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Logharmonic series: Difference between revisions

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{{Mathematical interest}}
{{Mathematical interest}}
== Introduction ==
== Introduction ==
[[File:2-logharmonic vs harmonic.png|thumb|
[[File:2-logharmonic vs harmonic.png|thumb|
2-logharmonic series vs. harmonic series
2-logharmonic series vs. harmonic series
Line 21: Line 21:
== Frequencies ==
== Frequencies ==
{| class="wikitable"
{| class="wikitable"
|+
| colspan="6" |2-logharmonic series
| colspan="6" |harmonic series
|-
|-
|'''pitch #'''
| colspan="6" | 2-logharmonic series
|'''frequency multiplier (definition)'''
| colspan="6" | Harmonic series
|'''frequency multiplier (decimal)'''
|-
|'''pitch (¢)'''
! Pitch #
|'''pitch Δ (¢)'''
! Frequency multiplier (definition)
|'''octave reduced pitch (¢)'''
! Frequency multiplier (decimal)
|'''pitch #'''
! Pitch (¢)
|'''frequency multiplier (definition)'''
! Pitch Δ (¢)
|'''frequency multiplier (decimal)'''
! Octave reduced pitch (¢)
|'''pitch (¢)'''
! Pitch #
|'''pitch Δ (¢)'''
! Frequency multiplier (definition)
|'''octave reduced pitch (¢)'''
! Frequency multiplier (decimal)
! Pitch (¢)
! Pitch Δ (¢)
! Octave reduced pitch (¢)
|-
|-
|2
| 2
|log<sub>2</sub>2
| log<sub>2</sub>2
|1.00000000
| 1.00000000
|0.00
| 0.00
| -
| -
|0.00
| 0.00
|1
| 1
|1
| 1
|1.000000
| 1.000000
|0.00
| 0.00
| -
| -
|0.00
| 0.00
|-
|-
|3
| 3
|log<sub>2</sub>3
| log<sub>2</sub>3
|1.584962501
| 1.584962501
|797.34
| 797.34
|797.34
| 797.34
|797.34
| 797.34
| colspan="6" |
| colspan="6" |  
|-
|-
|4
| 4
|log<sub>2</sub>4
| log<sub>2</sub>4
|2.00000000
| 2.00000000
|1200.00
| 1200.00
|402.66
| 402.66
|0.00
| 0.00
|2
| 2
|2
| 2
|2.000000
| 2.000000
|1200.00
| 1200.00
|1200.00
| 1200.00
|0.00
| 0.00
|-
|-
|5
| 5
|log<sub>2</sub>5
| log<sub>2</sub>5
|2.321928095
| 2.321928095
|1458.39
| 1458.39
|258.39
| 258.39
|258.39
| 258.39
| colspan="6" rowspan="3" |
| colspan="6" rowspan="3" |  
|-
|-
|6
| 6
|log<sub>2</sub>6
| log<sub>2</sub>6
|2.584962501
| 2.584962501
|1644.17
| 1644.17
|185.78
| 185.78
|444.17
| 444.17
|-
|-
|7
| 7
|log<sub>2</sub>7
| log<sub>2</sub>7
|2.807354922
| 2.807354922
|1787.05
| 1787.05
|142.88
| 142.88
|587.05
| 587.05
|-
|-
|8
| 8
|log<sub>2</sub>8
| log<sub>2</sub>8
|3.00000000
| 3.00000000
|1901.96
| 1901.96
|114.90
| 114.90
|701.96
| 701.96
|3
| 3
|3
| 3
|3.000000
| 3.000000
|1901.96
| 1901.96
|701.96
| 701.96
|701.96
| 701.96
|-
|-
|9
| 9
|log<sub>2</sub>9
| log<sub>2</sub>9
|3.169925001
| 3.169925001
|1997.34
| 1997.34
|95.38
| 95.38
|797.34
| 797.34
| colspan="6" rowspan="7" |
| colspan="6" rowspan="7" |  
|-
|-
|10
| 10
|log<sub>2</sub>10
| log<sub>2</sub>10
|3.321928095
| 3.321928095
|2078.43
| 2078.43
|81.09
| 81.09
|878.43
| 878.43
|-
|-
|11
| 11
|log<sub>2</sub>11
| log<sub>2</sub>11
|3.459431619
| 3.459431619
|2148.64
| 2148.64
|70.22
| 70.22
|948.64
| 948.64
|-
|-
|12
| 12
|log<sub>2</sub>12
| log<sub>2</sub>12
