Würschmidt family: Difference between revisions

Line 1:

The [[5-limit]] parent comma for the '''würschmidt family''' is [[393216/390625]], known as Würschmidt's comma, and named after José Würschmidt, Its [[monzo]] is {{~~Monzo~~|17 1 -8}}, and flipping that yields {{~~Multival~~|8 1 17}} for the wedgie. This tells us the [[generator]] is a major third, and that to get to the interval class of fifths will require eight of these. In fact, (5/4)<sup>8</sup> * 393216/390625 = 6. 10\31, 11\34 or 21\65 are possible generators and other tunings include 96EDO, 99EDO and 164EDO. Another tuning solution is to sharpen the major third by 1/8th of a Würschmidt comma, which is to say by 1.43 cents, and thereby achieve pure fifths; this is the [[minimax tuning]]. Würschmidt is well-supplied with MOS scales, with 10, 13, 16, 19, 22, 25, 28, 31 and 34 note [[MOS]] all possibilities.

The [[5-limit]] parent comma for the '''würschmidt family''' is [[393216/390625]], known as Würschmidt's comma, and named after José Würschmidt, Its [[monzo]] is {{monzo| 17 1 -8 }}, and flipping that yields {{multival| 8 1 17 }} for the wedgie. This tells us the [[generator]] is a classic major third, and that to get to the interval class of fifths will require eight of these. In fact, (5/4)<sup>8</sup> × 393216/390625 = 6. 10\31, 11\34 or 21\65 are possible generators and other tunings include 96EDO, 99EDO and 164EDO. Another tuning solution is to sharpen the major third by 1/8th of a Würschmidt comma, which is to say by 1.43 cents, and thereby achieve pure fifths; this is the [[minimax tuning]]. Würschmidt is well-supplied with MOS scales, with 10, 13, 16, 19, 22, 25, 28, 31 and 34 note [[MOS]] all possibilities.

== Würschmidt ==

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* [http://micro.soonlabel.com/gene_ward_smith/Others/Freivald/Wurschmidt%5b16%5d-out.mp3 Extrospection] by [https://soundcloud.com/jdfreivald/extrospection Jake Freivald]; Würschmidt[16] tuned in 31EDO.

=== ~~Seven limit children~~ ===

=== Extensions ===

The second comma of the [[~~Normal_lists~~|normal comma list]] defines which 7-limit family member we are looking at. Würschmidt adds {{Monzo|12 3 -6 -1}}, worschmidt adds 65625/65536 = {{Monzo|-16 1 5 1}}, whirrschmidt adds 4375/4374 = {{Monzo|-1 -7 4 1}} and hemiwuerschmidt adds 6144/6125 = {{Monzo|11 1 -3 -2}}.

The second comma of the [[Normal lists #Normal interval list|normal comma list]] defines which 7-limit family member we are looking at. Würschmidt adds {{Monzo|12 3 -6 -1}}, worschmidt adds 65625/65536 = {{Monzo|-16 1 5 1}}, whirrschmidt adds 4375/4374 = {{Monzo|-1 -7 4 1}} and hemiwuerschmidt adds 6144/6125 = {{Monzo|11 1 -3 -2}}.

== Septimal Würschmidt ==

Line 31:

[[Comma list]]: [[225/224]], 8748/8575

[[Mapping]]: [{{val|1 7 3 15}}, {{Val|0 -8 -1 -18}}]

[[Mapping]]: [{{val| 1 7 3 15 }}, {{Val| 0 -8 -1 -18 }}]

[[POTE generator]]: ~5/4 = 387.383

Line 44:

Comma list: 99/98, 176/175, 243/242

Mapping: [{{val|1 7 3 15 17}}, {{val|0 -8 -1 -18 -20}}]

Mapping: [{{val| 1 7 3 15 17 }}, {{val| 0 -8 -1 -18 -20 }}]

POTE generator: ~5/4 = 387.447

Line 57:

Comma list: 99/98, 144/143, 176/175, 275/273

Mapping: [{{val|1 7 3 15 17 1}}, {{val|0 -8 -1 -18 -20 4}}]

Mapping: [{{val| 1 7 3 15 17 1 }}, {{val| 0 -8 -1 -18 -20 4 }}]

POTE generator: ~5/4 = 387.626

Line 70:

Commas: 66/65, 99/98, 105/104, 243/242

Mapping: [{{val|1 7 3 15 17 22}}, {{val|0 -8 -1 -18 -20 -27}}]

