[[File:Pepsi Plot.png|thumb|A graphical expression of the interval chain of the Pepsi.]]
[[File:Pepsi Plot.png|thumb|A graphical expression of the interval chain of the Pepsi.]]
The '''Pepsi'''{{idiosyncratic}}, one of "irregular" temperament, is constructed by the repetition of power of √3 starting from [[3/2]] (701.955¢). It can also be regarded as a [[Regular temperament]] on the logarithmic axis, i.e., a sequence of intervals with double exponentiational increment (<math>702\cdot2^{3^{n/2}}</math>¢).
The '''Pepsi'''{{idiosyncratic}}, one of "irregular" temperament, is constructed by the repetition of power of √3 starting from [[3/2]] (701.955¢). It can also be regarded as a [[Regular temperament]] on the logarithmic axis, i.e., a sequence of intervals with double exponentiational increment (<math>702\cdot3^{n/2}</math>¢).
at first glance this temperament exhibits characteristics similar to [[Redbull]], the direction of its potential use value is fundamentally different because of the different construction methods. Also, since the double index is not a tetration (obvious), this scale cannot be expressed in [[EDSO]] or [[Super-pitch]]ies.
at first glance this temperament exhibits characteristics similar to [[Redbull]], the direction of its potential use value is fundamentally different because of the different construction methods. Also, since the double index is not a tetration (obvious), this scale cannot be expressed in [[EDSO]] or [[Super-pitch]]ies.
Revision as of 05:05, 5 January 2024
A graphical expression of the interval chain of the Pepsi.
The Pepsi[idiosyncratic term], one of "irregular" temperament, is constructed by the repetition of power of √3 starting from 3/2 (701.955¢). It can also be regarded as a Regular temperament on the logarithmic axis, i.e., a sequence of intervals with double exponentiational increment ([math]\displaystyle{ 702\cdot3^{n/2} }[/math]¢).
at first glance this temperament exhibits characteristics similar to Redbull, the direction of its potential use value is fundamentally different because of the different construction methods. Also, since the double index is not a tetration (obvious), this scale cannot be expressed in EDSO or Super-pitchies.
