User:Eufalesio/Important Tables: Difference between revisions
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== Table of prime-generated MOS scales == | == Table of prime-generated MOS scales == | ||
<span data-darkreader-inline-color="">Bolded has an equalized tuning with a telic convergent. Ending sequence at the biggest telic convergent below a thousand. The reason for doing this is that MOSes with record low softness have equalized tunings with convergent primes. MOSes with a hyperlink represent equalized tunings I deem | <span data-darkreader-inline-color="">Bolded has an equalized tuning with a telic convergent. Ending sequence at the biggest telic convergent below a thousand. The reason for doing this is that MOSes with record low softness have equalized tunings with convergent primes. MOSes with a hyperlink represent equalized tunings I deem good. '''I''' wouldn't use most of them, but they are good. If the hyperlink is in italics it means that it is a multiple that whose prime is convergent, but no longer telic.</span> | ||
Also note how p3 has the the shortest length out of all the primes. Shoutout to p11, it manages to build some good scales up until 37edo, on which it basically hits a dead end. Luckily its triple, 111edo, is | Also note how p3 has the the shortest length out of all the primes. Shoutout to p11, it manages to build some good scales up until 37edo, on which it basically hits a dead end. Luckily its triple, 111edo, is very solid. Also 10edo, which basically reaches near-perfection on p13 and 15/14, for which 270edo is one of the best detempers. | ||
{| class="wikitable mw-collapsible mw-collapsed" data-darkreader-inline-color="" style="text-align: center;" | {| class="wikitable mw-collapsible mw-collapsed" data-darkreader-inline-color="" style="text-align: center;" | ||
!'''Generation \ Prime''' | !'''Generation \ Prime''' | ||
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!'''23''' | !'''23''' | ||
|- | |- | ||
| | |Eve | ||
| colspan="7" |<small>1L 1s</small> | | colspan="7" |<small>1L 1s</small> | ||
| colspan="3" |'''<small>1L 1s</small>''' | | colspan="3" |'''<small>1L 1s</small>''' | ||
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|1st filial scale | |1st filial scale | ||
| colspan="5" |<small>1L 2s</small> | | colspan="5" |<small>1L 2s</small> | ||
| colspan="2" |<small>''' | | colspan="2" |<small>'''1L 2s'''</small> | ||
| colspan="3" |<small>2L 1s</small> | | colspan="3" |<small>2L 1s</small> | ||
|- | |- | ||
|2nd filial scale | |2nd filial scale | ||
| colspan="4" |<small>1L 3s</small> | | colspan="4" |<small>1L 3s</small> | ||
|'''<small> | |'''<small>1L 3s</small>''' | ||
| colspan="2" |<small>3L 1s</small> | | colspan="2" |<small>3L 1s</small> | ||
|'''<small>[[5edo|2L 3s]]</small>''' | |'''<small>[[5edo|2L 3s]]</small>''' | ||
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|<small>5L 1s</small> | |<small>5L 1s</small> | ||
|<small>4L 5s</small> | |<small>4L 5s</small> | ||
|'''<small>[[ | |'''<small>[[270edo|''7L 3s'']]</small>''' | ||
|<small>[[10edo|3L 7s]]</small> | |<small>[[10edo|3L 7s]]</small> | ||
|'''<small>[[12edo|5L 7s]]</small>''' | |'''<small>[[12edo|5L 7s]]</small>''' | ||
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|<small>3L 13s</small> | |<small>3L 13s</small> | ||
|<small>12L 17s</small> | |<small>12L 17s</small> | ||
|'''<small>11L 2s</small>''' | |'''<small>[[130edo|''11L 2s'']]</small>''' | ||
|<small>2L 11s</small> | |<small>2L 11s</small> | ||
|- | |- | ||
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|<small>[[41edo|4L 37s]]</small> | |<small>[[41edo|4L 37s]]</small> | ||
|<small>10L 77s</small> | |<small>10L 77s</small> | ||
|'''<small>28L 31s</small>''' | |'''<small>[[118edo|''28L 31s'']]</small>''' | ||
|<small>53L 200s</small> | |<small>53L 200s</small> | ||
|<small>37L 135s</small> | |<small>37L 135s</small> | ||