Mapping: [{{val| 1 7 3 15 17 22 }}, {{val| 0 -8 -1 -18 -20 -27 }}]

POTE generator: ~5/4 = 387.099

Line 85:

[[Comma list]]: 126/125, 33075/32768

[[Mapping]]: [{{val|1 7 3 -6}}, {{val|0 -8 -1 13}}]

[[Mapping]]: [{{val| 1 7 3 -6 }}, {{val| 0 -8 -1 13 }}]

[[POTE generator]]: ~5/4 = 387.392

Line 98:

Comma list: 126/125, 243/242, 385/384

Mapping: [{{val|1 7 3 -6 17}}, {{val|0 -8 -1 13 -20}}]

Mapping: [{{val| 1 7 3 -6 17 }}, {{val| 0 -8 -1 13 -20 }}]

POTE generator: ~5/4 = 387.407

Line 113:

[[Comma list]]: 4375/4374, 393216/390625

[[Mapping]]: [{{val|1 7 3 38}}, {{val|0 -8 -1 -52}}]

[[Mapping]]: [{{val| 1 7 3 38 }}, {{val| 0 -8 -1 -52 }}]

[[POTE generator]]: ~5/4 = 387.881

Line 128:

[[Comma list]]: 2401/2400, 3136/3125

[[Mapping]]: [{{val|1 15 4 7}}, {{val|0 -16 -2 -5}}]

[[Mapping]]: [{{val| 1 15 4 7 }}, {{val| 0 -16 -2 -5 }}]

[[POTE generator]]: ~28/25 = 193.898

Line 143:

Comma list: 243/242, 441/440, 3136/3125

Mapping: [{{val|1 15 4 7 37}}, {{val|0 -16 -2 -5 -40}}]

Mapping: [{{val| 1 15 4 7 37 }}, {{val| 0 -16 -2 -5 -40 }}]

POTE generator: ~28/25 = 193.840

Line 156:

Comma list: 243/242, 351/350, 441/440, 3584/3575

Mapping: [{{val|1 15 4 7 37 -29}}, {{val|0 -16 -2 -5 -40 39}}]

Mapping: [{{val| 1 15 4 7 37 -29 }}, {{val| 0 -16 -2 -5 -40 39 }}]

POTE generator: ~28/25 = 193.829

Line 169:

Comma list: 121/120, 176/175, 196/195, 275/273

Mapping: [{{val|1 15 4 7 37 -3}}, {{val|0 -16 -2 -5 -40 8}}]

Mapping: [{{val| 1 15 4 7 37 -3 }}, {{val| 0 -16 -2 -5 -40 8 }}]

POTE generator: ~28/25 = 193.918

Line 182:

Comma list: 121/120, 176/175, 1375/1372

Mapping: [{{val|1 15 4 7 11}}, {{val|0 -16 -2 -5 -9}}]

Mapping: [{{val| 1 15 4 7 11 }}, {{val| 0 -16 -2 -5 -9 }}]

POTE generator: ~28/25 = 193.884

Line 195:

Comma list: 121/120, 176/175, 196/195, 275/273

Mapping: [{{val|1 15 4 7 11 -3}}, {{val|0 -16 -2 -5 -9 8}}]

Mapping: [{{val| 1 15 4 7 11 -3 }}, {{val| 0 -16 -2 -5 -9 8 }}]

POTE generator: ~28/25 = 194.004

Line 208:

Comma list: 66/65, 105/104, 121/120, 1375/1372

Mapping: [{{val|1 15 4 7 11 23}}, {{val|0 -16 -2 -5 -9 -23}}]

Mapping: [{{val| 1 15 4 7 11 23 }}, {{val| 0 -16 -2 -5 -9 -23 }}]

POTE generator: ~28/25 = 193.698

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2-Würschmidt, the temperament with all the same commas as Würschmidt but a generator of twice the size, is equivalent to [[skwares]] as a 2.3.7.11 temperament.

