot (octacot) • Wurschmidt (beta-octacot) • Valentine (enneacot) • Ammonite (epsilon-enneacot) • Myna (beta-decacot) • Ennealimmal (enneaploid dicot) |
| Straddle-3 | A-Team (alter-tricot) • Machine (alter-monocot) |
| No-3 | Trismegistus (alpha-triseph) • Orgone (trimech) • Didacus (diseph) |
| No-octaves | Sensamagic (monogem) |
| Exotemperament | Dicot • Mavila • Father |
| Higher-rank | |
| Rank-3 | Hemifamity • Marvel • Parapyth |
