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94edo

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Prime factorization

2 × 47

Step size

12.766 ¢

Fifth

55\94 (702.128 ¢)
(semiconvergent)

Semitones (A1:m2)

9:7 (114.9 ¢ : 89.36 ¢)

Consistency limit

23

Distinct consistency limit

13

94 equal divisions of the octave (abbreviated 94edo or 94ed2), also called 94-tone equal temperament (94tet) or 94 equal temperament (94et) when viewed under a regular temperament perspective, is the tuning system that divides the octave into 94 equal parts of about 12.8 ¢ each. Each step represents a frequency ratio of 2^1/94, or the 94th root of 2.

Theory

94edo is a remarkable all-around utility tuning system, good from low prime limit to very high prime limit situations. It is the first edo to be consistent through the 23-odd-limit, and no other edo is so consistent until 282 and 311 make their appearance.

Its step size is close to that of 144/143, which is consistently represented in this tuning system.

As a tuning of other temperaments

94edo can also be thought of as the "sum" of 41edo and 53edo (41 + 53 = 94), both of which are not only known for their approximation of Pythagorean tuning, but also support a variety of schismatic temperament known as cassandra (which is itself a variety of garibaldi), tempering out 32805/32768, 225/224, and 385/384. Therefore, 94edo's fifth is the mediant of these two edos' fifths; it is slightly sharp of just and less accurate than 53edo's fifth, but more accurate than 41edo's, and acts as a generator for a highly optimized and high-prime-limit form of cassandra. Few, if any, edos that support schismatic by patent val have at least as high of a consistency limit as 94edo while also having a fifth that can stack to reach any interval in it.

The list of 23-limit commas it tempers out is huge, and in lower prime limits, it also tempers out 3125/3087, 4000/3969, 5120/5103 and 540/539. It provides the optimal patent val for gassormic, the rank-5 temperament tempering out 275/273 (despite one edostep being very close in size to this comma), and for a number of other temperaments, such as isis.

94edo is an excellent edo for Carlos Beta scale, since the difference between 1 step of Carlos Beta and 5 steps of 94edo is only 0.00314534 cents.

Prime harmonics

Approximation of prime harmonics in 94edo
Harmonic		2	3	5	7	11	13	17	19	23	29	31
Error	Absolute (¢)	+0.00	+0.17	-3.33	+1.39	-2.38	+2.03	-2.83	-3.90	-2.74	+4.47	+3.90
Error	Relative (%)	+0.0	+1.4	-26.1	+10.9	-18.7	+15.9	-22.2	-30.5	-21.5	+35.0	+30.6
Steps (reduced)		94 (0)	149 (55)	218 (30)	264 (76)	325 (43)	348 (66)	384 (8)	399 (23)	425 (49)	457 (81)	466 (90)

Subsets and supersets

Since 94 factors into primes as 2 × 47, 94edo contains 2edo and 47edo as subset edos. It can be thought of as two sets of 47edo offset by one step of 94edo. It inherits from 47edo's good approximations of primes 5, 7, 13, and 17, while dramatically improving on prime 3, as well as primes 11, 19, and 23 to a lesser degree.

Intervals

See also: Table of 94edo intervals

Assuming 23-limit patent val ⟨94 149 218 264 325 348 384 399 425], here is a table of intervals as approximated by 94edo steps, and their corresponding 13-limit well-ordered extended diatonic interval names. 'S/s' indicates alteration by the septimal comma, 64/63; 'K/k' indicates alteration by the syntonic comma, 81/80; 'U/u' by the undecimal quartertone, 33/32; 'L/l' by pentacircle comma, 896/891; 'O/o' by 45/44; 'R/r' by the rastma, 243/242; 'T/t' by the tridecimal quartertone, 1053/1024; and finally, 'H/h', by 40/39. Capital letters alter downward, lowercase alter upwards. Important 13-limit intervals approximated that are not associated with the extended diatonic interval names are added in brackets. Multiple alterations by 'K' down from augmented and major, or up from diminished and minor intervals are also added in brackets, along with their associated (5-limit) intervals.

