104edo: Difference between revisions

{{EDO intro|104}}

104edo has two different equally viable 5-limit [[val]]s, and both are useful. The flat major third val, {{val| 104 165 241 }} ([[patent val]]), tempers out [[3125/3072]], and [[support]]s [[magic]] temperament. The sharp major third val, {{val| 104 165 242 }} (104c val), tempers out [[2048/2025]] and supports [[diaschismic]] temperament.

104edo with the flat third is especially notable as an excellent tuning for magic temperament, providing the [[optimal patent val]] for 11-limit magic and the 13-limit magic extension [[necromancy]]. In the 5-limit it tempers out the magic comma, 3125/3072; in the 7-limit, it tempers out [[225/224]], [[245/243]] and [[875/864]]; and in the 11-limit, [[100/99]], [[896/891]], [[385/384]] and [[540/539]]. It provides an excellent tuning also for the rank-3 temperaments pairing 100/99 with 225/224 ([[apollo]] temperament), 245/243 or 875/864, or the rank-4 temperament tempering out 100/99, for which it gives the optimal patent val.

104 with the sharp third is excellent for 11-, 13-, or 17-limit diaschismic. It tempers out 2048/2025 in the 5-limit, [[126/125]] and [[5120/5103]] in the 7-limit, [[176/175]] and 896/891 in the 11-limit, [[196/195]], [[352/351]] and [[364/363]] in the 13-limit and [[136/135]] and [[256/255]] in the 17-limit.

104 is also notable as a no-fives system; on 2.3.7.11.13, it tempers out 352/351, 364/363, 896/891, [[2197/2187]], [[10648/10647]], 16807/16731, 20449/20412, 21632/21609, and 26411/26364. It is the optimal patent val for the 17&87 2.3.7.11.13 subgroup temperament tempering out 352/351, 364/363 and 2197/2187, which has a 13/9 generator, three of which give a 3.

Since 104 factors into 2³ × 13, it has subset edos {{EDOs| 2, 4, 8, 13, 26, and 52 }}.  

! rowspan="2" | [[Comma list|Comma List]]

! rowspan="2" | Optimal<br>8ve Stretch (¢)

! colspan="2" | Tuning Error

| [{{val| 104 165 }}]

| -0.597

| [{{val| 104 165 242 }}] (104c)

| -1.258

| [{{val| 104 165 242 292 }}] (104c)

| -0.980

| [{{val| 104 165 242 292 360 }}] (104c)

| -0.930

| [{{val| 104 165 242 292 360 385 }}] (104c)

| -0.855

! Periods <br> per 8ve

! Generator

! Cents

! Associated Ratio

! Periods<br>per 8ve

! Generator<br>(Reduced)

! Cents<br>(Reduced)

! Associated Ratio<br>(Reduced)

| 43\104<br>(9\104)

| 496.15<br>(103.85)

| 4/3<br>(17/16)

| 49\104<br>(2\104)

| 565.38<br>(34.62)

| 168/121<br>(55/54)

| 43\104<br>(1\104)

| 496.15<br>(11.54)

| 4/3<br>(225/224)

! colspan="3" | Approximate Ratios

! of 2.3.7.11.13.17.19.25 <br> Subgroup

! Additional Ratios of 5 <br> Tending Sharp (104c Val)

! Additional Ratios of 5 <br> Tending Flat (Patent Val)

| 0.000

| ''[[126/125]]''

| ''[[225/224]]'', ''[[100/99]]''

| 11.538

| [[225/224]], [[100/99]]

|

|

| 23.077

| [[64/63]]

| [[81/80]], ''[[225/224]]''

| ''[[50/49]]''

| 34.615

|

| ''[[81/80]]'', ''[[126/125]]''

| 46.154

| [[36/35]], ''[[50/49]]''

| 57.692

| ''[[28/27]]'', [[33/32]]

|

| 69.231

| [[25/24]]

| 80.769

| ''[[25/24]]'', [[21/20]]

| ''[[20/19]]''

| 92.308

| 103.846

| 115.385

| 126.923

| 138.462

| 150.000

| 161.538

| 173.077

| 184.615

| 196.154

| [[28/25]], [[19/17]]

| 207.692

| 219.231

| 230.769

| 242.308

|

|

| 253.846

| 265.385

| 276.923

| 288.462

| [[32/27]], [[13/11]]

| 300.000

| [[25/21]], [[19/16]]

| 311.538

| 323.077

| [[6/5]], ''[[40/33]]''

| 334.615

| 346.154

| 357.692

| [[27/22]], [[16/13]]

| 369.231

| [[26/21]], [[21/17]]

| 380.769

| 392.308

| 403.846

| [[63/50]], [[24/19]]

| 415.385

| [[81/64]], [[14/11]]

| 426.923

| 438.462

| 450.000

| 461.538

| 473.077

| 484.615

| 496.154

| 507.692

| 519.231

| 530.769

| 542.308

| 553.846

| 565.385

| 576.923

| 588.462

| [[45/32]], ''[[7/5]]''

| 600.000