|3.584962501
| 3.584962501
|2210.35
| 2210.35
|61.71
| 61.71
|1010.35
| 1010.35
|-
|-
|13
| 13
|log<sub>2</sub>13
| log<sub>2</sub>13
|3.700439718
| 3.700439718
|2265.24
| 2265.24
|54.89
| 54.89
|1065.24
| 1065.24
|-
|-
|14
| 14
|log<sub>2</sub>14
| log<sub>2</sub>14
|3.807354922
| 3.807354922
|2314.55
| 2314.55
|49.31
| 49.31
|1114.55
| 1114.55
|-
|-
|15
| 15
|log<sub>2</sub>15
| log<sub>2</sub>15
|3.906890596
| 3.906890596
|2359.23
| 2359.23
|44.68
| 44.68
|1159.23
| 1159.23
|-
|-
|16
| 16
|log<sub>2</sub>16
| log<sub>2</sub>16
|4.00000000
| 4.00000000
|2400.00
| 2400.00
|40.77
| 40.77
|0.00
| 0.00
|4
| 4
|4
| 4
|4.000000
| 4.000000
|2400.00
| 2400.00
|498.04
| 498.04
|0.00
| 0.00
|-
|-
|17
| 17
|log<sub>2</sub>17
| log<sub>2</sub>17
|4.087462841
| 4.087462841
|2437.45
| 2437.45
|37.45
| 37.45
|37.45
| 37.45
| colspan="6" rowspan="15" |
| colspan="6" rowspan="15" |  
|-
|-
|18
| 18
|log<sub>2</sub>18
| log<sub>2</sub>18
|4.169925001
| 4.169925001
|2472.03
| 2472.03
|34.58
| 34.58
|72.03
| 72.03
|-
|-
|19
| 19
|log<sub>2</sub>19
| log<sub>2</sub>19
|4.247927513
| 4.247927513
|2504.11
| 2504.11
|32.09
| 32.09
|104.11
| 104.11
|-
|-
|20
| 20
|log<sub>2</sub>20
| log<sub>2</sub>20
|4.321928095
| 4.321928095
|2534.01
| 2534.01
|29.90
| 29.90
|134.01
| 134.01
|-
|-
|21
| 21
|log<sub>2</sub>21
| log<sub>2</sub>21
|4.392317423
| 4.392317423
|2561.98
| 2561.98
|27.97
| 27.97
|161.98
| 161.98
|-
|-
|22
| 22
|log<sub>2</sub>22
| log<sub>2</sub>22
|4.459431619
| 4.459431619
|2588.23
| 2588.23
|26.25
| 26.25
|188.23
| 188.23
|-
|-
|23
| 23
|log<sub>2</sub>23
| log<sub>2</sub>23
|4.523561956
| 4.523561956
|2612.95
| 2612.95
|24.72
| 24.72
|212.95
| 212.95
|-
|-
|24
| 24
|log<sub>2</sub>24
| log<sub>2</sub>24
|4.584962501
| 4.584962501
|2636.29
| 2636.29
|23.34
| 23.34
|236.29
| 236.29
|-
|-
|25
| 25
|log<sub>2</sub>25
| log<sub>2</sub>25
|4.64385619
| 4.64385619
|2658.39
| 2658.39
|22.10
| 22.10
|258.39
| 258.39
|-
|-
|26
| 26
|log<sub>2</sub>26
| log<sub>2</sub>26
|4.700439718
| 4.700439718
|2679.35
| 2679.35
|20.97
| 20.97
|279.35
| 279.35
|-
|-
|27
| 27
|log<sub>2</sub>27
| log<sub>2</sub>27
|4.754887502
| 4.754887502
|2699.29
| 2699.29
|19.94
| 19.94
|299.29
| 299.29
|-
|-
|28
| 28
|log<sub>2</sub>28
| log<sub>2</sub>28
|4.807354922
| 4.807354922
|2718.29
| 2718.29
|19.00
| 19.00
|318.29
| 318.29
|-
|-
|29
| 29
|log<sub>2</sub>29
| log<sub>2</sub>29
|4.857980995
| 4.857980995
|2736.43
| 2736.43
|18.14
| 18.14
|336.43
| 336.43
|-
|-
|30
| 30
|log<sub>2</sub>30
| log<sub>2</sub>30
|4.906890596
| 4.906890596
|2753.77
| 2753.77
|17.34
| 17.34
|353.77
| 353.77
|-
|-
|31
| 31
|log<sub>2</sub>31
| log<sub>2</sub>31
|4.95419631
| 4.95419631
|2770.38
| 2770.38
|16.61
| 16.61
|370.38
| 370.38
|-
|-
|32
| 32
|log<sub>2</sub>32
| log<sub>2</sub>32
|5.00000000
| 5.00000000
|2786.31
| 2786.31
|15.93
| 15.93
|386.31
| 386.31
|5
| 5
|5
| 5
|5.000000
| 5.000000
|2786.31
| 2786.31
|386.31
| 386.31
|386.31
| 386.31
|}
|}


