Interseptimal interval: Difference between revisions

In the theory of [[Margo_Schulter|Margo Schulter]], ''interseptimal'' is a category of intervals which occupy regions intermediate between two septimal ratios such as [[8/7|8/7]] and [[7/6|7/6]], or [[12/7|12/7]] and [[7/4|7/4]]. There are four interseptimal regions given below, with approximate cents ranges from Schulter's article [http://www.bestii.com/%7Emschulter/IntervalSpectrumRegions.txt Regions of the Interval Spectrum]:

<ol><li>Maj2-min3 -- intermediate between 8/7 and 7/6 -- 240¢-260¢</li><li>Maj3-4 -- intermediate between [[9/7|9/7]] and [[21/16|21/16]] -- 440¢-468¢</li><li>5-min6 -- intermediate between [[32/21|32/21]] and [[14/9|14/9]] -- 732¢-760¢</li><li>Maj6-min7 -- intermediate between 12/7 and 7/4 -- 940¢-960¢</li></ol>

Interseptimal intervals are well-represented in [[24edo|24edo]] at 250¢, 450¢, 750¢ and 950¢. They also appear in [[19edo|19edo]] and [[29edo|29edo]].

<ol><li>240¢-260¢ -- semifourth -- an interval of this size is around half the size of a perfect fourth.</li><li>440¢-468¢ -- semisixth -- an interval of this size is around half the size of a major sixth.</li><li>732¢-760¢ -- semitenth -- an interval of this size is around half the size of a major tenth (i. e., compound major third). Another possible name is sesquifourth (since this is also about one and a half times the size of a perfect fourth).</li><li>940¢-960¢ -- semitwelfth -- an interval of this size is around half the size of a perfect twelfth (i e., a compound perfect fifth, or tritave). All even [[edt|edts]] have a semitwelfth of approximately 951 cents, analogous to the 600 cent tritone shared by all even edos.</li></ol>

By analogy the tritone could also be called a semioctave, although the term tritone is so well-established that seems is little reason to change it now. A key difference is that the tritone is intermediate between two septimal ratios separated by a jubilisma (50:49), whereas the other interseptimal ranges listed above are between two septimal ratios separated by a slendro diesis (49:48).

==Examples==

===Maj2-min3 - 240¢-260¢===

! | Interval

! | Cents Value

! | Prime Limit (if applicable)

| | 147/128

| | 239.607

| | 7

| | 1\[[5edo|5edo]]

| | 240.000

| | -

| | 54/47

| | 240.358

| | 47

| | 23/20

| | 241.961

| | 23

| | 1152/1001

| | 243.238

| | 13

| | 38/33

| | 244.240

| | 19

| | 144/125

| | 244.969

| | 5

| | [[15/13|15/13]]

| | 247.741

| | 13

| | 6\[[29edo|29edo]]

| | 248.276

| | -

| | 5\[[24edo|24edo]]

| | 250.000

| | -

| | 52/45

| | 250.304

| | 13

| | 37/32

| | 251.344

| | 37

| | 81/70

| | 252.680

| | 7

| | 4\[[19edo|19edo]]

| | 252.632

| | -

| | [[22/19|22/19]]

| | 253.805

| | 19

| | 29/25

| | 256.950

| | 29

| | 3\[[14edo|14edo]]

| | 257.143

| | -

| | 297/256

| | 257.183

| | 11

| | 36/31

| | 258.874

| | 31

| | 5\[[23edo|23edo]]

| | 260.870

| | -

===Maj3-4 - 440-468===

! | Interval

! | Cents Value

! | Prime Limit (if applicable)

| | 5\[[88cET|88cET]] or 11\[[30edo|30edo]]

| | 440.000

| | -

| | 40/31

| | 441.278

| | 31

| | 7\[[19edo|19edo]]

| | 442.015

| | -

| | 31/24

| | 443.081

| | 31

| | 10\[[27edo|27edo]]

| | 444.444

| | -

| | [[22/17|22/17]]

| | 446.363

| | 17

| | [[35/27|35/27]]

