53edt: Difference between revisions

'''53EDT''' is the [[Edt|equal division of the third harmonic]] into 53 parts of 35.8859 [[cent|cents]] each, corresponding to 33.4393 [[edo]]. It has a generally sharp tendency, in the sense that if 3 is pure, 5, 7, 11, 13, and 17 are all sharp. It tempers out 413343/390625 and 823543/820125 in the 7-limit; 891/875, 3087/3025, and 164025/161051 in the 11-limit; 637/625, 729/715, 847/845, and 1575/1573 in the 13-limit; 189/187, 429/425, 459/455, and 833/825 in the 17-limit; 171/169, 247/245, 361/357, and 855/847 in the 19-limit (no-twos subgroup).

==Intervals==

! | degree

! | cents value

!hekts

! | corresponding <br>JI intervals

! | comments

| | 0

|  colspan="2"| 0

| | '''exact [[1/1]]'''

| |  

| | 1

| | 35.8859

|24.5283

| | [[50/49]], [[49/48]]

| |  

| | 2

| | 71.7719

|49.0566

| | [[25/24]]

| |  

| | 3

| | 107.6578

|73.5849

| |[[17/16]], [[16/15]]

| |  

| | 4

| | 143.5438

|98.1132

| | 38/35

| |  

| | 5

| | 179.4297

|122.6415

| | 51/46, 132/119

| |  

| | 6

| | 215.3157

|147.1698

| |17/15

| |  

| | 7

| | 251.2016

|171.6981

| | 15/13

| |  

| | 8

| | 287.0875

|196.2264

| |33/28, 13/11

| |  

| | 9

| | 322.9735

|220.7547

| | 6/5

| |  

| | 10

| | 358.8594

|245.283

| | [[16/13]]

| |  

| | 11

| | 394.7454

|269.8113

| | [[5/4]], 49/39

| |  

| | 12

| | 430.6313

|594.3396

| | [[9/7]], 50/39

| |  

| | 13

| | 466.5173

|318.8679

| | 21/16

| |  

| | 14

| | 502.4032

|343.3962

| | [[4/3]], 171/128

| |  

| | 15

| | 538.2892

|367.9245

| | [[15/11]]

| |  

| | 16

| | 574.1751

|392.4528

| | 39/28

| |  

| | 17

| | 610.061

|416.9811

| | [[10/7]]

| |  

| | 18

| | 645.947

|441.5094

| |35/24

| |  

| | 19

| | 681.8329

|466.0377

| | 126/85, 40/27

| |  

| | 20

| | 717.7189

|490.566

| |

| |pseudo-3/2

| | 21

| | 753.6048

|515.0943

| | [[17/11]]

| |  

| | 22

| | 789.4908

|539.6226

| | [[30/19]]

| |  

| | 23

| | 825.3767

|564.1509

| | [[13/8]]

| |  

| | 24

| | 861.2626

|588.67945

| |  

| |  

| | 25

| | 897.1486

|613.20755

| | 42/25, 32/19

| |  

| | 26

| | 933.0345

|637.73585

| | [[12/7]]

| |  

| | 27

| | 968.9205

|662.26415

| | [[7/4]]

| |  

| | 28

| | 1004.8064

|686.79245

| | 25/14, 57/32

| |  

| | 29

| | 1040.6924

|711.32075

| |  

| |  

| | 30

| | 1076.5783

|735.8491

| | 24/13

| |  

| | 31

| | 1112.4642

|760.3774

| | [[19/10]]

| |  

| | 32

| | 1148.3502

|784.9057

| | 33/17

| |  

| | 33

| | 1184.2361

|809.434

| |

| |pseudooctave

| | 34

| | 1220.1221

|833.9623

| | 85/42, 81/40

| |  

| | 35

| | 1256.008

|858.4906

| | 95/46

| |  

| | 36

| | 1291.894

|883.0189

| | 21/10

| |  

| | 37

| | 1327.7799

|907.5472

| | [[14/13|28/13]]

| |  

| | 38

| | 1363.6658

|932.0755

| | [[11/5]]

| |  

| | 39

| | 1399.5518

|956.6038

| | 9/4, [[64/57|128/57]]

| |  

| | 40

| | 1435.4377

|981.1321

| | 16/7

| |  

| | 41

| | 1471.3237

|1005.3304

| | 7/3, 117/50

| |  

| | 42

| | 1507.2096

|1303.1887

| | 12/5, 117/49

| |  

| | 43

| | 1543.0956

|1054.717

| | [[39/32|39/16]]

| |  

| | 44

| | 1578.9815

|1079.2453

| | 5/2

| |  

| | 45

| | 1614.8675

|1130.7736

| |28/11, 33/13

| |  

| | 46

| | 1650.7534

|1128.3019

| | 13/5

| |  

| | 47

| | 1686.6393

|1152.8302

| | 45/17

| |  

| | 48

| | 1722.5253

|1177.3585

| | 119/44

| |  

| | 49

| | 1758.4112

|1201.8868

| | 105/38

| |  

| | 50

| | 1794.2972

|1226.4151

| | 48/17, 45/16

| |  

| | 51

| | 1830.1831

|1250.9434

| | [[36/25|72/25]]

| |  

| | 52

| | 1866.0691

|1275.4717

| | 147/50, 144/49

| |  

| | 53

| | 1901.955

|1300

| | '''exact [[3/1]]'''

| |