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== Matharmonic series ==
== Matharmonic series ==
The logharmonic series can be approximated by pitches taken from the [[wikipedia:Harmonic_series_(mathematics)|mathematical harmonic series]] (as opposed to the musical harmonic series):
The logharmonic series can be approximated by pitches taken from the [[wikipedia:Harmonic_series_(mathematics)|mathematical harmonic series]] (as opposed to the musical harmonic series):


Line 311: Line 310:


{| class="wikitable"
{| class="wikitable"
|+
| rowspan="2" |'''pitch #'''
| colspan="5" |'''logharmonic series'''
| colspan="5" |'''matharmonic series'''
| rowspan="2" |'''difference between frequency multipliers'''
|-
|-
|'''frequency multiplier (definition)'''
| rowspan="2" ! Pitch #
|'''frequency multiplier (decimal)'''
| colspan="5" ! Logharmonic series
|'''pitch (¢)'''
| colspan="5" ! Matharmonic series
|'''pitch Δ (¢)'''
| rowspan="2" ! Difference between frequency multipliers
|'''octave reduced pitch (¢)'''
|'''frequency multiplier (definition)'''
|'''frequency multiplier (decimal)'''
|'''pitch (¢)'''
|'''pitch Δ (¢)'''
|'''octave reduced pitch (¢)'''
|-
|-
|1
! Frequency multiplier (definition)
|ln(1)
! Frequency multiplier (decimal)
|0
! Pitch (¢)
|N/A
! Pitch Δ (¢)
|N/A
! Octave reduced pitch (¢)
|N/A
! Frequency multiplier (definition)
|H(1)
! Frequency multiplier (decimal)
|1
! Pitch (¢)
|0.00
! Pitch Δ (¢)
|701.96
! Octave reduced pitch (¢)
|0.00
|1
|-
|-
|2
| 1
|ln(2)
| ln(1)
|0.6931471806
| 0
| -634.52
| N/A
| -
| N/A
|565.48
| N/A
|H(2)
| H(1)
|1.5
| 1
|701.96
| 0.00
|347.41
| 701.96
|701.96
| 0.00
|0.8068528194
| 1
|-
|-
|3
| 2
|ln(3)
| ln(2)
|1.098612289
| 0.6931471806
|162.82
| -634.52
|797.34
| -
|162.82
| 565.48
|H(3)
| H(2)
|1.833333333
| 1.5
|1049.36
| 701.96
|221.31
| 347.41
|1049.36
| 701.96
|0.7347210447
| 0.8068528194
|-
|-
|4
| 3
|ln(4)
| ln(3)
|1.386294361
| 1.098612289
|565.48
| 162.82
|402.66
| 797.34
|565.48
| 162.82
|H(4)
| H(3)
|2.083333333
| 1.833333333
|1270.67
| 1049.36
|158.70
| 221.31
|70.67
| 1049.36
|0.6970389722
| 0.7347210447
|-
|-
|5
| 4
|ln(5)
| ln(4)
|1.609437912
| 1.386294361
|823.87
| 565.48
|258.39
| 402.66
|823.87
| 565.48
|H(5)
| H(4)
|2.283333333
| 2.083333333
|1429.37
| 1270.67
|121.97
| 158.70
|229.37
| 70.67
|0.6738954209
| 0.6970389722
|-
|-
|6
| 5
|ln(6)
| ln(5)
|1.791759469
| 1.609437912
|1009.65
| 823.87
|185.78
| 258.39
|1009.65
| 823.87
|H(6)
| H(5)
|2.45
| 2.283333333
|1551.34
| 1429.37
|98.11
| 121.97
|351.34
| 229.37
|0.6582405308
| 0.6738954209
|-
|-
|7
| 6
|ln(7)
| ln(6)
|1.945910149
| 1.791759469
|1152.53
| 1009.65
|142.88
| 185.78
|1152.53
| 1009.65
|H(7)
| H(6)
|2.592857143
| 2.45
|1649.45
| 1551.34
|81.51
| 98.11
|449.45
| 351.34
|0.6469469938
