Rectified hebrew: Difference between revisions
Cleanup and +categories |
m - parent category |
||
| (5 intermediate revisions by 4 users not shown) | |||
| Line 1: | Line 1: | ||
'''Rectified Hebrew''' is a 2.5.7.13 subgroup temperament. Being a weak extension of [[didacus]], it is notable due to its ability to reach several simple intervals in just a few | '''Rectified Hebrew''' is a 2.5.7.13 [[subgroup]] temperament. Being a [[weak extension]] of [[didacus]], it is notable due to its ability to reach several simple intervals in just a few [[generator]]s. | ||
Its name derives from a calendar layout by the same name. | Its name derives from a calendar layout by the same name. | ||
| Line 7: | Line 7: | ||
In the original Hebrew calendar, years number 3, 6, 8, 11, 14, 17, and 19 within a 19-year pattern (makhzor (מחזור), plural:makhzorim) are leap. When converted to [[19edo]], this results in [[5L 2s]] mode, and simply the diatonic major scale. Following this logic, a temperament can be constructed for the Rectified Hebrew calendar (see below), containing 130 notes of the 353edo scale, which represents 353 years of the cycle. Hebrew[130] scale has 334\353 as its generator, which is a supermajor seventh, or alternately, 19\353, about a third-tone, since inverting the generator has no effect on the scale. | In the original Hebrew calendar, years number 3, 6, 8, 11, 14, 17, and 19 within a 19-year pattern (makhzor (מחזור), plural:makhzorim) are leap. When converted to [[19edo]], this results in [[5L 2s]] mode, and simply the diatonic major scale. Following this logic, a temperament can be constructed for the Rectified Hebrew calendar (see below), containing 130 notes of the 353edo scale, which represents 353 years of the cycle. Hebrew[130] scale has 334\353 as its generator, which is a supermajor seventh, or alternately, 19\353, about a third-tone, since inverting the generator has no effect on the scale. | ||
Rectified Hebrew temperament is a 13-limit extension of the didacus. In the 13-limit, the it tempers out [[3136/3125]], [[4394/4375]], [[10985/10976]], and [[1968512/1953125]]. 18L 1s of Rectified Hebrew gives 19edo a unique stretch: 6 generators correspond to [[5/4]], 13 correspond to [[13/8]], and 15 correspond to [[7/4]]. When measured relative to the generator | Rectified Hebrew temperament is a 13-limit extension of the didacus. In the 13-limit, the it tempers out [[3136/3125]], [[4394/4375]], [[10985/10976]], and [[1968512/1953125]]. 18L 1s of Rectified Hebrew gives 19edo a unique stretch: 6 generators correspond to [[5/4]], 13 correspond to [[13/8]], and 15 correspond to [[7/4]]. When measured relative to the generator 19\353, the error is less than 1 in 5000. 5 instances of 5/4 and two of 7/4 both amount to 30 generators (570 steps). Tempering of 4394/4375 means that a stack of three 13/10s (7 generators) is equated with 35/32, octave-reduced, and also splits 14/13 (2 generators) into two parts each corresponding to 26/25, the generator. Tempering of 10985/10976 means that a stack of three 14/13's are equated with 5/4. | ||
The 11-step perfect fifth in this scale becomes 209\353, and it corresponds to 98/65, which is sharp of 3/2 by 196/195. | The 11-step perfect fifth in this scale becomes 209\353, and it corresponds to 98/65, which is sharp of 3/2 by 196/195. | ||
| Line 14: | Line 14: | ||
The number 353 in this version of the Hebrew calendar must not be confused with the number of days in ''shanah chaserah'' (שנה חסרה)'','' the deficient year. | The number 353 in this version of the Hebrew calendar must not be confused with the number of days in ''shanah chaserah'' (שנה חסרה)'','' the deficient year. | ||
169/168 amounts to 3 steps, which is the L step of the full 93L 37s rectified Hebrew scale. | |||
=== Specific chords and intervals === | === Specific chords and intervals === | ||
Rectified hebrew supports the tridecimal neutral seventh chords and a cadence invented by [[Eliora]]. | |||
The tridecimal neutral seventh chord, noted as 13/8 N7, is represented in 353edo with steps 114 95 106, and its inversions respectively: 13/8 N65: 95 106 38, 13/8 N43: 106 38 114, 13/8 N42 (or 13/8 N2): 38 114 95. 114 steps is 6 generators, 95 steps is 5 generators, 38 steps is 2 generators, and 106 is closure of 13/8 against the octave, which consists of 5 generators with an octave residue to 19 generators. | |||
The tridecimal neutral cadence is the following: 13/8 N43 - D7 - T53, or in 353edo steps: 247-0-38-152 - 209-323-57-152 - 0-114-209, or 0-95-209. This has a very pleasant sound, with 13/8 acting as a "doubled resolvant" or "resolution into resolution". | |||
In regular temperament theory of 353edo, one can think of it as the 353bbbbb val, where 209\353 fifth represents 3/2. | |||
=== Miscellaneous properties === | |||
Just as a large amount of [[12edo]] music can be played consistently in 19edo, it can also be played consistently in the 18L 1s subset of Rectified Hebrew. | Just as a large amount of [[12edo]] music can be played consistently in 19edo, it can also be played consistently in the 18L 1s subset of Rectified Hebrew. | ||