Step	Cents	13-limit	23-limit	Ups and downs	Short-form WOFED	Long-form WOFED	Diatonic
0	0	1/1		D
1	12.766	896/891, 243/242, (3125/3072, 245/243, 100/99, 99/98)	85/84	^D, ^³E♭♭	L1, R1	large unison, rastma
2	25.532	81/80, 64/63, (50/49)		^^D, ^⁴E♭♭	K1, S1	komma, super unison
3	38.298	45/44, 40/39, (250/243, 49/48)	46/45	^³D, v⁴E♭	O1, H1	on unison, hyper unison
4	51.064	33/32, (128/125, 36/35, 35/34, 34/33)		^⁴D, v³E♭	U1, T1, hm2	uber unison, tall unison, hypo minor second
5	63.830	28/27, 729/704, 27/26, (25/24)		v⁴D♯, vvE♭	sm2, uA1, tA1, (kkA1)	sub minor second, unter augmented unison, tiny augmented unison, (classic augmented unison)	dd3
6	76.596	22/21, (648/625, 26/25)	23/22, 24/23	v³D♯, vE♭	lm2, oA1	little minor second, off augmented unison
7	89.362	256/243, 135/128, (21/20)	19/18, 20/19	vvD♯, E♭	m2, kA1	minor second, komma-down augmented unison	m2
8	102.128	128/121, (35/33)	17/16, 18/17	vD♯, ^E♭	Rm2, rA1	rastmic minor second, rastmic augmented unison
9	114.894	16/15, (15/14)		D♯, ^^E♭	Km2, A1	classic minor second, augmented unison	A1
10	127.660	320/297, 189/176, (14/13)		^D♯, ^³E♭	Om2, LA1	oceanic minor second, large augmented unison
11	140.426	88/81, 13/12, 243/224, (27/25)	25/23, 38/35	^^D♯, ^⁴E♭	n2, Tm2, SA1, (KKm2)	lesser neutral second, tall minor second, super augmented unison, (2-komma-up minor second)
12	153.191	12/11, (35/32)	23/21	^³D♯, v⁴E	N2, tM2, HA1	greater netral second, tiny major second, hyper augmented unison	ddd4
13	165.957	11/10		^⁴D♯, v³E	oM2	off major second
14	178.723	10/9	21/19	v⁴D𝄪, vvE	kM2	komma-down major second	d3
15	191.489	121/108, (49/44, 39/35)	19/17	v³D𝄪, vE	rM2	rastmic major second
16	204.255	9/8		E	M2	major second	M2
17	217.021	112/99, (25/22)	17/15, 26/23	^E, ^³F♭	LM2	large major second
18	229.787	8/7		^^E, ^⁴F♭	SM2	super major second	AA1
19	242.553	15/13	23/20, 38/33	^³E, v⁴F	HM2	hyper major second
20	255.319	52/45	22/19	^⁴E, v³F	hm3	hypo minor third
21	268.085	7/6, (75/64)		v⁴E♯, vvF	sm3, (kkA2)	sub minor third, (classic augmented second)	dd4
22	280.851	33/28	20/17, 27/23	v³E♯, vF	lm3	little minor third
23	293.617	32/27, (25/21, 13/11)	19/16	F	m3	minor third	m3
24	306.383	144/121, (81/70)		^F, ^³G♭♭	Rm3	rastmic minor third
25	319.149	6/5		^^F, ^⁴G♭♭	Km3	classic minor third	A2
26	331.915	40/33	17/14, 23/19	^³F, v⁴G♭	Om3	on minor third
27	344.681	11/9, 39/32, (243/200, 60/49)	28/23	^⁴F, v³G♭	n3, Tm3	lesser neutral third, tall minor third	AAA1
28	357.447	27/22, 16/13, (100/81,49/40)		v⁴F♯, vvG♭	N3, tM3	greater neutral third, tiny major third	ddd5
29	370.213	99/80, (26/21)	21/17	v³F♯, vG♭	oM3	off major third
30	382.979	5/4		vvF♯, G♭	kM3	classic major third	d4
31	395.745	121/96, (34/27)		vF♯, ^G♭	rM3	rastmic major third
32	408.511	81/64, (33/26)	19/15, 24/19	F♯, ^^G♭	M3	major third	M3
33	421.277	14/11	23/18	^F♯, ^³G♭	LM3	large major third
34	434.043	9/7, (32/25)		^^F♯, ^⁴G♭	SM3, (KKd4)	super major third, (classic diminished fourth)	AA2
35	446.809	135/104, (35/27)	22/17	^³F♯, v⁴G	HM3	hyper major third	ddd6
36	459.574	13/10	17/13, 30/23	^⁴F♯, v³G	h4	hypo fourth
37	472.340	21/16	25/19, 46/35	v⁴F𝄪, vvG	s4	sub fourth	dd5
38	485.106	297/224		v³F𝄪, vG	l4	little fourth
39	497.872	4/3		G	P4	perfect fourth	P4
40	510.638	162/121, (35/26)		^G, ^³A♭♭	R4	rastmic fourth
41	523.404	27/20	19/14, 23/17	^^G, ^⁴A♭♭	K4	komma-up fourth	A3
42	536.170	15/11	34/25	^³G, v⁴A♭	O4	on fourth
43	548.936	11/8	26/19	^⁴G, v³A♭	U4, T4	uber/undecimal fourth, tall fourth	AAA2
44	561.702	18/13, (25/18)		v⁴G♯, vvA♭	tA4, uA4, (kkA4)	tiny augmented fourth, unter augmented fourth, (classic augmented fourth)	dd6
45	574.468	88/63	32/23, 46/33	v³G♯, vA♭	ld5, oA4	little diminished fifth, off augmented fourth
46	587.234	45/32, (7/5)	38/27	vvG♯, A♭	kA4	komma-down augmented fourth	d5
47	600.000	363/256, 512/363, (99/70)	17/12, 24/17	vG♯, ^A♭	rA4, Rd5	rastmic augmented fourth, rastmic diminished fifth
48	612.766	64/45, (10/7)	27/19	G♯, ^^A♭	Kd5	komma-up diminished fifth	A4
49	625.532	63/44	23/16, 33/23	^G♯, ^³A♭	LA4, Od5	large augmented fourth, off diminished fifth
50	638.298	13/9, (36/25)		^^G♯, ^⁴A♭	Td5, Ud5, (KKd5)	tall diminished fifth, uber diminished fifth, (classic diminished fifth)	AA3
51	651.064	16/11	19/13	^³G♯, v⁴A	u5, t5	unter/undecimal fifth, tiny fifth	ddd7
52	663.830	22/15	25/17	^⁴G♯, v³A	o5	off fifth
53	676.596	40/27	28/19, 34/23	v⁴G𝄪, vvA	k5	komma-down fifth	d6
54	689.362	121/81, (52/35)		v³G𝄪, vA	r5	rastmic fifth
55	702.128	3/2		A	P5	perfect fifth	P5
56	714.894	448/297		^A, ^³B♭♭	L5	large fifth
57	727.660	32/21	38/25, 35/23	^^A, ^⁴B♭♭	S5	super fifth	AA4
58	740.426	20/13	26/17, 23/15	^³A, v⁴B♭	H5	hyper fifth
59	753.191	208/135	17/11	^⁴A, v³B♭	hm6	hypo minor sixth	AAA3
60	765.957	14/9, (25/16)		v⁴A♯, vvB♭	sm6, (kkA5)	sub minor sixth, (classic augmented fifth)	dd7
61	778.723	11/7	36/23	v³A♯, vB♭	lm6	little minor sixth
62	791.489	128/81	19/12, 30/19	vvA♯, B♭	m6	minor sixth	m6
63	804.255	192/121	27/17	vA♯, ^B♭	Rm6	rastmic minor sixth
64	817.021	8/5		A♯, ^^B♭	Km6	classic minor sixth	A5
65	829.787	160/99, (21/13)	34/21	^A♯, ^³B♭	Om6	on minor sixth
66	842.553	44/27, 13/8, (81/50, 80/49)		^^A♯, ^⁴B♭	n6, Tm6	less neutral sixth, tall minor sixth	AAA4
67	855.319	18/11, 64/39, (400/243, 49/30)	23/14	^³A♯, v⁴B	N6, tM6	greater neutral sixth, tiny minor sixth	ddd8
68	868.085	33/20	28/17, 38/23	^⁴A♯, v³B	oM6	off major sixth
69	880.851	5/3		v⁴A𝄪, vvB	kM6	classic major sixth	d7
70	893.617	121/72		v³A𝄪, vB	rM6	rastmic major sixth
71	906.383	27/16, (42/35, 22/13)	32/19	B	M6	major sixth	M6
72	919.149	56/33	17/10, 46/27	^B, ^³C♭	LM6	large major sixth
73	931.915	12/7, (128/75)		^^B, ^⁴C♭	SM6, (KKd7)	super major sixth (classic diminished seventh)	AA5
74	944.681	45/26	19/11	^³B, v⁴C	HM6	hyper major sixth
75	957.447	26/15	40/23, 33/19	^⁴B, v³C	hm7	hypo minor seventh
76	970.213	7/4		v⁴B♯, vvC	sm7	sub minor seventh	dd8
77	982.979	99/56, (44/25)	30/17, 23/13	v³B♯, vC	lm7	little minor seventh
78	995.745	16/9		C	m7	minor seventh	m7
79	1008.511	216/121	34/19	^C, ^³D♭♭	Rm7	rastmic minor seventh
80	1021.277	9/5	38/21	^^C, ^⁴D♭♭	Km7	classic minor seventh	A6
81	1034.043	20/11		^³C, v⁴D♭	Om7	on minor seventh
82	1046.809	11/6, (64/35)	42/23	^⁴C, v³D♭	n7, Tm7, hd8	less neutral seventh, tall minor seventh, hypo diminished octave	AAA5
83	1059.574	81/44, 24/13, (50/27)	46/25, 35/19	v⁴C♯, vvD♭	N7, tM7, sd8, (kkM7)	greater neutral seventh, tiny major seventh, sub diminished octave, (2-comma down major seventh)
84	1072.340	297/160, 144/91, (13/7)		v³C♯, vD♭	oM7, ld8	off major seventh, little diminished octave
85	1085.106	15/8, (28/15)		vvC♯, D♭	kM7, d8	classic major seventh, diminished octave	d8
86	1097.872	121/64	32/17, 17/9	vC♯, ^D♭	rM7, Rd8	rastmic major seventh, rastmic diminished octave
87	1110.638	243/128, 256/135, (40/21)	36/19, 19/10	C♯, ^^D♭	M7, Kd8	major seventh, komma-up diminished octave	M7
88	1123.404	21/11, (25/13)	44/23, 23/12	^C♯, ^³D♭	LM7, Od8	large major seventh, on diminished octave
89	1136.170	27/14, 52/27, (48/25)		^^C♯, ^⁴D♭	SM7, Td8, Ud8, (KKd8)	super major seventh, tall diminished octave, unter diminished octave, (classic diminished octave)	AA6
90	1148.936	64/33, (35/18, 68/35, 33/17)	33/17	^³C♯, v⁴D	u8, t8, HM7	unter octave, tiny octave, hyper major seventh
91	1161.702	88/45, 39/20	45/23	^⁴C♯, v³D	o8, h8	off octave, hypo octave
92	1174.468	160/81, 63/32, (49/25)		v⁴C𝄪, vvD	k8, s8	komma-down octave, sub octave
93	1187.234	891/448, 484/243, (486/245, 99/50, 196/99)		v³C𝄪, vD	l8, r8	little octave, octave - rastma
94	1200.000	2/1		D	P8	perfect octave	P8

