Silver third: Difference between revisions

Interval information
Expression	[math]\displaystyle{ \sigma = \frac{ 1 + \sqrt{2} }{2} }[/math]
Size in cents	325.864¢
Name	silver third
Special properties	reduced

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Revision as of 08:55, 15 October 2025

This page presents a topic of primarily mathematical interest.

While it is derived from sound mathematical principles, its applications in terms of utility for actual music may be limited, highly contrived, or as yet unknown.

The silver third is the octave-reduced second metallic mean, and is either a wide minor third or a narrow supraminor one. It differs from the first metallic mean (acoustic phi) by an interval that can act as a flattone fifth.

It can be used as a generator for many temperaments using a sharpened 6/5, such as keemic, orgone or doublewide, and is closely approximated by 3\11.

This is not to be confused with argent tuning, which uses the logarithmic silver ratio.

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-The '''silver third''' is the octave-reduced second [[Metallic_harmonic_series|metallic mean]], and is either a wide minor third or a narrow supraminor one. It differs from the first metallic mean ([[acoustic phi]]) by an interval that can act as a [[meantone]] fifth.
+The '''silver third''' is the octave-reduced second [[Metallic_harmonic_series|metallic mean]], and is either a wide minor third or a narrow supraminor one. It differs from the first metallic mean ([[acoustic phi]]) by an interval that can act as a [[flattone]] fifth.
 It can be used as a generator for many temperaments using a sharpened [[6/5]], such as [[keemic]], [[orgone]] or [[doublewide]], and is closely approximated by [[11edo|3\11]].
 This is not to be confused with [[argent tuning]], which uses the ''logarithmic'' silver ratio.

Silver third: Difference between revisions

Revision as of 08:55, 15 October 2025

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