User:Nick Vuci/TonalityDiamond

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  Step 1: Take the numbers of an odd-limit and arrange them along two axes.
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  Step 2: Using one row as the numerator and the other as the denominator, fill in the cells with the ratios they form.
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  Step 3: Make sure the decimal form of the ratios is between 1 and 2. If it is not, double one of the numbers until it is.
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  Optional step: to make the rows play rooted chords, one half of the diamond (not including the middle unison row) must be lowered by an octave (represented by grey cells in image).

Note: the numbers of the odd-limit are generally arranged in one of three ways:

• numerically (ie, 1 3 5 7 9 11) as in Meyer's 7-limit diamond
• by tonal order (ie, 1 9 5 11 3 7) as in Partch's 11-limit diamond
• chordally (ie, 1 5 3 7 9 11) as in the layout for the Diamond Marimba

The tonality diamond was first formally explained by Max F. Meyer in his 1929 publication The Musician's Arithmetic^[1] using the 7-odd-limit.

Even though Harry Partch gives a different story for how he discovered the concept, it is likely this source that gave him the idea, which he then extended to the 11-odd-limit and made the basis of his tonal system.

Erv Wilson in particular was inspired by the tonality diamond and developed a number of "diamonds" himself.^[2]

The first novel xenharmonic temperament — George Secor's later-named "Miracle" temperament — was made to approximate Partch's 11-limit diamond.

Instrument layout

The most famous example of the tonality diamond as a practical layout for an instrument is Harry Partch's "Diamond Marimba," which uses the 11-odd-limit tonality diamond exactly. This idea was explored further with Partch's "Quadrangularis Reversum," and by Cris Forster with his 13-odd-limit "Diamond Marimba."

Play with Partch’s Diamond Marimba here.

• Cross-set scale
• Diamond Function
• Lattice