[[Category:~~Theory~~]]

[[Category:Regular temperament theory]]

[[Category:Temperament family]]

[[Category:Würschmidt family| ]]

[[Category:Rank 2]]

[[Category:Würschmidt|#]]

@@ Line 1: / Line 1: @@
-The [[5-limit]] parent comma for the '''würschmidt family''' is [[393216/390625]], known as Würschmidt's comma, and named after José Würschmidt, Its [[monzo]] is {{Monzo|17 1 -8}}, and flipping that yields {{Multival|8 1 17}} for the wedgie. This tells us the [[generator]] is a major third, and that to get to the interval class of fifths will require eight of these. In fact, (5/4)<sup>8</sup> * 393216/390625 = 6. 10\31, 11\34 or 21\65 are possible generators and other tunings include 96EDO, 99EDO and 164EDO. Another tuning solution is to sharpen the major third by 1/8th of a Würschmidt comma, which is to say by 1.43 cents, and thereby achieve pure fifths; this is the [[minimax tuning]]. Würschmidt is well-supplied with MOS scales, with 10, 13, 16, 19, 22, 25, 28, 31 and 34 note [[MOS]] all possibilities.
+The [[5-limit]] parent comma for the '''würschmidt family''' is [[393216/390625]], known as Würschmidt's comma, and named after José Würschmidt, Its [[monzo]] is {{monzo| 17 1 -8 }}, and flipping that yields {{multival| 8 1 17 }} for the wedgie. This tells us the [[generator]] is a classic major third, and that to get to the interval class of fifths will require eight of these. In fact, (5/4)<sup>8</sup> × 393216/390625 = 6. 10\31, 11\34 or 21\65 are possible generators and other tunings include 96EDO, 99EDO and 164EDO. Another tuning solution is to sharpen the major third by 1/8th of a Würschmidt comma, which is to say by 1.43 cents, and thereby achieve pure fifths; this is the [[minimax tuning]]. Würschmidt is well-supplied with MOS scales, with 10, 13, 16, 19, 22, 25, 28, 31 and 34 note [[MOS]] all possibilities.
 == Würschmidt ==
@@ Line 21: / Line 21: @@
 * [http://micro.soonlabel.com/gene_ward_smith/Others/Freivald/Wurschmidt%5b16%5d-out.mp3 Extrospection] by [https://soundcloud.com/jdfreivald/extrospection Jake Freivald]; Würschmidt[16] tuned in 31EDO.
-=== Seven limit children ===
+=== Extensions ===
-The second comma of the [[Normal_lists|normal comma list]] defines which 7-limit family member we are looking at. Würschmidt adds {{Monzo|12 3 -6 -1}}, worschmidt adds 65625/65536 = {{Monzo|-16 1 5 1}}, whirrschmidt adds 4375/4374 = {{Monzo|-1 -7 4 1}} and hemiwuerschmidt adds 6144/6125 = {{Monzo|11 1 -3 -2}}.
+The second comma of the [[Normal lists #Normal interval list|normal comma list]] defines which 7-limit family member we are looking at. Würschmidt adds {{Monzo|12 3 -6 -1}}, worschmidt adds 65625/65536 = {{Monzo|-16 1 5 1}}, whirrschmidt adds 4375/4374 = {{Monzo|-1 -7 4 1}} and hemiwuerschmidt adds 6144/6125 = {{Monzo|11 1 -3 -2}}.
 == Septimal Würschmidt ==
@@ Line 31: / Line 31: @@
 [[Comma list]]: [[225/224]], 8748/8575
-[[Mapping]]: [{{val|1 7 3 15}}, {{Val|0 -8 -1 -18}}]
+[[Mapping]]: [{{val| 1 7 3 15 }}, {{Val| 0 -8 -1 -18 }}]
 [[POTE generator]]: ~5/4 = 387.383
@@ Line 44: / Line 44: @@
 Comma list: 99/98, 176/175, 243/242
-Mapping: [{{val|1 7 3 15 17}}, {{val|0 -8 -1 -18 -20}}]
+Mapping: [{{val| 1 7 3 15 17 }}, {{val| 0 -8 -1 -18 -20 }}]