There are perhaps nine functional minor thirds varying between 242.553 cents and 344.681 cents, and one can even go beyond those boundaries under the right conditions, so musicians playing in 94edo have a lot more flexibility in terms of the particular interval shadings they might use depending on context.

The perfect fifth has three, or perhaps even five, functional options, each differing by one step. The lower and higher variants provide a change in interval quality, and can be helpful in creating subsets which mimic other edos, and close the circle of fifths in different numbers of pitches. For example, a close approximation to 41edo can be made using a chain of forty 702.128 cent fifths and one wide fifth at 714.894 cents, with an improvement on the tuning of most simple consonances in close keys, but a 1-step variation in interval quality as one modulates to more distant keys.

Every odd-numbered interval can generate the entire tuning of 94edo except for the 600-cent tritone (47\94), which divides the octave exactly in half.

The regular major second divisible into 16 equal parts can be helpful for realising some of the subtle tunings of Ancient Greek tetrachordal theory, Indian raga and Turkish maqam, though it has not been used historically as a division in those musical cultures.

While having the whole gamut of 94 intervals available on a keyboard or other instrument would be quite a feat, one can get a lot out of a 41-tone chain of fifths (with the odd fifth one degree wide) or a 53-tone chain of fifths (with the odd fifth one degree narrow), where the subset behaves much like a well-temperament, arguably usable in all keys but with some interval size variation between closer and more distant keys.

Notation

94edo can be notated in Sagittal using the Athenian extension, with the apotome equating to 9 edosteps and the limma to 7 edosteps.

Degree	−9	−8	−7	−6	−5	−4	−3	−2	−1	0	+1	+2	+3	+4	+5	+6	+7	+8	+9
Evo	⁠ ⁠	⁠ ⁠⁠ ⁠	⁠ ⁠⁠ ⁠	⁠ ⁠⁠ ⁠	⁠ ⁠⁠ ⁠	⁠ ⁠	⁠ ⁠	⁠ ⁠	⁠ ⁠	⁠ ⁠	⁠ ⁠	⁠ ⁠	⁠ ⁠	⁠ ⁠	⁠ ⁠⁠ ⁠	⁠ ⁠⁠ ⁠	⁠ ⁠⁠ ⁠	⁠ ⁠⁠ ⁠	⁠ ⁠
Revo	⁠ ⁠	⁠ ⁠	⁠ ⁠	⁠ ⁠	⁠ ⁠	⁠ ⁠	⁠ ⁠	⁠ ⁠	⁠ ⁠	⁠ ⁠	⁠ ⁠	⁠ ⁠	⁠ ⁠	⁠ ⁠	⁠ ⁠	⁠ ⁠	⁠ ⁠	⁠ ⁠	⁠ ⁠

Regular temperament properties

Subgroup	Comma list	Mapping	Optimal 8ve stretch (¢)	Tuning error
Subgroup	Comma list	Mapping	Optimal 8ve stretch (¢)	Absolute (¢)	Relative (%)
2.3	[149 -94⟩	[⟨94 149]]	−0.054	0.054	0.43
2.3.5	32805/32768, 9765625/9565938	[⟨94 149 218]]	+0.442	0.704	5.52
2.3.5.7	225/224, 3125/3087, 118098/117649	[⟨94 149 218 264]]	+0.208	0.732	5.74
2.3.5.7.11	225/224, 385/384, 1331/1323, 2200/2187	[⟨94 149 218 264 325]]	+0.304	0.683	5.35
2.3.5.7.11.13	225/224, 275/273, 325/324, 385/384, 1331/1323	[⟨94 149 218 264 325 348]]	+0.162	0.699	5.48
2.3.5.7.11.13.17	170/169, 225/224, 275/273, 289/288, 325/324, 385/384	[⟨94 149 218 264 325 348 384]]	+0.238	0.674	5.28
2.3.5.7.11.13.17.19	170/169, 190/189, 225/224, 275/273, 289/288, 325/324, 385/384	[⟨94 149 218 264 325 348 384 399]]	+0.323	0.669	5.24
2.3.5.7.11.13.17.19.23	170/169, 190/189, 209/208, 225/224, 275/273, 289/288, 300/299, 323/322	[⟨94 149 218 264 325 348 384 399 425]]	+0.354	0.637	4.99

94et is lower in relative error than any previous equal temperaments in the 23-limit, and the next equal temperament that does better in this subgroup is 190g.