| | 449.275

| | 7

| | 3\[[8edo|8edo]]

| | 450.000

| | -

| | 48/37

| | 450.611

| | 37

| | [[13/10|13/10]]

| | 454.214

| | 13

| | 11\[[29edo|29edo]]

| | 455.172

| | -

| | 125/96

| | 456.986

| | 5

| | 8\[[21edo|21edo]]

| | 457.143

| | -

| | 56/43

| | 457.308

| | 43

| | 43/33

| | 458.245

| | 43

| | 30/23

| | 459.994

| | 23

| | 5\[[13edo|13edo]]

| | 461.538

| | -

| | 47/36

| | 461.597

| | 47

| | [[64/49|64/49]]

| | 462.348

| | 7

| | 98/75

| | 463.069

| | 7

| | [[17/13|17/13]]

| | 464.428

| | 17

| | 12\[[31edo|31edo]]

| | 464.516

| | -

| | 7\[[18edo|18edo]]

| | 466.667

| | -

| | 38/29

| | 467.936

| | 29

===5-min6 - 732¢-760¢===

! | Interval

! | Cents Value

! | Prime Limit (if applicable)

| | 5\[[Bohlen-Pierce|Bohlen-Pierce]]

| | 731.521

| | -

| | 29/19

| | 732.064

| | 29

| | 11\[[18edo|18edo]]

| | 733.333

| | -

| | 19\[[31edo|31edo]]

| | 735.484

| | -

| | [[26/17|26/17]]

| | 735.572

| | 17

| | 49/75

| | 736.931

| | 7

| | [[49/32|49/32]]

| | 737.652

| | 7

| | 72/47

| | 738.403

| | 47

| | 23/15

| | 740.006

| | 23

| | 66/43

| | 741.755

| | 43

| | 43/28

| | 742.692

| | 43

| | 13\[[21edo|21edo]]

| | 742.857

| | -

| | 182/125

| | 743.014

| | 5

| | 18\[[29edo|29edo]]

| | 744.828

| | -

| | [[20/13|20/13]]

| | 745.786

| | 13

| | 37/24

| | 749.389

| | 37

| | 5\[[8edo|8edo]]

| | 750.000

| | -

| | 54/35

| | 750.725

| | 7

| | [[17/11|17/11]]

| | 753.637

| | 17

| | 17\[[27edo|27edo]]

| | 755.556

| | -

| | 48/31

| | 756.919

| | 31

| | 12\[[19edo|19edo]]

| | 757.895

| | -

| | 31/20

| | 758.722

| | 31

| | 19\[[30edo|30edo]]

| | 760.000

| | -

===Maj6-min7 - 940-960===

! | Interval

! | Cents Value

! | Prime Limit (if applicable)

| | 18\[[23edo|23edo]]

| | 939.130

| | -

| | 31/18

| | 941.126

| | 31

| | 512/297

| | 942.817

| | 11

| | 11\[[14edo|14edo]]

| | 942.857

| | -

| | 50/29

| | 943.050

| | 29

| | [[19/11|19/11]]

| | 946.195

| | 19

| | 140/81

| | 947.320

| | 7

| | 15\[[19edo|19edo]]

| | 947.368

| | -

| | 64/37

| | 948.656

| | 37

| | 45/26

| | 949.696

| | 13

| | 19\[[24edo|24edo]]

| | 950.000

| | -

| | 23\[[29edo|29edo]]

| | 951.724

| | -

| | [[26/15|26/15]]

| | 952.259

| | 13

| | 125/72

| | 955.031

| | 5

| | 33/19

| | 955.760

| | 19

| | 1001/576

| | 956.762

| | 13

| | 40/23

| | 958.039

| | 23

| | 47/27

| | 959.642

| | 47

| | 4\[[5edo|5edo]]

| | 960.000

| | -

| | 256/147

| | 960.393

| | 7

See: [[interval_category|Interval Category]], [[Gallery_of_Just_Intervals|Gallery of Just Intervals]]     [[Category:interseptimal]]

[[Category:interval_category]]