| 0.6582405308
|-
|-
|8
| 7
|ln(8)
| ln(7)
|2.079441542
| 1.945910149
|1267.44
| 1152.53
|114.90
| 142.88
|67.44
| 1152.53
|H(8)
| H(7)
|2.717857143
| 2.592857143
|1730.96
| 1649.45
|69.37
| 81.51
|530.96
| 449.45
|0.6384156012
| 0.6469469938
|-
|-
|9
| 8
|ln(9)
| ln(8)
|2.197224577
| 2.079441542
|1362.82
| 1267.44
|95.38
| 114.90
|162.82
| 67.44
|H(9)
| H(8)
|2.828968254
| 2.717857143
|1800.33
| 1730.96
|60.14
| 69.37
|600.33
| 530.96
|0.6317436766
| 0.6384156012
|-
|-
|10
| 9
|ln(10)
| ln(9)
|2.302585093
| 2.197224577
|1443.91
| 1362.82
|81.09
| 95.38
|243.91
| 162.82
|H(10)
| H(9)
|2.928968254
| 2.828968254
|1860.47
| 1800.33
|52.92
| 60.14
|660.47
| 600.33
|0.626383161
| 0.6317436766
|-
|-
|11
| 10
|ln(11)
| ln(10)
|2.397895273
| 2.302585093
|1514.12
| 1443.91
|70.22
| 81.09
|314.12
| 243.91
|H(11)
| H(10)
|3.019877345
| 2.928968254
|1913.39
| 1860.47
|47.13
| 52.92
|713.39
| 660.47
|0.6219820721
| 0.626383161
|-
|-
|12
| 11
|ln(12)
| ln(11)
|2.48490665
| 2.397895273
|1575.83
| 1514.12
|61.71
| 70.22
|375.83
| 314.12
|H(12)
| H(11)
|3.103210678
| 3.019877345
|1960.51
| 1913.39
|42.39
| 47.13
|760.51
| 713.39
|0.6183040284
| 0.6219820721
|-
|-
|13
| 12
|ln(13)
| ln(12)
|2.564949357
| 2.48490665
|1630.72
| 1575.83
|54.89
| 61.71
|430.72
| 375.83
|H(13)
| H(12)
|3.180133755
| 3.103210678
|2002.90
| 1960.51
|38.45
| 42.39
|802.90
| 760.51
|0.6151843977
| 0.6183040284
|-
|-
|14
| 13
|ln(14)
| ln(13)
|2.63905733
| 2.564949357
|1680.03
| 1630.72
|49.31
| 54.89
|480.03
| 430.72
|H(14)
| H(13)
|3.251562327
| 3.180133755
|2041.36
| 2002.90
|35.14
| 38.45
|841.36
| 802.90
|0.6125049969
| 0.6151843977
|-
|-
|15
| 14
|ln(15)
| ln(14)
|2.708050201
| 2.63905733
|1724.71
| 1680.03
|44.68
| 49.31
|524.71
| 480.03
|H(15)
| H(14)
|3.318228993
| 3.251562327
|2076.50
| 2041.36
|32.31
| 35.14
|876.50
| 841.36
|0.6101787921
| 0.6125049969
|-
|-
|16
| 15
|ln(16)
| ln(15)
|2.772588722
| 2.708050201
|1765.48
| 1724.71
|40.77
| 44.68
|565.48
| 524.71
|H(16)
| H(15)
|3.380728993
| 3.318228993
|2108.80
| 2076.50
|29.86
| 32.31
|908.80
| 876.50
|0.608140271
| 0.6101787921
|-
|-
|17
| 16
|ln(17)
| ln(16)
|2.833213344
| 2.772588722
|1802.93
| 1765.48
|37.45
| 40.77
|602.93
| 565.48
|H(17)
| H(16)
|3.439552523
| 3.380728993
|2138.67
| 2108.80
|27.74
| 29.86
|938.67
| 908.80
|0.6063391786
| 0.608140271
|-
|-
|18
| 17
|ln(18)
| ln(17)
|2.890371758
| 2.833213344
|1837.51
| 1802.93
|34.58
| 37.45
|637.51
| 602.93
|H(18)
| H(17)
|3.495108078
| 3.439552523
|2166.40
| 2138.67
|25.88
| 27.74
|966.40
| 938.67
|0.6047363203
| 0.6063391786
|-
|-
|19
| 18
|ln(19)
| ln(18)
|2.944438979
| 2.890371758
|1869.59
| 1837.51
|32.09
| 34.58
|669.59
| 637.51
|H(19)
| H(18)
|3.547739657
| 3.495108078
|2192.28
| 2166.40
|24.23
| 25.88
|992.28
| 966.40
|0.603300678
