96 equal temperament

96-EDO was first advocated by Julián Carrillo in 1924, with a 16th-tone piano. It was also advocated more recently by Pascale Criton and Vincent-Olivier Gagnon.[1]

Since 96 = 24 × 4, quarter-tone notation can be used, and split into four parts.

One can split it into four parts like this:

C, C↑, C↑↑/C↓↓, C↓, C, ..., C↓, C

Since it can get confusing with so many accidentals, Julián Carrillo proposed referring to notes by step number from C (e.g. 0, 1, 2, 3, 4, ..., 95, 0)

Since the 16th-tone piano has a 97-key layout arranged in 8 conventional piano "octaves", music for it is usually notated according to the key the player has to strike. While the entire range of the instrument is only C₄–C₅, the notation ranges from C₀ to C₈. Thus, written D0 corresponds to sounding C↑↑₄ or note 2, and written A♭/G♯₂ corresponds to sounding E₄ or note 32.

Below are some intervals in 96-EDO and how well they approximate just intonation.

interval name	size (steps)	size (cents)	midi	just ratio	just (cents)	midi	error (cents)
octave	96	1200	play	2:1	1200.00	play	+00.00
semidiminished octave	92	1150	play	35:18	1151.23	play	−01.23
supermajor seventh	91	1137.5		27:14	1137.04	play	+00.46
major seventh	87	1087.5		15:80	1088.27	play	−00.77
neutral seventh, major tone	84	1050	play	11:60	1049.36	play	+00.64
neutral seventh, minor tone	83	1037.5		20:11	1035.00	play	+02.50
large just minor seventh	81	1012.5		9:5	1017.60	play	−05.10
small just minor seventh	80	1000	play	16:90	0996.09	play	+03.91
subminor seventh	78	0975		7:4	0968.83	play	+06.17
supermajor sixth	75	937.5		12:7	933.13	play	+ 4.17
major sixth	71	0887.5		5:3	0884.36	play	+03.14
neutral sixth	68	0850	play	18:11	0852.59	play	−02.59
minor sixth	65	0812.5		8:5	0813.69	play	−01.19
subminor sixth	61	0762.5		14:90	0764.92	play	−02.42
perfect fifth	56	0700	play	3:2	0701.96	play	−01.96
minor fifth	52	0650	play	16:11	0648.68	play	+01.32
lesser septimal tritone	47	0587.5		7:5	0582.51	play	+04.99
major fourth	44	0550	play	11:80	0551.32	play	−01.32
perfect fourth	40	0500	play	4:3	0498.04	play	+01.96
tridecimal major third	36	0450	play	13:10	0454.21	play	−04.21
septimal major third	35	0437.5		9:7	0435.08	play	+02.42
major third	31	0387.5		5:4	0386.31	play	+01.19
undecimal neutral third	28	0350	play	011:9	0347.41	play	+02.59
Superminor third	27	0337.5		017:14	0336.13	play	+01.37
77th harmonic	26	0325	play	077:64	0320.14	play	+04.86
minor third	25	0312.5		6:5	0315.64	play	−03.14
Second septimal minor third	24	0300	play	25:21	0301.85	play	−01.85
Tridecimal minor third	23	0287.5		13:11	0289.21	play	−01.71
augmented second, just	22	0275	play	75:64	0274.58	play	+00.42
septimal minor third	21	0262.5		7:6	0266.87	play	−04.37
tridecimal five-quarter tone	20	0250	play	15:13	0247.74	play	+02.26
septimal whole tone	18	0225		8:7	0231.17	play	−06.17
major second, major tone	16	0200	play	9:8	0203.91	play	−03.91
major second, minor tone	15	0187.5		10:90	0182.40	play	+05.10
neutral second, greater undecimal	13	0162.5		11:10	0165.00	play	−02.50
neutral second, lesser undecimal	12	0150	play	12:11	0150.64	play	−00.64
Greater tridecimal ⅔-tone	11	0137.5		13:12	0138.57	play	−01.07
Septimal diatonic semitone	10	0125	play	15:14	0119.44	play	+05.56
diatonic semitone, just	09	0112.5		16:15	0111.73	play	+00.77
Undecimal minor second (121st subharmonic)	08	0100	play	128:121	0097.36	play	−02.64
Septimal chromatic semitone	07	087.5		21:20	0084.47	play	+03.03
Just chromatic semitone	06	075	play	25:24	0070.67	play	+04.33
Septimal minor second	05	062.5		28:27	0062.96	play	−00.46
Undecimal quarter-tone (33rd harmonic)	04	0050	play	33:32	0053.27	play	−03.27
Undecimal diesis	03	0037.5		45:44	0038.91	play	−01.41
septimal comma	02	0025	play	64:63	0027.26	play	−02.26
septimal semicomma	01	0012.5	play	126:125	0013.79	play	−01.29
unison	00	0000	play	1:1	0000.00	play	+00.00

Moving from 12-EDO to 96-EDO allows the better approximation of a number of intervals, such as the minor third and major sixth.

• Musical temperament
• Equal temperament

• Sonido 13, Julián Carillo's theory of 96-EDO