| Line 23: | Line 32: | ||
{| class="wikitable" | {| class="wikitable" | ||
|+ | |+ | ||
!Generator | ! Generator<br>steps | ||
steps | ! Interval<br>(2.5.7.13 subgroup) | ||
!Interval | |- | ||
(2.5.7.13 subgroup) | | 0 | ||
| [[1/1]] | |||
|- | |||
| 1 | |||
| [[26/25]] | |||
|- | |- | ||
| | | 2 | ||
| | | [[14/13]] | ||
|- | |- | ||
| | | 3 | ||
| | | [[28/25]] | ||
|- | |- | ||
| | | 4 | ||
| | | [[65/56]] | ||
|- | |- | ||
|6 | | 6 | ||
|5/4 | | [[5/4]] | ||
|- | |- | ||
|7 | | 7 | ||
|13/10 | | [[13/10]] | ||
|- | |- | ||
|9 | | 9 | ||
|7/5 | | [[7/5]] | ||
|- | |- | ||
|11 | | 11 | ||
|98/65 | | [[98/65]] | ||
|- | |- | ||
|13 | | 13 | ||
|13/8 | | [[13/8]] | ||
|- | |- | ||
|15 | | 15 | ||
|7/4 | | [[7/4]] | ||
|} | |} | ||
| Line 59: | Line 72: | ||
* [http://individual.utoronto.ca/kalendis/hebrew/rect.htm Rectified Hebrew Calendar] | * [http://individual.utoronto.ca/kalendis/hebrew/rect.htm Rectified Hebrew Calendar] | ||
[[Category: | [[Category:Rectified hebrew| ]] <!-- main article --> | ||
[[Category:Rank-2 temperaments]] | |||
[[Category:Subgroup temperaments]] | |||
[[Category:Hemimean clan]] | [[Category:Hemimean clan]] | ||
[[Category:Didacus]] | [[Category:Didacus]] | ||
Latest revision as of 14:37, 28 April 2025
Rectified Hebrew is a 2.5.7.13 subgroup temperament. Being a weak extension of didacus, it is notable due to its ability to reach several simple intervals in just a few generators.
Its name derives from a calendar layout by the same name.
Theory
353edo-specific theory
In the original Hebrew calendar, years number 3, 6, 8, 11, 14, 17, and 19 within a 19-year pattern (makhzor (מחזור), plural:makhzorim) are leap. When converted to 19edo, this results in 5L 2s mode, and simply the diatonic major scale. Following this logic, a temperament can be constructed for the Rectified Hebrew calendar (see below), containing 130 notes of the 353edo scale, which represents 353 years of the cycle. Hebrew[130] scale has 334\353 as its generator, which is a supermajor seventh, or alternately, 19\353, about a third-tone, since inverting the generator has no effect on the scale.
Rectified Hebrew temperament is a 13-limit extension of the didacus. In the 13-limit, the it tempers out 3136/3125, 4394/4375, 10985/10976, and 1968512/1953125. 18L 1s of Rectified Hebrew gives 19edo a unique stretch: 6 generators correspond to 5/4, 13 correspond to 13/8, and 15 correspond to 7/4. When measured relative to the generator 19\353, the error is less than 1 in 5000. 5 instances of 5/4 and two of 7/4 both amount to 30 generators (570 steps). Tempering of 4394/4375 means that a stack of three 13/10s (7 generators) is equated with 35/32, octave-reduced, and also splits 14/13 (2 generators) into two parts each corresponding to 26/25, the generator. Tempering of 10985/10976 means that a stack of three 14/13's are equated with 5/4.
The 11-step perfect fifth in this scale becomes 209\353, and it corresponds to 98/65, which is sharp of 3/2 by 196/195.
In addition, every sub-pattern in a 19-note generator is actually a Hebrew makhzor, that is a mini-19edo on its own, until it is truncated to an 11-note pattern. Just as the original calendar reform consists of 18 makhzorim with 1 hendecaeteris, Hebrew[130] scale consists of a stack of naively 18 "major scales" finished with one 11-edo tetratonic.
The number 353 in this version of the Hebrew calendar must not be confused with the number of days in shanah chaserah (שנה חסרה), the deficient year.
169/168 amounts to 3 steps, which is the L step of the full 93L 37s rectified Hebrew scale.
Specific chords and intervals
Rectified hebrew supports the tridecimal neutral seventh chords and a cadence invented by Eliora.
The tridecimal neutral seventh chord, noted as 13/8 N7, is represented in 353edo with steps 114 95 106, and its inversions respectively: 13/8 N65: 95 106 38, 13/8 N43: 106 38 114, 13/8 N42 (or 13/8 N2): 38 114 95. 114 steps is 6 generators, 95 steps is 5 generators, 38 steps is 2 generators, and 106 is closure of 13/8 against the octave, which consists of 5 generators with an octave residue to 19 generators.
The tridecimal neutral cadence is the following: 13/8 N43 - D7 - T53, or in 353edo steps: 247-0-38-152 - 209-323-57-152 - 0-114-209, or 0-95-209. This has a very pleasant sound, with 13/8 acting as a "doubled resolvant" or "resolution into resolution".
In regular temperament theory of 353edo, one can think of it as the 353bbbbb val, where 209\353 fifth represents 3/2.
Miscellaneous properties
Just as a large amount of 12edo music can be played consistently in 19edo, it can also be played consistently in the 18L 1s subset of Rectified Hebrew.
Interval chain
| Generator steps |
Interval (2.5.7.13 subgroup) |
|---|---|
| 0 | 1/1 |
| 1 | 26/25 |
| 2 | 14/13 |
| 3 | 28/25 |
| 4 | 65/56 |
| 6 | 5/4 |
| 7 | 13/10 |
| 9 | 7/5 |
| 11 | 98/65 |
| 13 | 13/8 |
| 15 | 7/4 |