28edo: Difference between revisions
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* Whitewood Major [14] 13131313131313 | * Whitewood Major [14] 13131313131313 | ||
* Whitewood Minor [14] 31313131313131 | * Whitewood Minor [14] 31313131313131 | ||
* Whitewood Major [21] 121121121121121121121 | |||
* Whitewood Minor [21] 211211211211211211211 | |||
* Whitewood Diminished [21] 112112112112112112112 | |||
* (Whitewood neutral is also theoretically possible, stacking neutral or subminor & supermajor thirds, but in practice that works out as 22222222222222, or 14edo, so it doesn't count as a 28edo scale) | * (Whitewood neutral is also theoretically possible, stacking neutral or subminor & supermajor thirds, but in practice that works out as 22222222222222, or 14edo, so it doesn't count as a 28edo scale) | ||
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* Negri [9] 333343333 | * Negri [9] 333343333 | ||
* Negri [10] 3333333331 | * Negri [10] 3333333331 | ||
* Negri [19] 2121212121212121211 | |||
However, unlike 15, 28 is complex enough to do recognisable approximations of various diatonic scales and their modes, although they will sound noticeably out of tune and it's obviously not the best method of using the temperament. | However, unlike 15, 28 is complex enough to do recognisable approximations of various diatonic scales and their modes, although they will sound noticeably out of tune and it's obviously not the best method of using the temperament. | ||
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* Diatonic Major [7] 5434552 | * Diatonic Major [7] 5434552 | ||
* Diatonic Minor [7] 5254345 | * Diatonic Minor [7] 5254345 | ||
* Diatonic Major [10] 3243432322 | |||
* Diatonic Minor [10] 3223243432 | |||
* Diatonic Major [12] 322232232322 | |||
* Diatonic Minor [12] 322322232232 | |||
* Diatonic Major [16] 2122221222122122 | |||
* Diatonic Minor [16] 2122212222122212 | |||
* Harmonic Minor [7] 5254372 | * Harmonic Minor [7] 5254372 | ||
* Harmonic Major [7] 5434372 | * Harmonic Major [7] 5434372 | ||
* Harmonic Minor [8] 52543522, 52543432 | |||
* Harmonic Major [8] 54343522, 54343432 | |||
* Harmonic Minor [10] 3223243432 | |||
* Harmonic Minor [11] 32232433222 | |||
* Harmonic Major [9] 324343432 | |||
* Harmonic Major [10] 3243433222 | |||
* Harmonic Minor [12] 322322232232, 322322233222 | |||
* Harmonic Major [12] 322232232232, 322232233222 | |||
* Harmonic Minor [16] 2122212222122212, 212221222212121222 | |||
* Harmonic Major [16] 2122221222122212, 212221222212121222 | |||
* Melodic Minor [7] 5254552 | * Melodic Minor [7] 5254552 | ||
* Melodic Major [7] 5434345 | * Melodic Major [7] 5434345 | ||
* Melodic Minor [11] 32232432322 | |||
* Melodic Major [9] 324343432 | |||
* Melodic Minor [12] 322322232322 | |||
* Melodic Major [12] 322232232232 | |||
* Melodic Minor [16] 2122212222122122 | |||
* Melodic Major [16] 2122221222122212 | |||
Interestingly, as it has a near perfect 21/16, 28edo can also generate Oneirotonic scales (see [[13edo|13edo]]) by stacking it's 11th degree, and they actually sound better in this temperament. | Interestingly, as it has a near perfect 21/16, 28edo can also generate Oneirotonic scales (see [[13edo|13edo]]) by stacking it's 11th degree, and they actually sound better in this temperament. | ||
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* Oneirotonic [8] 55155151 | * Oneirotonic [8] 55155151 | ||
* Oneirotonic [13] 4141141411411 | * Oneirotonic [13] 4141141411411 | ||
* Oneirotonic [18] 311311131131113111 | |||
* Pathological Oneirotonic [23] 21112111121112111121111 | |||
* [[machine5]] | * [[machine5]] | ||
* [[machine6]] | * [[machine6]] | ||
* [[machine11]] | * [[machine11]] | ||
* [[machine17]] | |||
== Music == | == Music == | ||