Highly composite EDO: Difference between revisions
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The sequence is finite and has 430 terms starting with 10080. | The sequence is finite and has 430 terms starting with 10080. | ||
== Extension == | |||
It is possible to define N-generalized superabundant numbers as a set of numbers, for which sum of powers of divisors relative to the number is greater than all the ones before it. This means that superabundant numbers are the 1-generalized SA numbers, meanwhile 0-generalized numbers are highly composite. | |||
In terms of composition, this means that the EDO has the largest number of N-note cobinations in its divisors relative to its size than all other EDOs before it. 0-generalized, highly composite numbers, have the largest amount of divisor scales in EDO. 1-generalized have the largest amount of notes in those scales, and etc. | |||
== External links == | == External links == | ||