https://en.xen.wiki/index.php?action=history&feed=atom&title=3L_3s_%283%2F2-equivalent%293L 3s (3/2-equivalent) - Revision history2026-06-10T04:30:53ZRevision history for this page on the wikiMediaWiki 1.43.6https://en.xen.wiki/index.php?title=3L_3s_(3/2-equivalent)&diff=214126&oldid=prevOverthink: Created page with "{{Infobox MOS}} {{MOS intro}} The period is very close to 8/7, and can therefore be used to represent it, tempering out 1029/1024. This MOS can therefore be used as an 8/7-repeating version of slendric, with the generator being around a sixth tone. One generator above 8/7 represents 7/6, and one generator below 8/7 represents 9/8. The fundamental chord of this system can be seen as 6:7:8(:9). Another notable tuning is generated by an interval of around..."2025-10-23T00:13:19Z<p>Created page with "{{Infobox MOS}} {{MOS intro}} The period is very close to <a href="/w/8/7" title="8/7">8/7</a>, and can therefore be used to represent it, tempering out <a href="/w/1029/1024" title="1029/1024">1029/1024</a>. This MOS can therefore be used as an 8/7-repeating version of slendric, with the generator being around a sixth tone. One generator above 8/7 represents <a href="/w/7/6" title="7/6">7/6</a>, and one generator below 8/7 represents <a href="/w/9/8" title="9/8">9/8</a>. The fundamental chord of this system can be seen as 6:7:8(:9). Another notable tuning is generated by an interval of around..."</p>
<p><b>New page</b></p><div>{{Infobox MOS}}<br />
{{MOS intro}}<br />
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The period is very close to [[8/7]], and can therefore be used to represent it, tempering out [[1029/1024]]. This MOS can therefore be used as an 8/7-repeating version of slendric, with the generator being around a sixth tone. One generator above 8/7 represents [[7/6]], and one generator below 8/7 represents [[9/8]]. The fundamental chord of this system can be seen as 6:7:8(:9). <br />
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Another notable tuning is generated by an interval of around 83 cents, which makes the scale have quite a lot of consonant ratios including [[12/11]], [[8/7]], [[6/5]], [[5/4]], [[11/8]], and [[10/7]]. This is explained by it being a subset of fifth-based miracle, with a 1/6-fifth period and a generator of around 34 cents, which the chroma of regular (octave-repeating) miracle. <br />
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== Scale properties ==<br />
{{TAMNAMS use}}<br />
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=== Intervals ===<br />
{{MOS intervals}}<br />
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=== Generator chain ===<br />
{{MOS genchain}}<br />
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=== Modes ===<br />
{{MOS mode degrees}}<br />
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== Scale tree ==<br />
{{MOS tuning spectrum<br />
| 9/5 = Subset of fifth-repeating miracle (see [[6L 6s (3/2-equivalent)]])<br />
| 6/1 = Fifth-repeating slendric<br />
}}</div>Overthink