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Looking for a tag in this wiki? We found one tag with "mohajira" in its name: mohajira - all tags

Other languages: Deutsch Mohajira is a meantone temperament that splits 3/2 into two 11/9's ... the generator 3/2 into two equally spaced neutral thirds. Among the most common is the seven note MOS mohajira[7 ... quarter tone. Modes and MOS There are seven diatonic modes of mohajira which are structured
http://xenharmonic.wikispaces.com/Mohajira - last edited Dec 29, 2016 by xenwolf xenwolf
What I see is a collection of properties or features. But where does Mohajira originate from, who invented/coined/discovered it?
[|-4 4 -1 0>, |-23 11 0 2>] <<2 8 -11 5 8 -23 1 -48 -16 52|| mohajira 2079/2048: |-11 3 0 1 1> 26.06397
! mohajira-to-slendro.scl ! From Mohajira to Aeolian and Slendros 12 ! 21/20 9/8 6/5 49/40 4/3 7/5 3/2 8/5 49/30 9/5 11/6 2/1 ! 12 notes selection among two "Dudon scales" : ! D(540 ... -441 7 63] ! Mohajira scale on white keys : [15 135 147 5 45 49 55]
! dudon_mohajira117.scl ! Jacques Dudon Mohajira, 1/1 (Vol. II, No. 1. p. 11), with 3/2 (117:78) ! 2.3.11.13 superwakalix ! Fokblock([352/351, 33/32, 27/26], [5, 2, 5]) = Fokblock([352/351, 144/143, 33/32], [5, 5, 4]) = ! Fokblock([352/351, 33/32, 176/169], [3, 2, 5]) = Fokblock([352/351, 512
! jademohaporc.scl Jade-mohajira-porcupine wakalix ! jade: -3 to 3; mohajira: -3 to 3; porcupine: -3 to 3 ! jade: LsLLLsL; mohajira: sLsLsLs; porcupine: sssLsss 7 ! 12/11 11/9 4/3 3/2 18/11 11/6 2/1
! ochmohaporc.scl Jade-mohajira-porcupine wakalix ! ochre: -3 to 3; mohajira: -3 to 3; porcupine: -3 to 3 ! ochre: LsLLLsL; mohajira: sLsLsLs; porcupine: sssLsss 7 ! 13/12 16/13 4/3 3/2 13/8 24/13 2/1
Totally. It's the 3L4s scale, with the neutral 3rd generator, also found in 17, 24, 27, and 31-EDO (among others), sometimes known as "mohajira".
Migration is a neutral-third-based linear temperament similar to mohajira, but with a different mapping of the prime 7. The two become identical in 31edo. See Meantone family.
According to Margo Schulter in the FB group, Mohajira was originally a JI tuning invented/discovered by Jacques Dudon. Source: Jacques Dudon, "Differential Coherence," in 1/1: the Journal of the Just Intonation Network, vol. II, no. 1 (Winter 2003).
. In the 7-limit it is a mohajira system, tempering out 6144/6125, but not a septimal meantone system, as 126 ... /80. In the 11-limit it tempers out 99/98, and supports the 31&69 variant of mohajira, identical to the standard 11-limit mohajira in 31 but not in 69.
away from mohajira, and one modification away from diatonic).
Well, as it stands, temperaments eliminating 243/242 include mohajira, migration, maqamic, myna, miracle, and mohoho. There's also this one, which I was going to name something also starting with m that's similar in meaning to mohajira or migration: http://x31eq.com/cgi-bin/rt.cgi?ets=7d_17c&limit=11 So
! meansqunumigpopmo.scl ! Meantone-squares-nusecond-migration-meanpop-mohajira superwakalix 31 ! Meantone: -3 to 27; squares: -15 to 15; nusecond: -2 to 28 ! Migration: -7 to 23; meanpop: -19 to 11; mohajira: -23 to 7 ! Contains the Cps({1,3,5,7,9,11}, 3) Eikosany ! 33/32 21/20 77/72 11/10 9/8 231
be thought of as Mohajira[7] superimposed over a diatonic major scale. Take for example, C major C D E F G A B C, and combine it with the Mohajira[7] mode "Iced Major" C D Ed F G Ad Bd C. This gives a scale ... ] contains 2 separate Mohajira[7] pitch class sets, one "Iced Major" mode starting on C (C D Ed F G Ad Bd C
The 86 equal temperament divides the octave into 86 equal parts of 13.953 cents each. 86 = 2 * 43, and the patent val is a contorted 43 in the 5-limit. In the 7-limit the patent val tempers out 6144/6125, so that it supports mohajira temperament. In the 11-limit it tempers out 245/242, 540/539 and 4000/3993, and in the 13
tempering out 121/120) include 15edo, 22edo, 31edo, orwell, porcupine, mohajira and valentine.
http://xenharmonic.wikispaces.com/12_11 - last edited Jun 7, 2014 by spt3125 spt3125
This MOS is a neutral thirds-style meantone scale which spaces its large steps 2s-s-s-2s-s-s-s-2s. It is an improper Mohajira scale when the generator is c. 9/31edo (348.387 cents) and its entire spectrum is 2/7edo (342.857) to 5/17edo (352.941 cents). 2/7 342.857 13/45 346.667 11