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| In higher-limit JI, 6/5 is only one of many minor thirds. A popular one in the [[7-limit]] is [[7/6]] (about 266.9¢), the septimal subminor third, which is [[36/35]] (about 48.8¢) flat of 6/5. Another in the [[13-limit]] is [[13/11]] (about 289.2¢), which is [[66/65]] (about 26.4¢) flat of 6/5. Both of these are more complex intervals than 6/5 and have their own character to them. | | In higher-limit JI, 6/5 is only one of many minor thirds. A popular one in the [[7-limit]] is [[7/6]] (about 266.9¢), the septimal subminor third, which is [[36/35]] (about 48.8¢) flat of 6/5. Another in the [[13-limit]] is [[13/11]] (about 289.2¢), which is [[66/65]] (about 26.4¢) flat of 6/5. Both of these are more complex intervals than 6/5 and have their own character to them. |
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| == Approximation by edos == | | == Approximation == |
| 6/5 is very accurately approximated by [[19edo]] (5\19), and hence the [[enneadecal]] temperament. | | 6/5 is very accurately approximated by [[19edo]] (5\19), and hence the [[enneadecal]] temperament. |
| | | {{Interval_Edo_Approximation | 25/24}} |
| The following [[edo]]s (up to 200) contain good approximations<ref>error magnitude below 7, both, absolute (in ¢) and relative (in r¢)</ref> of the interval 6/5. Errors are given by magnitude, the arrows in the table show if the edo representation is sharp (↑) or flat (↓).
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| {| class="wikitable sortable right-1 center-2 right-3 right-4 center-5" | |
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| ! [[Edo]]
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| ! class="unsortable" | deg\edo
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| ! Absolute <br> error ([[Cent|¢]])
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| ! Relative <br> error ([[Relative cent|r¢]])
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| ! ↕
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| ! class="unsortable" | Equally acceptable multiples <ref>Super-edos up to 200 within the same error tolerance</ref>
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| | [[15edo|15]] || 4\15 || 4.3587 || 5.4484 || ↑ ||
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| |-
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| | [[19edo|19]] || 5\19 || 0.1482 || 0.2346 || ↑ ||
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| [[38edo|10\38]], [[57edo|15\57]], [[76edo|20\76]], [[95edo|25\95]], [[114edo|30\114]], [[133edo|35\133]], [[152edo|40\152]], [[171edo|45\171]], [[190edo|50\190]]
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| | [[23edo|23]] || 6\23 || 2.5978 || 4.9791 || ↓ ||
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| | [[34edo|34]] || 9\34 || 2.0058 || 5.683 || ↑ ||
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| | [[42edo|42]] || 11\42 || 1.3556 || 4.7445 || ↓ ||
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| | [[53edo|53]] || 14\53 || 1.3398 || 5.9176 || ↑ ||
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| | [[61edo|61]] || 16\61 || 0.8872 || 4.5099 || ↓ ||
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| |-
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| | [[72edo|72]] || 19\72 || 1.0254 || 6.1523 || ↑ ||
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| | [[80edo|80]] || 21\80 || 0.6413 || 4.2752 || ↓ ||
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| | [[91edo|91]] || 24\91 || 0.8422 || 6.3869 || ↑ ||
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| | [[99edo|99]] || 26\99 || 0.4898 || 4.0406 || ↓ ||
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| | [[110edo|110]] || 29\110 || 0.7223 || 6.6215 || ↑ ||
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| | [[118edo|118]] || 31\118 || 0.387 || 3.806 || ↓ ||
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| | [[129edo|129]] || 34\129 || 0.6378 || 6.8562 || ↑ ||
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| | [[137edo|137]] || 36\137 || 0.3128 || 3.5714 || ↓ ||
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| | [[156edo|156]] || 41\156 || 0.2567 || 3.3367 || ↓ ||
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| | [[175edo|175]] || 46\175 || 0.2127 || 3.1021 || ↓ ||
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| | [[194edo|194]] || 51\194 || 0.1774 || 2.8675 || ↓ ||
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| |}
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| == See also == | | == See also == |