2901533edo: Difference between revisions

(3 intermediate revisions by 3 users not shown)

Line 1:

{{Infobox ET

| Consistency=131

| Distinct consistency=131

}}

Except for 8 barely~~-inconsistent~~ interval pairs, it is consistent in the 137-prime-limited no-247's 255-odd-limit (a total of 4067 interval pairs), with primes 151, 157, 163, 173, 181, 197 and 211 being includeable to that odd limit for a tiny penalty of only 3 more barely-inconsistent interval pairs (and for a total of 4830). Including odd 247 adds 8 more inconsistent interval pairs and 90 more consistent interval pairs for a total of 4928 interval pairs (of which 19 interval pairs are inconsistent). Because of its unusual [[consistency]] at its size range, it could be a candidate for "miracle [[edo]]" (not [[miracle]], the temperament) after [[311edo]], although this is not entirely certain or clear because a deep exhaustive search of comprehensive odd-limit performance has not been done up until this point, but it is at least significant that it holds a significant amount of records for [[odd limit]] [[consistency]] as detailed on the page for [[minimal consistent ~~EDOs~~]]. Furthermore, it is consistent up to the ~~25-~~[[~~Odd~~ prime sum limit|OPSL]], and is [[Consistency#Consistency to distance d|consistent to distance 4]] in the 16-OPSL.

Except for 8 barely in[[consistent]] interval pairs, 2901533edo is consistent in the 137-prime-limited no-247's 255-odd-limit (a total of 4067 interval pairs), with primes 151, 157, 163, 173, 181, 197 and 211 being includeable to that odd limit for a tiny penalty of only 3 more barely-inconsistent interval pairs (and for a total of 4830). Including odd 247 adds 8 more inconsistent interval pairs and 90 more consistent interval pairs for a total of 4928 interval pairs (of which 19 interval pairs are inconsistent). Because of its unusual [[consistency]] at its size range, it could be a candidate for "miracle [[edo]]" (not [[miracle]], the temperament) after [[311edo]], although this is not entirely certain or clear because a deep exhaustive search of comprehensive odd-limit performance has not been done up until this point, but it is at least significant that it holds a significant amount of records for [[odd limit]] [[consistency]] as detailed on the page for [[minimal consistent edos]]. Furthermore, it is consistent up to the [[odd prime sum limit|25-OPSL]], and is [[Consistency #Consistency to distance d|consistent to distance 4]] in the 16-OPSL.

=== Prime harmonics ===

{{Harmonics in equal|2901533|columns=12|start=13|title=Approximation of prime harmonics in 2901533edo (continued)}}

{{Harmonics in equal|2901533|columns=12|start=13|collapsed=true|title=Approximation of prime harmonics in 2901533edo (continued)}}

{{Harmonics in equal|2901533|columns=12|start=25|title=Approximation of prime harmonics in 2901533edo (continued)}}

{{Harmonics in equal|2901533|columns=12|start=25|collapsed=true|title=Approximation of prime harmonics in 2901533edo (continued)}}

{{Harmonics in equal|2901533|columns=12|start=37|title=Approximation of prime harmonics in 2901533edo (continued)}}

{{Harmonics in equal|2901533|columns=12|start=37|collapsed=true|title=Approximation of prime harmonics in 2901533edo (continued)}}

=== Subsets and supersets ===

2901533 = 433 × 6701, so 2901533edo contains [[433edo]] and [[6701edo]] as subsets.

{{Nowrap|2901533 {{=}} 433 × 6701}}, so 2901533edo contains [[433edo]] and [[6701edo]] as subsets.

@@ Line 1: / Line 1: @@
-{{Infobox ET|Consistency=131|Distinct consistency=131}}
+{{Mathematical interest}}
-{{EDO intro|2901533}}
+{{Infobox ET
+| Consistency=131
+| Distinct consistency=131
+}}
+{{ED intro}}
-Except for 8 barely-inconsistent interval pairs, it is consistent in the 137-prime-limited no-247's 255-odd-limit (a total of 4067 interval pairs), with primes 151, 157, 163, 173, 181, 197 and 211 being includeable to that odd limit for a tiny penalty of only 3 more barely-inconsistent interval pairs (and for a total of 4830). Including odd 247 adds 8 more inconsistent interval pairs and 90 more consistent interval pairs for a total of 4928 interval pairs (of which 19 interval pairs are inconsistent). Because of its unusual [[consistency]] at its size range, it could be a candidate for "miracle [[edo]]" (not [[miracle]], the temperament) after [[311edo]], although this is not entirely certain or clear because a deep exhaustive search of comprehensive odd-limit performance has not been done up until this point, but it is at least significant that it holds a significant amount of records for [[odd limit]] [[consistency]] as detailed on the page for [[minimal consistent EDOs]]. Furthermore, it is consistent up to the 25-[[Odd prime sum limit|OPSL]], and is [[Consistency#Consistency to distance d|consistent to distance 4]] in the 16-OPSL.
+Except for 8 barely in[[consistent]] interval pairs, 2901533edo is consistent in the 137-prime-limited no-247's 255-odd-limit (a total of 4067 interval pairs), with primes 151, 157, 163, 173, 181, 197 and 211 being includeable to that odd limit for a tiny penalty of only 3 more barely-inconsistent interval pairs (and for a total of 4830). Including odd 247 adds 8 more inconsistent interval pairs and 90 more consistent interval pairs for a total of 4928 interval pairs (of which 19 interval pairs are inconsistent). Because of its unusual [[consistency]] at its size range, it could be a candidate for "miracle [[edo]]" (not [[miracle]], the temperament) after [[311edo]], although this is not entirely certain or clear because a deep exhaustive search of comprehensive odd-limit performance has not been done up until this point, but it is at least significant that it holds a significant amount of records for [[odd limit]] [[consistency]] as detailed on the page for [[minimal consistent edos]]. Furthermore, it is consistent up to the [[odd prime sum limit|25-OPSL]], and is [[Consistency #Consistency to distance d|consistent to distance 4]] in the 16-OPSL.
 === Prime harmonics ===
 {{Harmonics in equal|2901533|columns=12}}
-{{Harmonics in equal|2901533|columns=12|start=13|title=Approximation of prime harmonics in 2901533edo (continued)}}
+{{Harmonics in equal|2901533|columns=12|start=13|collapsed=true|title=Approximation of prime harmonics in 2901533edo (continued)}}
-{{Harmonics in equal|2901533|columns=12|start=25|title=Approximation of prime harmonics in 2901533edo (continued)}}
+{{Harmonics in equal|2901533|columns=12|start=25|collapsed=true|title=Approximation of prime harmonics in 2901533edo (continued)}}
-{{Harmonics in equal|2901533|columns=12|start=37|title=Approximation of prime harmonics in 2901533edo (continued)}}
+{{Harmonics in equal|2901533|columns=12|start=37|collapsed=true|title=Approximation of prime harmonics in 2901533edo (continued)}}
 === Subsets and supersets ===
-2901533 = 433 × 6701, so 2901533edo contains [[433edo]] and [[6701edo]] as subsets.
+{{Nowrap|2901533 {{=}} 433 × 6701}}, so 2901533edo contains [[433edo]] and [[6701edo]] as subsets.