Rank-2 temperaments

Table of rank-2 temperaments by generator
Periods per 8ve	Generator*	Cents*	Associated ratio*	Temperament
1	3\94	38.30	49/48	Slender
1	5\94	63.83	25/24	Betic
1	11\94	140.43	243/224	Tsaharuk / quanic
1	13\94	165.96	11/10	Tertiaschis
1	19\94	242.55	147/128	Septiquarter
1	39\94	497.87	4/3	Garibaldi / cassandra
2	2\94	25.53	64/63	Ketchup
2	11\94	140.43	27/25	Fifive
2	30\94	382.98	5/4	Wizard / gizzard
2	34\94	434.04	9/7	Pogo / supers
2	43\94	548.94	11/8	Kleischismic

* Octave-reduced form, reduced to the first half-octave, and minimal form in parentheses if distinct

Below are some 23-limit temperaments supported by 94et. It might be noted that 94, a very good tuning for garibaldi temperament, shows us how to extend it to the 23-limit.

46 & 94
68 & 94
53 & 94 (one garibaldi)
41 & 94 (another garibaldi, only differing in the mappings of 17 and 23)
135 & 94 (another garibaldi)
130 & 94 (a pogo extension)
58 & 94 (a supers extension)
50 & 94
72 & 94 (a gizzard extension)
80 & 94
94 solo (a rank one temperament!)

Temperaments to which 94et can be detempered:

Satin (94 & 311)
94 & 422

Scales

Instruments

94edo can be played on the Lumatone, although due to the sheer number of notes it does require compromises in either the range or gamut:

Lumatone mapping for 94edo

One can also use a skip fretting system:

Skip fretting system 94 7 16

Music

Bryan Deister

microtonal improvisation in 94edo (2025)

