# Horwell temperaments

(Redirected from Mutt)

Horwell temperaments temper out the horwell comma, [-16 1 5 1 = 65625/65536.

Temperaments discussed elsewhere are

## Mutt

Subgroup: 2.3.5

Comma list: [-44 -3 21

Mapping[3 5 7], 0 -7 -1]]

mapping generators: ~98304/78125, ~393216/390625

Optimal tuning (POTE): ~98304/78125 = 1\3, ~5/4 = 385.980 (~393216/390625 = 14.020)

### 7-limit

Subgroup: 2.3.5.7

Comma list: 65625/65536, 250047/250000

Mapping[3 5 7 8], 0 -7 -1 12]]

Wedgie⟨⟨21 3 -36 -44 -116 -92]]

Optimal tuning (POTE): ~63/50 = 1\3, ~5/4 = 385.964 (~126/125 = 14.036)

### 11-limit

Subgroup: 2.3.5.7.11

Comma list: 441/440, 4375/4356, 16384/16335

Mapping: [3 5 7 8 10], 0 -7 -1 12 11]]

Optimal tuning (POTE): ~44/35 = 1\3, ~5/4 = 386.020 (~126/125 = 13.980)

### 13-limit

Subgroup: 2.3.5.7.11.13

Comma list: 364/363, 441/440, 625/624, 2200/2197

Mapping: [3 5 7 8 10 11], 0 -7 -1 12 11 3]]

Optimal tuning (POTE): ~44/35 = 1\3, ~5/4 = 386.022 (~126/125 = 13.978)

## Fifthplus

Fifthplus (22 & 171) tempers out the sesesix comma, [-74 13 23 in the 5-limit. The name "fifthplus" means using a sharp fifth interval (such as superpyth fifth) as a generator.

Subgroup: 2.3.5.7

Comma list: 65625/65536, 420175/419904

Mapping[1 11 -3 20], 0 -23 13 -42]]

Wedgie⟨⟨23 -13 42 -74 2 134]]

Optimal tuning (POTE): ~2 = 1\1, ~5488/3645 = 708.774

## Emkay

Emkay (87 & 224) tempers out the same 5-limit comma as the emka temperament (37 & 50), but with the horwell (65625/65536) rather than the hemimean (3136/3125) tempered out.

Subgroup: 2.3.5.7

Comma list: 65625/65536, 244140625/243045684

Mapping[1 14 6 -28], 0 -27 -8 67]]

Wedgie⟨⟨27 8 -67 -50 -182 -178]]

Optimal tuning (POTE): ~2 = 1\1, ~3125/2268 = 551.7745

### 11-limit

Subgroup: 2.3.5.7.11

Comma list: 3025/3024, 4000/3993, 65625/65536

Mapping: [1 14 6 -28 3], 0 -27 -8 67 1]]

Optimal tuning (POTE): ~2 = 1\1, ~11/8 = 551.7746

### 13-limit

Subgroup: 2.3.5.7.11.13

Comma list: 625/624, 1575/1573, 2080/2079, 2200/2197

Mapping: [1 14 6 -28 3 6], 0 -27 -8 67 1 -5]]

Optimal tuning (POTE): ~2 = 1\1, ~11/8 = 551.7749

## Kastro

Subgroup: 2.3.5.7

Comma list: 65625/65536, 117649/116640

Mapping[1 5 1 6], 0 -31 12 -29]]

Optimal tuning (POTE): ~2 = 1\1, ~3375/3136 = 132.1845

### 11-limit

Subgroup: 2.3.5.7.11

Comma list: 385/384, 3388/3375, 12005/11979

Mapping: [1 5 1 6 5], 0 -31 12 -29 -14]]

Optimal tuning (POTE): ~2 = 1\1, ~121/112 = 132.1864

### 13-limit

Subgroup: 2.3.5.7.11.13

Comma list: 169/168, 364/363, 385/384, 3388/3375

Mapping: [1 5 1 6 5 7], 0 -31 12 -29 -14 -30]]

Optimal tuning (POTE): ~2 = 1\1, ~13/12 = 132.1789

## Oquatonic

The oquatonic has a period of 1/28 octave and tempers out the horwell (65625/65536) and the dimcomp (390625/388962), as well as the hemfiness (4096000/4084101, saquinru-atriyo). In this temperament, major third of 5/4 is mapped into 9\28.

Subgroup: 2.3.5.7

Comma list: 65625/65536, 390625/388962

Mapping[28 0 65 123], 0 1 0 -1]]

mapping generators: ~128/125, ~3

Wedgie⟨⟨28 0 -28 -65 -123 -65]]

Optimal tuning (POTE): ~2 = 1\1, ~3/2 = 702.1137

### 11-limit

Subgroup: 2.3.5.7.11

Comma list: 1375/1372, 6250/6237, 65625/65536

Mapping: [28 0 65 123 230], 0 1 0 -1 -3]]

Optimal tuning (POTE): ~2 = 1\1, ~3/2 = 702.0186

### 13-limit

Subgroup: 2.3.5.7.11.13

Comma list: 625/624, 1375/1372, 2080/2079, 2200/2197

Mapping: [28 0 65 123 230 148], 0 1 0 -1 -3 -1]]

Optimal tuning (POTE): ~2 = 1\1, ~3/2 = 702.0288

## Bezique

Bezique splits the octave into 32 equal parts and reaches 3/2, 8/5 and 11/8 in just one generator with the 64-tone mos. The card game of bezique is played with two packs of 32 cards, hence the name.

Subgroup: 2.3.5.7

Comma list: 65625/65536, 847288609443/843308032000

Mapping[32 0 125 -113], 0 1 -1 4]]

mapping generators: ~100352/98415, ~3

Optimal tuning (CTE): ~100352/98415 = 1\32, ~3/2 = 701.610

### 11-limit

Subgroup: 2.3.5.7.11

Comma list: 9801/9800, 46656/46585, 65625/65536

Mapping: [32 0 125 -113 60], 0 1 -1 4 1]]

Optimal tuning (CTE): ~45/44 = 1\32, ~3/2 = 701.601