143edt

← 142edt 143edt 144edt →
Prime factorization	11 × 13
Step size	13.3004 ¢
Octave	90\143edt (1197.03 ¢)
Consistency limit	7
Distinct consistency limit	7

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143 equal divisions of the tritave, perfect twelfth, or 3rd harmonic (abbreviated 143edt or 143ed3), is a nonoctave tuning system that divides the interval of 3/1 into 143 equal parts of about 13.3 ¢ each. Each step represents a frequency ratio of 3^1/143, or the 143rd root of 3.

Intervals

Steps	Cents	Hekts	Approximate ratios
0	0	0	1/1
1	13.3	9.1
2	26.6	18.2
3	39.9	27.3	45/44
4	53.2	36.4	34/33
5	66.5	45.5	27/26
6	79.8	54.5	22/21
7	93.1	63.6	19/18
8	106.4	72.7
9	119.7	81.8	15/14
10	133	90.9	41/38
11	146.3	100	37/34, 49/45
12	159.6	109.1	34/31, 45/41
13	172.9	118.2	21/19
14	186.2	127.3	49/44
15	199.5	136.4	37/33, 46/41, 55/49
16	212.8	145.5	26/23
17	226.1	154.5	41/36
18	239.4	163.6	31/27, 54/47
19	252.7	172.7	22/19
20	266	181.8	7/6
21	279.3	190.9
22	292.6	200	45/38
23	305.9	209.1	31/26, 37/31
24	319.2	218.2
25	332.5	227.3
26	345.8	236.4	11/9
27	359.1	245.5
28	372.4	254.5
29	385.7	263.6	5/4
30	399	272.7	34/27, 39/31
31	412.3	281.8	33/26, 52/41
32	425.6	290.9	23/18
33	438.9	300	49/38
34	452.2	309.1
35	465.5	318.2	17/13, 55/42
36	478.8	327.3	29/22
37	492.1	336.4
38	505.4	345.5
39	518.7	354.5
40	532	363.6
41	545.3	372.7	37/27, 48/35
42	558.6	381.8	29/21
43	571.9	390.9
44	585.2	400
45	598.5	409.1	41/29
46	611.8	418.2	37/26, 47/33
47	625.1	427.3	33/23
48	638.4	436.4
49	651.7	445.5	35/24
50	665	454.5
51	678.3	463.6
52	691.6	472.7
53	704.9	481.8
54	718.2	490.9
55	731.5	500	29/19
56	744.8	509.1
57	758.1	518.2
58	771.4	527.3	25/16
59	784.7	536.4
60	798	545.5	46/29
61	811.3	554.5
62	824.6	563.6	29/18, 37/23
63	837.9	572.7
64	851.2	581.8	18/11
65	864.5	590.9
66	877.8	600
67	891.1	609.1
68	904.4	618.2
69	917.7	627.3
70	931	636.4
71	944.3	645.5
72	957.6	654.5
73	970.9	663.6
74	984.2	672.7
75	997.5	681.8
76	1010.8	690.9	52/29
77	1024.1	700	47/26
78	1037.4	709.1
79	1050.7	718.2	11/6
80	1064	727.3
81	1077.3	736.4	41/22, 54/29
82	1090.6	745.5
83	1103.9	754.5
84	1117.2	763.6
85	1130.5	772.7	48/25
86	1143.8	781.8
87	1157.1	790.9	41/21
88	1170.4	800	55/28
89	1183.7	809.1
90	1197	818.2
91	1210.3	827.3
92	1223.6	836.4
93	1236.9	845.5	47/23, 49/24
94	1250.2	854.5
95	1263.5	863.6
96	1276.8	872.7	23/11
97	1290.1	881.8
98	1303.4	890.9
99	1316.7	900
100	1330	909.1	41/19
101	1343.3	918.2
102	1356.6	927.3	35/16, 46/21
103	1369.9	936.4
104	1383.2	945.5
105	1396.5	954.5
106	1409.8	963.6
107	1423.1	972.7
108	1436.4	981.8	39/17, 55/24
109	1449.7	990.9
110	1463	1000
111	1476.3	1009.1	54/23
112	1489.6	1018.2	26/11
113	1502.9	1027.3	31/13
114	1516.2	1036.4	12/5
115	1529.5	1045.5	46/19
116	1542.8	1054.5
117	1556.1	1063.6	27/11
118	1569.4	1072.7	47/19, 52/21
119	1582.7	1081.8
120	1596	1090.9
121	1609.3	1100	38/15
122	1622.6	1109.1
123	1635.9	1118.2	18/7
124	1649.2	1127.3
125	1662.5	1136.4	47/18
126	1675.8	1145.5
127	1689.1	1154.5
128	1702.4	1163.6
129	1715.7	1172.7
130	1729.1	1181.8	19/7
131	1742.4	1190.9	41/15, 52/19
132	1755.7	1200
133	1769	1209.1
134	1782.3	1218.2	14/5
135	1795.6	1227.3
136	1808.9	1236.4	54/19
137	1822.2	1245.5
138	1835.5	1254.5	26/9
139	1848.8	1263.6
140	1862.1	1272.7	44/15
141	1875.4	1281.8
142	1888.7	1290.9
143	1902	1300	3/1

Harmonics

Approximation of harmonics in 143edt
Harmonic		2	3	4	5	6	7	8	9	10	11	12
Error	Absolute (¢)	-2.97	+0.00	-5.93	-6.53	-2.97	-3.83	+4.40	+0.00	+3.80	-1.60	-5.93
Error	Relative (%)	-22.3	+0.0	-44.6	-49.1	-22.3	-28.8	+33.1	+0.0	+28.6	-12.0	-44.6
Steps (reduced)		90 (90)	143 (0)	180 (37)	209 (66)	233 (90)	253 (110)	271 (128)	286 (0)	300 (14)	312 (26)	323 (37)

Approximation of harmonics in 143edt
Harmonic		13	14	15	16	17	18	19	20	21	22	23
Error	Absolute (¢)	+1.80	+6.51	-6.53	+1.44	+2.89	-2.97	-3.47	+0.84	-3.83	-4.56	-1.72
Error	Relative (%)	+13.5	+48.9	-49.1	+10.8	+21.7	-22.3	-26.1	+6.3	-28.8	-34.3	-12.9
Steps (reduced)		334 (48)	344 (58)	352 (66)	361 (75)	369 (83)	376 (90)	383 (97)	390 (104)	396 (110)	402 (116)	408 (122)