Cam Taylor

94edo: Difference between revisions

Latest revision as of 00:26, 16 August 2025

Contents

Theory

As a tuning of other temperaments

Prime harmonics

Subsets and supersets

Intervals

Notation

Regular temperament properties

Rank-2 temperaments

Scales

Instruments

Music

Navigation menu

@@ Line 1: / Line 1: @@
 {{Infobox ET}}
-{{EDO intro|94}}
+{{ED intro}}
 == Theory ==
@@ Line 7: / Line 7: @@
 Its step size is close to that of [[144/143]], which is consistently represented in this tuning system.
-edo can be thought of as two sets of [[47edo]] offset by one step of 94edo. It inherits from 47edo's good approximations of primes 5, 7, 13, and 17, while it dramatically improves on prime 3, as well as primes 11, 19, and 23 to a lesser degree.
+=== As a tuning of other temperaments ===
-=== Significance of cassandra ===
 edo can also be thought of as the "sum" of [[41edo]] and [[53edo]] {{nowrap|(41 + 53 {{=}} 94)}}, both of which are not only known for their approximation of [[Pythagorean tuning]], but also support a variety of [[Schismatic family|schismatic temperament]] known as [[Schismatic family#Cassandra|cassandra]] (which is itself a variety of [[Schismatic family#Garibaldi|garibaldi]]), tempering out [[32805/32768]], [[225/224]], and [[385/384]]. Therefore, 94edo's fifth is the [[mediant]] of these two edos' fifths; it is slightly sharp of just and less accurate than 53edo's fifth, but more accurate than 41edo's, and acts as a generator for a highly optimized and high-prime-limit form of cassandra. Few, if any, edos that support schismatic by [[Val|patent val]] have at least as high of a consistency limit as 94edo while also having a fifth that can stack to reach any interval in it.
-=== Other temperament properties ===
 The list of 23-limit commas it tempers out is huge, and in lower prime limits, it also tempers out [[3125/3087]], [[4000/3969]], [[5120/5103]] and [[540/539]]. It provides the [[optimal patent val]] for gassormic, the rank-5 temperament tempering out [[275/273]] (despite one edostep being very close in size to this comma), and for a number of other temperaments, such as [[isis]].
@@ Line 19: / Line 16: @@
 === Prime harmonics ===
 {{Harmonics in equal|94|columns=11}}
+=== Subsets and supersets ===
+Since 94 factors into primes as {{nowrap| 2 × 47 }}, 94edo contains [[2edo]] and [[47edo]] as subset edos. It can be thought of as two sets of 47edo offset by one step of 94edo. It inherits from 47edo's good approximations of primes 5, 7, 13, and 17, while dramatically improving on prime 3, as well as primes 11, 19, and 23 to a lesser degree.
 == Intervals ==
@@ Line 25: / Line 25: @@
 Assuming [[23-limit]] [[patent val]] {{val| 94 149 218 264 325 348 384 399 425 }}, here is a table of intervals as approximated by [[94edo]] steps, and their corresponding 13-limit well-ordered extended diatonic interval names. 'S/s' indicates alteration by the septimal comma, [[64/63]]; 'K/k' indicates alteration by the syntonic comma, [[81/80]]; 'U/u' by the undecimal quartertone, [[33/32]]; 'L/l' by pentacircle comma, [[896/891]]; 'O/o' by [[45/44]]; 'R/r' by the rastma, [[243/242]]; 'T/t' by the tridecimal quartertone, [[1053/1024]]; and finally, 'H/h', by [[40/39]]. Capital letters alter downward, lowercase alter upwards. Important 13-limit intervals approximated that are not associated with the extended diatonic interval names are added in brackets. Multiple alterations by 'K' down from augmented and major, or up from diminished and minor intervals are also added in brackets, along with their associated (5-limit) intervals.
-{| class="wikitable"
+{| class="wikitable  center-5"
-|+ style="font-size: 105%;" | 94edo [[SKULO interval names#WOFED interval names|WOFED interval names]]
 |-
 ! Step
@@ Line 32: / Line 31: @@
 ! 13-limit
 ! 23-limit
-! Short-form WOFED
+![[Ups and downs notation|Ups and downs]]
+! Short-form [[SKULO interval names#WOFED interval names|WOFED]]
 ! Long-form WOFED
 ! Diatonic
+|-
+|0
+|0
+|1/1
+|
+|{{UDnote|step=0}}
+|
+|
+|
 |-
 | 1
@@ Line 40: / Line 49: @@
 | 896/891, 243/242, (3125/3072, 245/243, 100/99, 99/98)
 | 85/84
+|{{UDnote|step=1}}
 | L1, R1
 | large unison, rastma
 |
 |-
 | 2
 | 25.532
 | 81/80, 64/63, (50/49)
 |
+|{{UDnote|step=2}}
 | K1, S1
 | komma, super unison
 |
 |-
 | 3
@@ Line 56: / Line 67: @@
 | 45/44, 40/39, (250/243, 49/48)
 | 46/45
+|{{UDnote|step=3}}
 | O1, H1
 | on unison, hyper unison
 |
 |-
 | 4
 | 51.064
 | 33/32, (128/125, 36/35, 35/34, 34/33)
 |
+|{{UDnote|step=4}}
 | U1, T1, hm2
 | uber unison, tall unison, hypo minor second
 |
 |-
 | 5
 | 63.830
 | 28/27, 729/704, 27/26, (25/24)
 |
+|{{UDnote|step=5}}
 | sm2, uA1, tA1, (kkA1)
 | sub minor second, unter augmented unison, tiny augmented unison, (classic augmented unison)
@@ Line 80: / Line 94: @@
 | 22/21, (648/625, 26/25)
 | 23/22, 24/23
+|{{UDnote|step=6}}
 | lm2, oA1
 | little minor second, off augmented unison
 |
 |-
 | 7
@@ Line 88: / Line 103: @@
 | 256/243, 135/128, (21/20)
 | 19/18, 20/19
+|{{UDnote|step=7}}
 | m2, kA1
 | minor second, komma-down augmented unison
@@ Line 96: / Line 112: @@
 | 128/121, (35/33)
 | 17/16, 18/17
+|{{UDnote|step=8}}
 | Rm2, rA1
 | rastmic minor second, rastmic augmented unison
 |
 |-
 | 9
 | 114.894
 | 16/15, (15/14)
 |
+|{{UDnote|step=9}}
 | Km2, A1
 | classic minor second, augmented unison
@@ Line 111: / Line 129: @@
 | 127.660
 | 320/297, 189/176, (14/13)
 |
+|{{UDnote|step=10}}
 | Om2, LA1
 | oceanic minor second, large augmented unison
 |
 |-
 | 11
@@ Line 120: / Line 139: @@
 | 88/81, 13/12, 243/224, (27/25)
 | 25/23, 38/35
+|{{UDnote|step=11}}
 | n2, Tm2, SA1, (KKm2)
 | lesser neutral second, tall minor second, super augmented unison, (2-komma-up minor second)
