3125edo

The 3125 equal division of the octave divides it into 5^5 = 3125 equal parts of exactly 0.384 cents each. It is notable for being an extremely strong 7-limit system, being the first equal division past 171edo with a lower [[Tenney-Euclidean temperament measures#TE simple badness|relative error]]. It is also distinctly consistent through the 15 odd limit. A basis for its 7-limit commas is 78125000/78121827, 645700815/645657712 and 281484423828125/281474976710656; for 11-limit, 151263/151250, 820125/819896, 21437500/21434787 and 117440512/117406179; and for 13-limit, 6656/6655, 123201/123200, 140625/140608, 151263/151250 and 1399680/1399489.

The fact that 3125 = 5^5 makes curious notations possible based on the symmetric base 5 positional number system, by converting the number to base 5 with digits {-2, -1, 0, 1, 2}.

<html><head><title>3125edo</title></head><body>The 3125 equal division of the octave divides it into 5^5 = 3125 equal parts of exactly 0.384 cents each. It is notable for being an extremely strong 7-limit system, being the first equal division past 171edo with a lower <a class="wiki_link" href="/Tenney-Euclidean%20temperament%20measures#TE simple badness">relative error</a>. It is also distinctly consistent through the 15 odd limit. A basis for its 7-limit commas is 78125000/78121827, 645700815/645657712 and 281484423828125/281474976710656; for 11-limit, 151263/151250, 820125/819896, 21437500/21434787 and 117440512/117406179; and for 13-limit, 6656/6655, 123201/123200, 140625/140608, 151263/151250 and 1399680/1399489.<br />
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The fact that 3125 = 5^5 makes curious notations possible based on the symmetric base 5 positional number system, by converting the number to base 5 with digits {-2, -1, 0, 1, 2}.</body></html>