Father–3 equivalence continuum/Godtone's approach

The augmented-chromatic equivalence continuum is a continuum of 5-limit temperaments which equates a number of 128/125's (augmented commas) with the chroma, 25/24. As such, it represents the continuum of all 5-limit temperaments supported by 3edo.

This formulation has a specific reason: 128/125 is significantly smaller than 25/24, so that it makes sense to equate some number of 128/125's with 25/24, but because 25/24 = (25/16)/(3/2), this has the consequence of clearly relating the n in (128/125)ⁿ = 25/24 with how many 5/4's are used to reach 3/2 (when octave-reduced):

If n = 0, then it takes no 128/125's to reach 25/24, implying 25/24's size is 0 (so that it's tempered out), meaning that 3/2 is reached via (5/4)².

For integer n > 0, we always reach 25/24 via (25/16)/(128/125)ⁿ because of (128/125)ⁿ ~ 25/24 by definition, meaning that we reach 3/2 at 3n + 2 generators of ~5/4, octave-reduced.

The just value of n is log₂(25/24) / log₂(128/125) = 1.72125... where n = 2 corresponds to Würschmidt's comma.

* Note that "novamajor" (User:Godtone's name) is also called "isnes"; both names are based on the size of the generator being around 405 cents, but "isnes" was discovered as a point in the continuum while "novamajor" was discovered as one temperament in the quarter-chroma temperaments.

If we approximate the JIP with increasing accuracy, (that is, using n a rational that is an increasingly good approximation of 1.72125...) we find these high-accuracy temperaments:

The simplest of these is mutt which has interesting properties discussed there.

Also note that at n = -2/3, we find the exotemperament tempering out 32/27.