 |
 |-
 | 12
@@ Line 128: / Line 148: @@
 | 12/11, (35/32)
 | 23/21
+|{{UDnote|step=12}}
 | N2, tM2, HA1
 | greater netral second, tiny major second, hyper augmented unison
@@ Line 135: / Line 156: @@
 | 165.957
 | 11/10
 |
+|{{UDnote|step=13}}
 | oM2
 | off major second
 |
 |-
 | 14
@@ Line 144: / Line 166: @@
 | 10/9
 | 21/19
+|{{UDnote|step=14}}
 | kM2
 | komma-down major second
@@ Line 152: / Line 175: @@
 | 121/108, (49/44, 39/35)
 | 19/17
+|{{UDnote|step=15}}
 | rM2
 | rastmic major second
 |
 |-
 | 16
 | 204.255
 | 9/8
 |
+|{{UDnote|step=16}}
 | M2
 | major second
@@ Line 168: / Line 193: @@
 | 112/99, (25/22)
 | 17/15, 26/23
+|{{UDnote|step=17}}
 | LM2
 | large major second
 |
 |-
 | 18
 | 229.787
 | 8/7
 |
+|{{UDnote|step=18}}
 | SM2
 | super major second
@@ Line 184: / Line 211: @@
 | 15/13
 | 23/20, 38/33
+|{{UDnote|step=19}}
 | HM2
 | hyper major second
 |
 |-
 | 20
@@ Line 192: / Line 220: @@
 | 52/45
 | 22/19
+|{{UDnote|step=20}}
 | hm3
 | hypo minor third
 |
 |-
 | 21
 | 268.085
 | 7/6, (75/64)
 |
+|{{UDnote|step=21}}
 | sm3, (kkA2)
 | sub minor third, (classic augmented second)
@@ Line 208: / Line 238: @@
 | 33/28
 | 20/17, 27/23
+|{{UDnote|step=22}}
 | lm3
 | little minor third
 |
 |-
 | 23
@@ Line 216: / Line 247: @@
 | 32/27, (25/21, 13/11)
 | 19/16
+|{{UDnote|step=23}}
 | m3
 | minor third
@@ Line 223: / Line 255: @@
 | 306.383
 | 144/121, (81/70)
 |
+|{{UDnote|step=24}}
 | Rm3
 | rastmic minor third
 |
 |-
 | 25
 | 319.149
 | 6/5
 |
+|{{UDnote|step=25}}
 | Km3
 | classic minor third
@@ Line 240: / Line 274: @@
 | 40/33
 | 17/14, 23/19
+|{{UDnote|step=26}}
 | Om3
 | on minor third
 |
 |-
 | 27
@@ Line 248: / Line 283: @@
 | 11/9, 39/32, (243/200, 60/49)
 | 28/23
+|{{UDnote|step=27}}
 | n3, Tm3
 | lesser neutral third, tall minor third
@@ Line 255: / Line 291: @@
 | 357.447
 | 27/22, 16/13, (100/81,49/40)
 |
+|{{UDnote|step=28}}
 | N3, tM3
 | greater neutral third, tiny major third
@@ Line 264: / Line 301: @@
 | 99/80, (26/21)
 | 21/17
+|{{UDnote|step=29}}
 | oM3
 | off major third
 |
 |-
 | 30
 | 382.979
 | 5/4
 |
+|{{UDnote|step=30}}
 | kM3
 | classic major third
@@ Line 279: / Line 318: @@
 | 395.745
 | 121/96, (34/27)
 |
+|{{UDnote|step=31}}
 | rM3
 | rastmic major third
 |
 |-
 | 32
@@ Line 288: / Line 328: @@
 | 81/64, (33/26)
 | 19/15, 24/19
+|{{UDnote|step=32}}
 | M3
 | major third
@@ Line 296: / Line 337: @@
 | 14/11
 | 23/18
+|{{UDnote|step=33}}
 | LM3
 | large major third
 |
 |-
 | 34
 | 434.043
 | 9/7, (32/25)
 |
+|{{UDnote|step=34}}
 | SM3, (KKd4)
 | super major third, (classic diminished fourth)
@@ Line 312: / Line 355: @@
 | 135/104, (35/27)
 | 22/17
+|{{UDnote|step=35}}
 | HM3
 | hyper major third
@@ Line 320: / Line 364: @@
 | 13/10
 | 17/13, 30/23
+|{{UDnote|step=36}}
 | h4
 | hypo fourth
 |
 |-
 | 37
@@ Line 328: / Line 373: @@
 | 21/16
 | 25/19, 46/35
+|{{UDnote|step=37}}
 | s4
 | sub fourth
@@ Line 335: / Line 381: @@
 | 485.106
 | 297/224
 |
+|{{UDnote|step=38}}
 | l4
 | little fourth
 |
 |-
 | 39
 | 497.872
 | 4/3
 |
+|{{UDnote|step=39}}
 | P4
 | perfect fourth
@@ Line 351: / Line 399: @@
 | 510.638
 | 162/121, (35/26)
 |
+|{{UDnote|step=40}}
 | R4
 | rastmic fourth
 |
 |-
 | 41
@@ Line 360: / Line 409: @@
 | 27/20
 | 19/14, 23/17
+|{{UDnote|step=41}}
 | K4
 | komma-up fourth
@@ Line 368: / Line 418: @@
 | 15/11
 | 34/25
+|{{UDnote|step=42}}
 | O4
 | on fourth
 |
 |-
 | 43
@@ Line 376: / Line 427: @@
 | 11/8
 | 26/19
+|{{UDnote|step=43}}
 | U4, T4
 | uber/undecimal fourth, tall fourth
@@ Line 383: / Line 435: @@
 | 561.702
 | 18/13, (25/18)
 |
+|{{UDnote|step=44}}
 | tA4, uA4, (kkA4)
 | tiny augmented fourth, unter augmented fourth, (classic augmented fourth)
@@ Line 392: / Line 445: @@
 | 88/63
 | 32/23, 46/33
+|{{UDnote|step=45}}
 | ld5, oA4
 | little diminished fifth, off augmented fourth
 |
 |-
 | 46
@@ Line 400: / Line 454: @@
 | 45/32, (7/5)
 | 38/27
+|{{UDnote|step=46}}
 | kA4
 | komma-down augmented fourth
@@ Line 408: / Line 463: @@
 | 363/256, 512/363, (99/70)
 | 17/12, 24/17
+|{{UDnote|step=47}}
 | rA4, Rd5
 | rastmic augmented fourth, rastmic diminished fifth
 |
 |-
 | 48
@@ Line 416: / Line 472: @@
 | 64/45, (10/7)
 | 27/19
+|{{UDnote|step=48}}
 | Kd5
 | komma-up diminished fifth
@@ Line 424: / Line 481: @@
 | 63/44
 | 23/16, 33/23
+|{{UDnote|step=49}}
 | LA4, Od5
 | large augmented fourth, off diminished fifth
 |
 |-
 | 50
 | 638.298
 | 13/9, (36/25)
 |
+|{{UDnote|step=50}}
 | Td5, Ud5, (KKd5)
 | tall diminished fifth, uber diminished fifth, (classic diminished fifth)
@@ Line 440: / Line 499: @@
 | 16/11
 | 19/13
+|{{UDnote|step=51}}
 | u5, t5
 | unter/undecimal fifth, tiny fifth
@@ Line 448: / Line 508: @@
 | 22/15
 | 25/17
+|{{UDnote|step=52}}
 | o5
 | off fifth
 |
 |-
 | 53
@@ Line 456: / Line 517: @@
 | 40/27
 | 28/19, 34/23
+|{{UDnote|step=53}}
 | k5
 | komma-down fifth
@@ Line 463: / Line 525: @@
 | 689.362
 | 121/81, (52/35)
 |
+|{{UDnote|step=54}}
 | r5
 | rastmic fifth
 |
 |-
 | 55
 | 702.128
 | 3/2
 |
+|{{UDnote|step=55}}
 | P5
 | perfect fifth
@@ Line 479: / Line 543: @@
 | 714.894
 | 448/297
 |
+|{{UDnote|step=56}}
 | L5
 | large fifth
 |
 |-
 | 57
@@ Line 488: / Line 553: @@
 | 32/21
 | 38/25, 35/23
+|{{UDnote|step=57}}
 | S5
 | super fifth
@@ Line 496: / Line 562: @@
 | 20/13
 | 26/17, 23/15
+|{{UDnote|step=58}}
 | H5
 | hyper fifth
 |
 |-
 | 59
@@ Line 504: / Line 571: @@
 | 208/135
 | 17/11
+|{{UDnote|step=59}}
 | hm6
 | hypo minor sixth
@@ Line 510: / Line 578: @@
 | 60
 | 765.957
-| 14/9, (128/75)
+| 14/9, (25/16)
 |
+|{{UDnote|step=60}}
 | sm6, (kkA5)
 | sub minor sixth, (classic augmented fifth)
@@ Line 520: / Line 589: @@
 | 11/7
 | 36/23
+|{{UDnote|step=61}}
 | lm6
 | little minor sixth
 |
 |-
 | 62
@@ Line 528: / Line 598: @@
