Superpartient ratio: Difference between revisions
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== Definitions == | == Definitions == | ||
In ancient Greece, fractions like 3/1 and 5/1 were not considered to be epimeric ratios because of their additional restriction that [[Harmonic|multiples of the fundamental]] cannot be epimeric. Epimeric ratios were considered to be inferior to epimoric ratios. | In ancient Greece, fractions like 3/1 and 5/1 were not considered to be epimeric ratios because of their additional restriction that [[Harmonic|multiples of the fundamental]] cannot be epimeric. Epimeric ratios were considered to be inferior to epimoric ratios. | ||
== Delta-N terminology == | |||
The delta of a [[ratio]] is simply the difference between its numerator and its denominator. (Delta is also known as degree of epimoricity.) A ratio with a delta of N is called a delta-N ratio. | |||
{| class="wikitable" style="text-align:center;" | |||
|+ | |||
examples | |||
!delta-1 ratios | |||
|2/1 | |||
|3/2 | |||
|4/3 | |||
|5/4 | |||
|6/5 | |||
|7/6 | |||
|etc. | |||
|- | |||
!delta-2 ratios | |||
|3/1 | |||
|5/3 | |||
|7/5 | |||
|9/7 | |||
|11/9 | |||
|13/11 | |||
|etc. | |||
|- | |||
!delta-3 ratios | |||
|4/1 | |||
|5/2 | |||
|7/4 | |||
|8/5 | |||
|10/7 | |||
|11/8 | |||
|etc. | |||
|- | |||
!delta-4 ratios | |||
|5/1 | |||
|7/3 | |||
|9/5 | |||
|11/7 | |||
|13/9 | |||
|15/11 | |||
|etc. | |||
|} | |||
Thus [[superparticular]] ratios are delta-1 ratios, and [[Superpartient ratio|superpartient ratios]] are all ratios except delta-1 ratios. The delta-N terminology was coined by [[Kite Giedraitis]]. | |||
== Superpartient subcategories == | == Superpartient subcategories == | ||