 POTE generator: ~5/4 = 387.447
@@ Line 57: / Line 57: @@
 Comma list: 99/98, 144/143, 176/175, 275/273
-Mapping: [{{val|1 7 3 15 17 1}}, {{val|0 -8 -1 -18 -20 4}}]
+Mapping: [{{val| 1 7 3 15 17 1 }}, {{val| 0 -8 -1 -18 -20 4 }}]
 POTE generator: ~5/4 = 387.626
@@ Line 70: / Line 70: @@
 Commas: 66/65, 99/98, 105/104, 243/242
-Mapping: [{{val|1 7 3 15 17 22}}, {{val|0 -8 -1 -18 -20 -27}}]
+Mapping: [{{val| 1 7 3 15 17 22 }}, {{val| 0 -8 -1 -18 -20 -27 }}]
 POTE generator: ~5/4 = 387.099
@@ Line 85: / Line 85: @@
 [[Comma list]]: 126/125, 33075/32768
-[[Mapping]]: [{{val|1 7 3 -6}}, {{val|0 -8 -1 13}}]
+[[Mapping]]: [{{val| 1 7 3 -6 }}, {{val| 0 -8 -1 13 }}]
 [[POTE generator]]: ~5/4 = 387.392
@@ Line 98: / Line 98: @@
 Comma list: 126/125, 243/242, 385/384
-Mapping: [{{val|1 7 3 -6 17}}, {{val|0 -8 -1 13 -20}}]
+Mapping: [{{val| 1 7 3 -6 17 }}, {{val| 0 -8 -1 13 -20 }}]
 POTE generator: ~5/4 = 387.407
@@ Line 113: / Line 113: @@
 [[Comma list]]: 4375/4374, 393216/390625
-[[Mapping]]: [{{val|1 7 3 38}}, {{val|0 -8 -1 -52}}]
+[[Mapping]]: [{{val| 1 7 3 38 }}, {{val| 0 -8 -1 -52 }}]
 [[POTE generator]]: ~5/4 = 387.881
@@ Line 128: / Line 128: @@
 [[Comma list]]: 2401/2400, 3136/3125
-[[Mapping]]: [{{val|1 15 4 7}}, {{val|0 -16 -2 -5}}]
+[[Mapping]]: [{{val| 1 15 4 7 }}, {{val| 0 -16 -2 -5 }}]
-{{Multival|legend=1|16 2 5 -34 -37 6}}
+{{Multival|legend=1| 16 2 5 -34 -37 6 }}
 [[POTE generator]]: ~28/25 = 193.898
@@ Line 143: / Line 143: @@
 Comma list: 243/242, 441/440, 3136/3125
-Mapping: [{{val|1 15 4 7 37}}, {{val|0 -16 -2 -5 -40}}]
+Mapping: [{{val| 1 15 4 7 37 }}, {{val| 0 -16 -2 -5 -40 }}]
 POTE generator: ~28/25 = 193.840
@@ Line 156: / Line 156: @@
 Comma list: 243/242, 351/350, 441/440, 3584/3575
-Mapping: [{{val|1 15 4 7 37 -29}}, {{val|0 -16 -2 -5 -40 39}}]
+Mapping: [{{val| 1 15 4 7 37 -29 }}, {{val| 0 -16 -2 -5 -40 39 }}]
 POTE generator: ~28/25 = 193.829
@@ Line 169: / Line 169: @@
 Comma list: 121/120, 176/175, 196/195, 275/273
-Mapping: [{{val|1 15 4 7 37 -3}}, {{val|0 -16 -2 -5 -40 8}}]
+Mapping: [{{val| 1 15 4 7 37 -3 }}, {{val| 0 -16 -2 -5 -40 8 }}]
 POTE generator: ~28/25 = 193.918
@@ Line 182: / Line 182: @@
 Comma list: 121/120, 176/175, 1375/1372
-Mapping: [{{val|1 15 4 7 11}}, {{val|0 -16 -2 -5 -9}}]
+Mapping: [{{val| 1 15 4 7 11 }}, {{val| 0 -16 -2 -5 -9 }}]
 POTE generator: ~28/25 = 193.884
@@ Line 195: / Line 195: @@
 Comma list: 121/120, 176/175, 196/195, 275/273
-Mapping: [{{val|1 15 4 7 11 -3}}, {{val|0 -16 -2 -5 -9 8}}]
+Mapping: [{{val| 1 15 4 7 11 -3 }}, {{val| 0 -16 -2 -5 -9 8 }}]
 POTE generator: ~28/25 = 194.004
@@ Line 208: / Line 208: @@
 Comma list: 66/65, 105/104, 121/120, 1375/1372
-Mapping: [{{val|1 15 4 7 11 23}}, {{val|0 -16 -2 -5 -9 -23}}]
+Mapping: [{{val| 1 15 4 7 11 23 }}, {{val| 0 -16 -2 -5 -9 -23 }}]
 POTE generator: ~28/25 = 193.698
@@ Line 264: / Line 264: @@
 -Würschmidt, the temperament with all the same commas as Würschmidt but a generator of twice the size, is equivalent to [[skwares]] as a 2.3.7.11 temperament.
-[[Category:Theory]]
+[[Category:Regular temperament theory]]
 [[Category:Temperament family]]
 [[Category:Würschmidt family| ]] <!-- main article -->
+[[Category:Rank 2]]
 [[Category:Würschmidt|#]] <!-- list on top of cat -->