| 0.6047363203
|-
|-
|20
| 19
|ln(20)
| ln(19)
|2.995732274
| 2.944438979
|1899.49
| 1869.59
|29.90
| 32.09
|699.49
| 669.59
|H(20)
| H(19)
|3.597739657
| 3.547739657
|2216.51
| 2192.28
|22.76
| 24.23
|1016.51
| 992.28
|0.6020073836
| 0.603300678
|-
|-
|21
| 20
|ln(21)
| ln(20)
|3.044522438
| 2.995732274
|1927.46
| 1899.49
|27.97
| 29.90
|727.46
| 699.49
|H(21)
| H(20)
|3.645358705
| 3.597739657
|2239.27
| 2216.51
|21.45
| 22.76
|1039.27
| 1016.51
|0.600836267
| 0.6020073836
|-
|-
|22
| 21
|ln(22)
| ln(21)
|3.091042453
| 3.044522438
|1953.71
| 1927.46
|26.25
| 27.97
|753.71
| 727.46
|H(22)
| H(21)
|3.69081325
| 3.645358705
|2260.73
| 2239.27
|20.27
| 21.45
|1060.73
| 1039.27
|0.5997707969
| 0.600836267
|-
|-
|23
| 22
|ln(23)
| ln(22)
|3.135494216
| 3.091042453
|1978.43
| 1953.71
|24.72
| 26.25
|778.43
| 753.71
|H(23)
| H(22)
|3.734291511
| 3.69081325
|2281.00
| 2260.73
|19.21
| 20.27
|1081.00
| 1060.73
|0.5987972952
| 0.5997707969
|-
|-
|24
| 23
|ln(24)
| ln(23)
|3.17805383
| 3.135494216
|2001.77
| 1978.43
|23.34
| 24.72
|801.77
| 778.43
|H(24)
| H(23)
|3.775958178
| 3.734291511
|2300.21
| 2281.00
|18.24
| 19.21
|1100.21
| 1081.00
|0.5979043474
| 0.5987972952
|-
|-
|25
| 24
|ln(25)
| ln(24)
|3.218875825
| 3.17805383
|2023.87
| 2001.77
|22.10
| 23.34
|823.87
| 801.77
|H(25)
| H(24)
|3.815958178
| 3.775958178
|2318.45
| 2300.21
|17.36
| 18.24
|1118.45
| 1100.21
|0.5970823529
| 0.5979043474
|-
|-
|26
| 25
|ln(26)
| ln(25)
|3.258096538
| 3.218875825
|2044.84
| 2023.87
|20.97
| 22.10
|844.84
| 823.87
|H(26)
| H(25)
|3.854419716
| 3.815958178
|2335.82
| 2318.45
|16.56
| 17.36
|1135.82
| 1118.45
|0.5963231782
| 0.5970823529
|-
|-
|27
| 26
|ln(27)
| ln(26)
|3.295836866
| 3.258096538
|2064.77
| 2044.84
|19.94
| 20.97
|864.77
| 844.84
|H(27)
| H(26)
|3.891456753
| 3.854419716
|2352.37
| 2335.82
|15.82
| 16.56
|1152.37
| 1135.82
|0.5956198872
| 0.5963231782
|-
|-
|28
| 27
|ln(28)
| ln(27)
|3.33220451
| 3.295836866
|2083.77
| 2064.77
|19.00
| 19.94
|883.77
| 864.77
|H(28)
| H(27)
|3.927171039
| 3.891456753
|2368.19
| 2352.37
|15.13
| 15.82
|1168.19
| 1152.37
|0.5949665288
| 0.5956198872
|-
|-
|29
| 28
|ln(29)
| ln(28)
|3.36729583
| 3.33220451
|2101.91
| 2083.77
|18.14
| 19.00
|901.91
| 883.77
|H(29)
| H(28)
|3.961653798
| 3.927171039
|2383.32
| 2368.19
|14.51
| 15.13
|1183.32
| 1168.19
|0.5943579676
| 0.5949665288
|-
|-
|30
| 29
|ln(30)
| ln(29)
|3.401197382
| 3.36729583
|2119.25
| 2101.91
|17.34
| 18.14
|919.25
| 901.91
|H(30)
| H(29)
|3.994987131
| 3.961653798
|2397.83
| 2383.32
|13.92
| 14.51
|1197.83
| 1183.32
|0.5937897493 ... -> ''γ ='' 0.5772156649
| 0.5943579676
|-
| 30
| ln(30)
| 3.401197382
| 2119.25
| 17.34
| 919.25
| H(30)
| 3.994987131
| 2397.83
| 13.92
| 1197.83
| 0.5937897493 ... -> ''γ ='' 0.5772156649
|}
|}