 | 128/81
 | 19/12, 30/19
+|{{UDnote|step=62}}
 | m6
 | minor sixth
@@ Line 536: / Line 607: @@
 | 192/121
 | 27/17
+|{{UDnote|step=63}}
 | Rm6
 | rastmic minor sixth
 |
 |-
 | 64
 | 817.021
 | 8/5
 |
+|{{UDnote|step=64}}
 | Km6
 | classic minor sixth
@@ Line 552: / Line 625: @@
 | 160/99, (21/13)
 | 34/21
+|{{UDnote|step=65}}
 | Om6
 | on minor sixth
 |
 |-
 | 66
 | 842.553
 | 44/27, 13/8, (81/50, 80/49)
 |
+|{{UDnote|step=66}}
 | n6, Tm6
 | less neutral sixth, tall minor sixth
@@ Line 568: / Line 643: @@
 | 18/11, 64/39, (400/243, 49/30)
 | 23/14
+|{{UDnote|step=67}}
 | N6, tM6
 | greater neutral sixth, tiny minor sixth
@@ Line 576: / Line 652: @@
 | 33/20
 | 28/17, 38/23
+|{{UDnote|step=68}}
 | oM6
 | off major sixth
 |
 |-
 | 69
 | 880.851
 | 5/3
 |
+|{{UDnote|step=69}}
 | kM6
 | classic major sixth
@@ Line 591: / Line 669: @@
 | 893.617
 | 121/72
 |
+|{{UDnote|step=70}}
 | rM6
 | rastmic major sixth
 |
 |-
 | 71
@@ Line 600: / Line 679: @@
 | 27/16, (42/35, 22/13)
 | 32/19
+|{{UDnote|step=71}}
 | M6
 | major sixth
@@ Line 608: / Line 688: @@
 | 56/33
 | 17/10, 46/27
+|{{UDnote|step=72}}
 | LM6
 | large major sixth
 |
 |-
 | 73
 | 931.915
-| 12/7, 128/75
+| 12/7, (128/75)
 |
+|{{UDnote|step=73}}
 | SM6, (KKd7)
 | super major sixth (classic diminished seventh)
@@ Line 624: / Line 706: @@
 | 45/26
 | 19/11
+|{{UDnote|step=74}}
 | HM6
 | hyper major sixth
 |
 |-
 | 75
@@ Line 632: / Line 715: @@
 | 26/15
 | 40/23, 33/19
+|{{UDnote|step=75}}
 | hm7
 | hypo minor seventh
 |
 |-
 | 76
 | 970.213
 | 7/4
 |
+|{{UDnote|step=76}}
 | sm7
 | sub minor seventh
@@ Line 648: / Line 733: @@
 | 99/56, (44/25)
 | 30/17, 23/13
+|{{UDnote|step=77}}
 | lm7
 | little minor seventh
 |
 |-
 | 78
 | 995.745
 | 16/9
 |
+|{{UDnote|step=78}}
 | m7
 | minor seventh
@@ Line 664: / Line 751: @@
 | 216/121
 | 34/19
+|{{UDnote|step=79}}
 | Rm7
 | rastmic minor seventh
 |
 |-
 | 80
@@ Line 672: / Line 760: @@
 | 9/5
 | 38/21
+|{{UDnote|step=80}}
 | Km7
 | classic minor seventh
@@ Line 679: / Line 768: @@
 | 1034.043
 | 20/11
 |
+|{{UDnote|step=81}}
 | Om7
 | on minor seventh
 |
 |-
 | 82
@@ Line 688: / Line 778: @@
 | 11/6, (64/35)
 | 42/23
+|{{UDnote|step=82}}
 | n7, Tm7, hd8
 | less neutral seventh, tall minor seventh, hypo diminished octave
@@ Line 696: / Line 787: @@
 | 81/44, 24/13, (50/27)
 | 46/25, 35/19
+|{{UDnote|step=83}}
 | N7, tM7, sd8, (kkM7)
 | greater neutral seventh, tiny major seventh, sub diminished octave, (2-comma down major seventh)
 |
 |-
 | 84
 | 1072.340
 | 297/160, 144/91, (13/7)
 |
+|{{UDnote|step=84}}
 | oM7, ld8
 | off major seventh, little diminished octave
 |
 |-
 | 85
 | 1085.106
 | 15/8, (28/15)
 |
+|{{UDnote|step=85}}
 | kM7, d8
 | classic major seventh, diminished octave
@@ Line 720: / Line 814: @@
 | 121/64
 | 32/17, 17/9
+|{{UDnote|step=86}}
 | rM7, Rd8
 | rastmic major seventh, rastmic diminished octave
 |
 |-
 | 87
@@ Line 728: / Line 823: @@
 | 243/128, 256/135, (40/21)
 | 36/19, 19/10
+|{{UDnote|step=87}}
 | M7, Kd8
 | major seventh, komma-up diminished octave
@@ Line 736: / Line 832: @@
 | 21/11, (25/13)
 | 44/23, 23/12
+|{{UDnote|step=88}}
 | LM7, Od8
 | large major seventh, on diminished octave
 |
 |-
 | 89
 | 1136.170
 | 27/14, 52/27, (48/25)
 |
+|{{UDnote|step=89}}
 | SM7, Td8, Ud8, (KKd8)
 | super major seventh, tall diminished octave, unter diminished octave, (classic diminished octave)
@@ Line 752: / Line 850: @@
 | 64/33, (35/18, 68/35, 33/17)
 | 33/17
+|{{UDnote|step=90}}
 | u8, t8, HM7
 | unter octave, tiny octave, hyper major seventh
 |
 |-
 | 91
@@ Line 760: / Line 859: @@
 | 88/45, 39/20
 | 45/23
+|{{UDnote|step=91}}
 | o8, h8
 | off octave, hypo octave
 |
 |-
 | 92
 | 1174.468
 | 160/81, 63/32, (49/25)
 |
+|{{UDnote|step=92}}
 | k8, s8
 | komma-down octave, sub octave
 |
 |-
 | 93
 | 1187.234
 | 891/448, 484/243, (486/245, 99/50, 196/99)
 |
+|{{UDnote|step=93}}
 | l8, r8
 | little octave, octave - rastma
 |
 |-
 | 94
 | 1200.000
 | 2/1
 |
+|{{UDnote|step=94}}
 | P8
 | perfect octave
@@ Line 791: / Line 894: @@
 There are perhaps nine functional minor thirds varying between 242.553 cents and 344.681 cents, and one can even go beyond those boundaries under the right conditions, so musicians playing in 94edo have a lot more flexibility in terms of the particular interval shadings they might use depending on context.
-The perfect fifth has three, or perhaps even five, functional options, each differing by one step. Although in most timbres only the central perfect fifth at 702.128 cents sounds consonant and stable, the lower and higher variants provide a change in interval quality, and can be helpful in creating subsets which mimic other edos, and close the circle of fifths in different numbers of pitches. For example, a close approximation to 41edo can be made using a chain of forty 702.128 cent fifths and one wide fifth at 714.894 cents, with an improvement on the tuning of most simple consonances in close keys, but a 1-step variation in interval quality as one modulates to more distant keys.
+The perfect fifth has three, or perhaps even five, functional options, each differing by one step. The lower and higher variants provide a change in interval quality, and can be helpful in creating subsets which mimic other edos, and close the circle of fifths in different numbers of pitches. For example, a close approximation to 41edo can be made using a chain of forty 702.128 cent fifths and one wide fifth at 714.894 cents, with an improvement on the tuning of most simple consonances in close keys, but a 1-step variation in interval quality as one modulates to more distant keys.
 Every odd-numbered interval can generate the entire tuning of 94edo except for the 600-cent [[tritone]] (47\94), which divides the octave exactly in half.
