User:CompactStar/Lefts and rights notation: Difference between revisions
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Pythagorean intervals do not use any lefts or rights. The left (L) interval in a given category is the simplest (with respect to [[Tenney height]]) interval which is flatter than the Pythagorean version. For example, the leftminor third is [[7/6]]. Similarly, the right (R) interval in a category is the simplest one that is sharper than the Pythagorean version (for minor thirds this is [[6/5]]). After this, the types split up into 4 using 2 lefts and rights: | Pythagorean intervals do not use any lefts or rights. The left (L) interval in a given category is the simplest (with respect to [[Tenney height]]) interval which is flatter than the Pythagorean version. For example, the leftminor third is [[7/6]]. Similarly, the right (R) interval in a category is the simplest one that is sharper than the Pythagorean version (for minor thirds this is [[6/5]]). After this, the types split up into 4 using 2 lefts and rights: | ||
* The leftleft (LL) interval is the simplest which is flatter than the left interval. For minor thirds: [[ | * The leftleft (LL) interval is the simplest which is flatter than the left interval. For minor thirds: [[43/37]] | ||
* The leftright (LR) interval is the simplest which is between the left interval and the Pythagorean interval. For minor thirds: [[13/11]] | * The leftright (LR) interval is the simplest which is between the left interval and the Pythagorean interval. For minor thirds: [[13/11]] | ||
* The rightleft (RL) interval is the simplest which is between the Pythagorean interval and the right interval. For minor thirds: [[19/16]] | * The rightleft (RL) interval is the simplest which is between the Pythagorean interval and the right interval. For minor thirds: [[19/16]] | ||
* The rightright (RR) interval is the simplest which is sharper than the right interval. For minor thirds: [[11/9]] | * The rightright (RR) interval is the simplest which is sharper than the right interval. For minor thirds: [[11/9]] | ||
And then using 3 lefts and rights: | And then using 3 lefts and rights: | ||
* The leftleftleft (LLL) interval is the simplest which is flatter than the leftleft interval. | |||
* The leftleftright (LLR) interval is the simplest which is between the leftleft interval and the left interval. | |||
* The leftrightleft (LRL) interval is the simplest which is between the left interval and the leftright interval. For minor thirds: [[20/17]] | |||
* The leftrightright (LRR) interval is the simplest which is between the leftright interval and the Pythagorean interval. For minor thirds: [[77/65]] | |||
* The rightleftleft (RLL) interval is the simplest which is between the Pythagorean interval and the rightleft interval. For minor thirds: [[51/43]] | |||
* The rightleftright (RLR) interval is the simplest which is between the rightleft and the right interval. | |||
* The rightrightleft (RRL) interval is the simplest which is between the right interval and the rightright interval. For minor thirds: [[17/14]] | |||
* The rightrightright (RRR) interval is the simplest which is sharper than the rightright interval. For minor thirds: [[38/31]] | |||
And so on. This sort of binary search can be applied for an arbitrary number of lefts and rights to name all just intervals in a category. | |||