Line 722: Line 721:


== Emulatory matharmonic series ==
== Emulatory matharmonic series ==
The first two steps of the matharmonic series are 1 and 3/2, which have the same ratio as the second and third steps of the harmonic series, 2 and 3. To make them align the matharmonic series may be rebased onto 2, starting it a step late, inserting a 1 before it starts. This brings it closer in similarity to the harmonic series; this similarity could be useful when using the entire series as a scale rather than drawing scales from it. We therefore propose referring to this variation as the "emulatory edharmonic series", because it emulates the harmonic series.
The first two steps of the matharmonic series are 1 and 3/2, which have the same ratio as the second and third steps of the harmonic series, 2 and 3. To make them align the matharmonic series may be rebased onto 2, starting it a step late, inserting a 1 before it starts. This brings it closer in similarity to the harmonic series; this similarity could be useful when using the entire series as a scale rather than drawing scales from it. We therefore propose referring to this variation as the "emulatory edharmonic series", because it emulates the harmonic series.
{| class="wikitable"
{| class="wikitable"
|+
|-
| rowspan="2" |'''pitch #'''
| rowspan="2" ! Pitch #
| colspan="4" rowspan="1" |'''harmonic series'''
| colspan="4" rowspan="1" ! Harmonic series
| colspan="5" |'''emulatory matharmonic series'''
| colspan="5" ! Emulatory matharmonic series
|-
|-
|'''frequency multiplier (decimal)'''
! Frequency multiplier (decimal)
|'''pitch (¢)'''
! Pitch (¢)
|'''pitch Δ (¢)'''
! Pitch Δ (¢)
|'''octave reduced pitch (¢)'''
! Octave reduced pitch (¢)
|'''frequency multiplier (definition)'''
! Frequency multiplier (definition)
|'''frequency multiplier (decimal)'''
! Frequency multiplier (decimal)
|'''pitch (¢)'''
! Pitch (¢)
|'''pitch Δ (¢)'''
! Pitch Δ (¢)
|'''octave reduced pitch (¢)'''
! Octave reduced pitch (¢)
|-
|-
|'''1'''
! 1
|1.000000
| 1.000000
|0.00
| 0.00
| -
| -
|0.000000
| 0.000000
|1
| 1
|1
| 1
|0.00
| 0.00
|0.00
| 0.00
|1200.00
| 1200.00
|-
|-
|'''2'''
! 2
|2.000000
| 2.000000
|1200.00
| 1200.00
|1200.00
| 1200.00
|0.000000
| 0.000000
|2⋅H(1)
| 2⋅H(1)
|2
| 2
|1200.00
| 1200.00
|0.00
| 0.00
|701.96
| 701.96
|-
|-
|'''3'''
! 3
|3.000000
| 3.000000
|1901.96
| 1901.96
|701.96
| 701.96
|701.955001
| 701.955001
|2⋅H(2)
| 2⋅H(2)
|3
| 3
|1901.96
| 1901.96
|701.96
| 701.96
|347.41
| 347.41
|-
|-
|'''4'''
! 4
|4.000000
| 4.000000
|2400.00
| 2400.00
|498.04
| 498.04
|0.000000
| 0.000000
|2⋅H(3)
| 2⋅H(3)
|3.666666667
| 3.666666667
|2249.36
| 2249.36
|1049.36
