The septimal diatonic semitone, 15/14, is a [[superparticular]] ratio with a numerator which is the fifth [[@http://en.wikipedia.org/wiki/Triangular_number|triangular number]].
The septimal diatonic semitone, 15/14, is a [[superparticular|superparticular]] ratio with a numerator which is the fifth [http://en.wikipedia.org/wiki/Triangular_number triangular number].
It may be found as the interval between many [[7-limit|7-limit]] ratios, including:
It may be found as the interval between many [[7-limit]] ratios, including:
<ul><li>16/15 and 8/7</li><li>14/13 and 15/13</li><li>7/6 and 5/4</li><li>6/5 and 9/7</li><li>14/11 and 15/11</li><li>4/3 and 10/7</li><li>7/5 and 3/2</li><li>22/15 and 11/7</li><li>14/9 and 5/3</li><li>8/5 and 12/7</li><li>26/15 and 13/7</li><li>7/4 and 15/8</li></ul>
The septimal diatonic semitone, 15/14, is a <a class="wiki_link" href="/superparticular">superparticular</a> ratio with a numerator which is the fifth <a class="wiki_link_ext" href="http://en.wikipedia.org/wiki/Triangular_number" rel="nofollow" target="_blank">triangular number</a>.<br />
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It may be found as the interval between many <a class="wiki_link" href="/7-limit">7-limit</a> ratios, including:<br />
<ul><li>16/15 and 8/7</li><li>14/13 and 15/13</li><li>7/6 and 5/4</li><li>6/5 and 9/7</li><li>14/11 and 15/11</li><li>4/3 and 10/7</li><li>7/5 and 3/2</li><li>22/15 and 11/7</li><li>14/9 and 5/3</li><li>8/5 and 12/7</li><li>26/15 and 13/7</li><li>7/4 and 15/8</li></ul><br />