4096/3993: Difference between revisions

Interval information
Ratio	4096/3993
Factorization	212 × 3-1 × 11-3
Monzo	[12 -1 0 0 -3⟩
Size in cents	44.09117¢
Names	Alpharabian paralimma,; Alpharabian paradiatonic semilimma,; Alpharabian semilimmic inframinor second
Color name	s1u32, satrilu 2nd
FJS name	[math]\displaystyle{ \text{M2}_{11,11,11} }[/math]
Special properties	reduced,; reduced subharmonic
Tenney norm (log2 nd)	23.9633
Weil norm (log2 max(n, d))	24
Wilson norm (sopfr(nd))	60
Comma size	medium
	Open this interval in xen-calc

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Latest revision as of 21:36, 1 April 2025

4096/3993, the Alpharabian paralimma or Alpharabian paradiatonic semilimma, is only just shy of being half of 256/243- the Pythagorean limma- being separated from the nearby 1331/1296, the interval forming the other part of the Pythagorean limma, by the nexus comma.

It is also notable for being one of only two quartertone intervals in the 11-limit- specifically the 2.3.11 subgroup- needed in order to add up to a familiar 9/8 whole tone. Specifically, it is the quartertone that forms the difference between the whole tone and a stack of three 33/32 quartertones, and can thus be regarded as being some sort of second- specifically, the Alpharabian semilimmic inframinor second, not to be confused with 8192/8019, the Alpharabian inframinor second, as the two intervals are only equated when 243/242, the rastma, is tempered out.

Remarkably, 4096/3993 is currently the simplest interval in terms of odd-limit that is known to result from stacking three identical quartertones with rational intervals and subtracting said stack from a 9/8 whole tone. Furthermore, although 38/37, 35/34, 32/31 and 28/27 are all simpler intervals that can be called "quarter tones" and can safely be regarded as some kind of second, subtracting any one of these intervals from 9/8 yields an interval that has a ratio lacking a cubed number in the numerator and or the denominator, and such an interval cannot be split into three equal quartertones with rational intervals.

Temperaments

Tempering out the paralimma in the 2.3.11 subgroup results in paralimmal temperament, where 3/1 is divided into 3 flat 16/11 generators.

@@ Line 2: / Line 2: @@
 | Name = Alpharabian paralimma, Alpharabian paradiatonic semilimma, Alpharabian semilimmic inframinor second
 | Color name = s1u<sup>3</sup>2, satrilu 2nd
+| Comma = yes
 }}
-'''4096/3993''', the '''Alpharabian paralimma''' or '''Alpharabian paradiatonic semilimma''', is only just shy of being half of [[256/243]]- the Pythagorean limma- being separated from the nearby [[1331/1296]], the interval forming the other part of the Pythagorean limma, by the [[nexus comma]].  It is also notable for being one of only two quartertone intervals in the [[11-limit]], specifically the 2.3.11 [[subgroup]], needed in order to add up to a familiar [[9/8]] whole tone.  Specifically, it is the quartertone that forms the difference between the whole tone and a stack of three [[33/32]] quartertones, and can thus be regarded as being some sort of second- specifically, the '''Alpharabian semilimmic inframinor second''', not to be confused with [[8192/8019]], the Alpharabian inframinor second, as the two intervals are only equated when [[243/242]], the rastma, is tempered out.
+'''4096/3993''', the '''Alpharabian paralimma''' or '''Alpharabian paradiatonic semilimma''', is only just shy of being half of [[256/243]]- the Pythagorean limma- being separated from the nearby [[1331/1296]], the interval forming the other part of the Pythagorean limma, by the [[nexus comma]].
-Remarkably, 4096/3993 is currently the simplest interval in terms of odd-limit that is known to result from stacking three identical quartertones with rational intervals and subtracting said stack from a 9/8 whole tone.  Furthermore, although [[38/37]], [[35/34]], [[32/31]] and [[28/27]] are all simpler intervals that can be called "quarter tones" and can safely be regarded as some kind of second, subtracting any one of these intervals from 9/8 yields an interval that has a ratio lacking a cubed number in the numerator and or the denominator, and such an interval cannot be split into three equal quartertones with rational intervals.
+It is also notable for being one of only two [[quartertone]] intervals in the [[11-limit]]- specifically the 2.3.11 [[subgroup]]- needed in order to add up to a familiar [[9/8]] whole tone.  Specifically, it is the quartertone that forms the difference between the whole tone and a stack of three [[33/32]] quartertones, and can thus be regarded as being some sort of second- specifically, the '''Alpharabian semilimmic inframinor second''', not to be confused with [[8192/8019]], the Alpharabian inframinor second, as the two intervals are only equated when [[243/242]], the rastma, is tempered out.
+Remarkably, 4096/3993 is currently the simplest interval in terms of [[odd-limit]] that is known to result from stacking three identical quartertones with rational intervals and subtracting said stack from a 9/8 whole tone.  Furthermore, although [[38/37]], [[35/34]], [[32/31]] and [[28/27]] are all simpler intervals that can be called "quarter tones" and can safely be regarded as some kind of second, subtracting any one of these intervals from 9/8 yields an interval that has a ratio lacking a cubed number in the numerator and or the denominator, and such an interval cannot be split into three equal quartertones with rational intervals.
+== Temperaments ==
+[[Tempering out]] the paralimma in the 2.3.11 subgroup results in [[No-fives subgroup temperaments#Paralimmal|paralimmal]] temperament, where [[3/1]] is divided into 3 flat [[16/11]] generators.
 == See also ==
@@ Line 15: / Line 21: @@
 [[Category:Quartertone]]
 [[Category:Alpharabian]]
+[[Category:Commas named after polymaths]]
+[[Category:Commas named after their interval size]]

4096/3993: Difference between revisions

Latest revision as of 21:36, 1 April 2025

Temperaments

See also

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