| 1049.36
|221.31
| 221.31
|-
|-
|'''5'''
! 5
|5.000000
| 5.000000
|2786.31
| 2786.31
|386.31
| 386.31
|386.313714
| 386.313714
|2⋅H(4)
| 2⋅H(4)
|4.166666667
| 4.166666667
|2470.67
| 2470.67
|70.67
| 70.67
|158.70
| 158.70
|-
|-
|'''6'''
! 6
|6.000000
| 6.000000
|3101.96
| 3101.96
|315.64
| 315.64
|701.955001
| 701.955001
|2⋅H(5)
| 2⋅H(5)
|4.566666667
| 4.566666667
|2629.37
| 2629.37
|229.37
| 229.37
|121.97
| 121.97
|-
|-
|'''7'''
! 7
|7.000000
| 7.000000
|3368.83
| 3368.83
|266.87
| 266.87
|968.825906
| 968.825906
|2⋅H(6)
| 2⋅H(6)
|4.9
| 4.9
|2751.34
| 2751.34
|351.34
| 351.34
|98.11
| 98.11
|-
|-
|'''8'''
! 8
|8.000000
| 8.000000
|3600.00
| 3600.00
|231.17
| 231.17
|0.000000
| 0.000000
|2⋅H(7)
| 2⋅H(7)
|5.185714286
| 5.185714286
|2849.45
| 2849.45
|449.45
| 449.45
|81.51
| 81.51
|-
|-
|'''9'''
! 9
|9.000000
| 9.000000
|3803.91
| 3803.91
|203.91
| 203.91
|203.910002
| 203.910002
|2⋅H(8)
| 2⋅H(8)
|5.435714286
| 5.435714286
|2930.96
| 2930.96
|530.96
| 530.96
|69.37
| 69.37
|-
|-
|'''10'''
! 10
|10.000000
| 10.000000
|3986.31
| 3986.31
|182.40
| 182.40
|386.313714
| 386.313714
|2⋅H(9)
| 2⋅H(9)
|5.657936508
| 5.657936508
|3000.33
| 3000.33
|600.33
| 600.33
|60.14
| 60.14
|-
|-
|'''11'''
! 11
|11.000000
| 11.000000
|4151.32
| 4151.32
|165.00
| 165.00
|551.317942
| 551.317942
|2⋅H(10)
| 2⋅H(10)
|5.857936508
| 5.857936508
|3060.47
| 3060.47
|660.47
| 660.47
|52.92
| 52.92
|-
|-
|'''12'''
! 12
|12.000000
| 12.000000
|4301.96
| 4301.96
|150.64
| 150.64
|701.955001
| 701.955001
|2⋅H(11)
| 2⋅H(11)
|6.03975469
| 6.03975469
|3113.39
| 3113.39
|713.39
| 713.39
|47.13
| 47.13
|-
|-
|'''13'''
! 13
|13.000000
| 13.000000
|4440.53
| 4440.53
|138.57
| 138.57
|840.527662
| 840.527662
|2⋅H(12)
| 2⋅H(12)
|6.206421356
| 6.206421356
|3160.51
| 3160.51
|760.51
| 760.51
|42.39
| 42.39
|-
|-
|'''14'''
! 14
|14.000000
| 14.000000
|4568.83
| 4568.83
|128.30
| 128.30
|968.825906
| 968.825906
|2⋅H(13)
| 2⋅H(13)
|6.36026751
| 6.36026751
|3202.90
| 3202.90
|802.90
| 802.90
|38.45
| 38.45
|-
|-
|'''15'''
! 15
|15.000000
| 15.000000
|4688.27
| 4688.27
|119.44
| 119.44
|1088.268715
| 1088.268715
|2⋅H(14)
| 2⋅H(14)
|6.503124653
| 6.503124653
|3241.36
| 3241.36
|841.36
| 841.36
|35.14
| 35.14
|-
|-
|'''16'''
! 16
|16.000000
| 16.000000
|4800.00
| 4800.00
|111.73
| 111.73
|0.000000
| 0.000000
|2⋅H(15)
| 2⋅H(15)
|6.636457986
| 6.636457986
|3276.50
| 3276.50
|876.50
| 876.50
|34.44
| 34.44
|}
|}
An analogous [https://en.xen.wiki/w/Powharmonic_series#Emulatory_edharmonic_series emulatory edharmonic series] exists.
An analogous [https://en.xen.wiki/w/Powharmonic_series#Emulatory_edharmonic_series emulatory edharmonic series] exists.