@@ Line 798: / Line 901: @@
 While having the whole gamut of 94 intervals available on a keyboard or other instrument would be quite a feat, one can get a lot out of a 41-tone chain of fifths (with the odd fifth one degree wide) or a 53-tone chain of fifths (with the odd fifth one degree narrow), where the subset behaves much like a well-temperament, arguably usable in all keys but with some interval size variation between closer and more distant keys.
+== Notation ==
+edo can be notated in [[Sagittal notation|Sagittal]] using the [[Sagittal_notation#Athenian_extension_single-shaft|Athenian extension]], with the apotome equating to 9 edosteps and the limma to 7 edosteps.
+{| class="wikitable" style="text-align: center;"
+!Degree
+!−9
+!−8
+!−7
+!−6
+!−5
+!−4
+!−3
+!−2
+!−1
+!0
+!+1
+!+2
+!+3
+!+4
+!+5
+!+6
+!+7
+!+8
+!+9
+|-
+!Evo
+|{{sagittal|b}}
+|{{sagittal|b}}{{sagittal|~|(}}
+|{{sagittal|b}}{{sagittal|/|}}
+|{{sagittal|b}}{{sagittal|(|(}}
+|{{sagittal|b}}{{sagittal|/|\}}
+| rowspan="2" |{{sagittal|\!/}}
+| rowspan="2" |{{sagittal|(!(}}
+| rowspan="2" |{{sagittal|\!}}
+| rowspan="2" |{{sagittal|~!(}}
+| rowspan="2" |{{sagittal||//|}}
+| rowspan="2" |{{sagittal|~|(}}
+| rowspan="2" |{{sagittal|/|}}
+| rowspan="2" |{{sagittal|(|(}}
+| rowspan="2" |{{sagittal|/|\}}
+|{{sagittal|#}}{{sagittal|\!/}}
+|{{sagittal|#}}{{sagittal|(!(}}
+|{{sagittal|#}}{{sagittal|\!}}
+|{{sagittal|#}}{{sagittal|~!(}}
+|{{sagittal|#}}
+|-
+!Revo
+|{{sagittal|\!!/}}
+|{{sagittal|(!!(}}
+|{{sagittal|!!/}}
+|{{sagittal|~!!(}}
+|{{sagittal|(!)}}
+|{{sagittal|(|)}}
+|{{sagittal|~||(}}
+|{{sagittal|||\}}
+|{{sagittal|(||(}}
+|{{sagittal|/||\}}
+|}
 == Regular temperament properties ==
@@ Line 805: / Line 966: @@
 ! rowspan="2" | [[Comma list]]
 ! rowspan="2" | [[Mapping]]
-! rowspan="2" | Optimal<br />8ve stretch (¢)
+! rowspan="2" | Optimal<br>8ve stretch (¢)
 ! colspan="2" | Tuning error
 |-
@@ Line 873: / Line 1,034: @@
 |+ style="font-size: 105%;" | Table of rank-2 temperaments by generator
 |-
-! Periods<br />per 8ve
+! Periods<br>per 8ve
 ! Generator*
 ! Cents*
-! Associated<br />ratio*
+! Associated<br>ratio*
 ! Temperament
 |-
@@ Line 945: / Line 1,106: @@
 | [[Kleischismic]]
 |}
-<nowiki />* [[Normal lists|Octave-reduced form]], reduced to the first half-octave, and [[Normal lists|minimal form]] in parentheses if distinct
+<nowiki/>* [[Normal lists|Octave-reduced form]], reduced to the first half-octave, and [[Normal lists|minimal form]] in parentheses if distinct
 Below are some 23-limit temperaments supported by 94et. It might be noted that 94, a very good tuning for [[garibaldi temperament]], shows us how to extend it to the 23-limit.
-* {{nowrap|46 &amp; 94}} {{multival| 8 30 -18 -4 -28 8 -24 2 … }}
+* {{nowrap|46 &amp; 94}}
-* {{nowrap|68 &amp; 94}} {{multival| 20 28 2 -10 24 20 34 52 … }}
+* {{nowrap|68 &amp; 94}}
-* {{nowrap|53 &amp; 94}} {{multival| 1 -8 -14 23 20 -46 -3 -35 … }} (one garibaldi)
+* {{nowrap|53 &amp; 94}}  (one garibaldi)
-* {{nowrap|41 &amp; 94}} {{multival| 1 -8 -14 23 20 48 -3 -35 … }} (another garibaldi, only differing in the mappings of 17 and 23)
+* {{nowrap|41 &amp; 94}}  (another garibaldi, only differing in the mappings of 17 and 23)
-* {{nowrap|135 &amp; 94}} {{multival| 1 -8 -14 23 20 48 -3 59 … }} (another garibaldi)
+* {{nowrap|135 &amp; 94}}  (another garibaldi)
-* {{nowrap|130 &amp; 94}} {{multival| 6 -48 10 -50 26 6 -18 -22 … }} (a pogo extension)
+* {{nowrap|130 &amp; 94}}  (a pogo extension)
-* {{nowrap|58 &amp; 94}} {{multival| 6 46 10 44 26 6 -18 -22 … }} (a supers extension)
+* {{nowrap|58 &amp; 94}}  (a supers extension)
-* {{nowrap|50 &amp; 94}} {{multival| 24 -4 40 -12 10 24 22 6 … }}
+* {{nowrap|50 &amp; 94}}
-* {{nowrap|72 &amp; 94}} {{multival| 12 -2 20 -6 52 12 -36 -44 … }} (a gizzard extension)
+* {{nowrap|72 &amp; 94}}  (a gizzard extension)
-* {{nowrap|80 &amp; 94}} {{multival| 18 44 30 38 -16 18 40 28 … }}
+* {{nowrap|80 &amp; 94}}
-* 94 solo {{multival| 12 -2 20 -6 -42 12 -36 -44 … }} (a rank one temperament!)
+* 94 solo  (a rank one temperament!)
 Temperaments to which 94et can be detempered:
-* [[Satin]] ({{nowrap|94 &amp; 311}}) {{multival| 3 70 -42 69 -34 50 85 83 … }}
+* [[Satin]] ({{nowrap|94 & 311}})
-* {{nowrap|94 &amp; 422}} {{multival| 8 124 -18 90 -28 102 164 96 … }}
+* {{nowrap|94 & 422}}
-== Zeta properties ==
-=== Zeta peak index ===
-{| class="wikitable"
-|-
-! colspan="3" | Tuning
-! colspan="3" | Strength
-! colspan="2" | Closest EDO
-! colspan="2" | Integer limit
-|-
-! ZPI
-! Steps per octave
-! Step size (cents)
-! Height
-! Integral
-! Gap
-! EDO
-! Octave (cents)
-! Consistent
-! Distinct
-|-
-| [[532zpi]]
-| 93.9836761074943
-| 12.7681747480009
-| 8.806201
-| 1.394050
-| 17.832744
-| 94edo
-| 1200.20842631208
-| 24
-| 15
-|}
 == Scales ==
@@ Line 1,003: / Line 1,132: @@
 * [[Garibaldi12]]
 * [[Garibaldi17]]
+== Instruments ==
+edo can be played on the Lumatone, although due to the sheer number of notes it does require compromises in either the range or gamut:
+* [[Lumatone mapping for 94edo]]
+One can also use a [[skip fretting]] system:
+* [[Skip fretting system 94 7 16]]
 == Music ==
+; [[Bryan Deister]]
+* [https://www.youtube.com/shorts/Zx4xbJhXmgc ''microtonal improvisation in 94edo''] (2025)
 ; [[Cam Taylor]]
 * [https://archive.org/details/41-94edo09sept2017 4 Improvisations Saturday 9th September 2017]

94edo: Difference between revisions

Latest revision as of 00:26, 16 August 2025

Theory

As a tuning of other temperaments

Prime harmonics

Subsets and supersets

Intervals

Notation

Regular temperament properties

Rank-2 temperaments

Scales

Instruments

Music

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