== Sublogharmonic series ==
== Sublogharmonic series ==
Just like the subharmonic series can be found by using one over the frequency of any step of the harmonic series, an equivalent sublogharmonic series may be found by using one over the frequency of any step of a logharmonic series.  
Just like the subharmonic series can be found by using one over the frequency of any step of the harmonic series, an equivalent sublogharmonic series may be found by using one over the frequency of any step of a logharmonic series.  


== Sound of the logharmonic series as a timbre ==
== Sound of the logharmonic series as a timbre ==
The usual harmonic series can be thought of as being derived from a periodic timbre, such as a sawtooth wave. In general, we can derive the sawtooth wave as
The usual harmonic series can be thought of as being derived from a periodic timbre, such as a sawtooth wave. In general, we can derive the sawtooth wave as


Line 951: Line 947:


== Listening ==  
== Listening ==  
[https://www.youtube.com/watch?v=VoPv-YziWoc The Apples in Stereo - C.P.U.]
[https://www.youtube.com/watch?v=VoPv-YziWoc The Apples in Stereo - C.P.U.]


== See also ==
== See also ==
 
* [[Harmonotonic tunings]]: logharmonic series are non-[[Arithmetic tunings|arithmetic]] harmonotonic tunings.
[[Harmonotonic tunings]]: logharmonic series are non-[[Arithmetic tunings|arithmetic]] harmonotonic tunings.
* [[Powharmonic series]]: another type of non-arithmetic harmonotonic tuning.
 
* [[Xenharmonic series]]
[[Powharmonic series]]: another type of non-arithmetic harmonotonic tuning.
* [[Logarithmic intonation]]
 
* {{W|Robert Schneider#Non-Pythagorean scale|Robert Schneider's non-Pythagorean scale on Wikipedia}}
[[Xenharmonic series]]
 
[[Logarithmic intonation]]
 
[https://en.wikipedia.org/wiki/Robert_Schneider#Non-Pythagorean_scale Robert_Schneider - Non-Pythagorean_scale on Wikipedia]


[[Category:Otonality and utonality]]
[[Category:Otonality and utonality]]
[[Category:Otonality]]
[[Category:Otonality]]
[[Category:Harmonic]]
[[Category:Harmonic]]
[[Category:Harmonic series‏‎]]
[[Category:Harmonic series]]
[[Category:Utonality]]
[[Category:Utonality]]
[[Category:Subharmonic]]
[[Category:Subharmonic]]
[[Category:Subharmonic series‏‎]]
[[Category:Subharmonic series]]
[[Category:Xenharmonic series]]
[[Category:Xenharmonic series]]
Retrieved from "https://en.xen.wiki/w/Logharmonic_series"