Highschool scales

When [[Gene Ward Smith]] was in high school he made his first venture into the world of scale creation, devising a system of just intonation scales which were therefore given the name //highschool scales//. They were based on the observation that superparticular ratios whose numerators were square or triangular numbers make for good intervals for constructing scales, and that these two were related. If S[n] is n^2/(n^2-1), the superparticular ratio with square numerator n^2, and T[n] is the superparticular ratio with triagular numerator n(n+1)/2, then we have the following relationships:

T[n] = S[n] * S[n+1]
S[n] = T[2n-1] * T[2n] 

Using these, we can break apart every scale step with a square numerator into two with trangular numerators, and every step with a triangular numerator into two with square numerators.

Now starting with the famous Ptolemy-Zarlino JI diatonic:

9/8, 5/4, 4/3, 3/2, 5/3, 15/8, 2

with intervals 9/8 10/9 16/15 9/8 10/9 9/8 16/15, we may split both the 9/8 and 10/9 in half by

9/8 = 15/14 * 21/20 (square denominator to two triangular)

10/9 = 16/15 * 25/24 (triangular denominator to two square)

and used them to expand the scale. The choices involving 10/9 are virtally automatic: between 9/8 and 5/4 we choose between 6/5 and 75/64, so we choose 6/5; between 3/2 and 5/3 we choose between 8/5 and 25/16, and so select 8/5. This gives us a natural nine-note extension which is more or less self-recommending, and which showed up in the survey of 9-note, 5-limit Fokker blocks as "mavlim7", one of the 27/25&135/128 blocks.

Splitting 9/8 and introducing the 7-limit is where it gets more interesting. Between 5/3 and 15/8 we have a choice between 7/4 and 25/14, and so of course we choose 7/4. There seems to be no clear reason to choose either 15/14 or 21/20 between 1 and 9/8, and so we may try both. Then between 4/3 and 3/2, we must decide between 7/5 and 10/7. But clearly 7/5 goes with 21/20, and 10/7 with 15/14, and we are done, having constructed the two 12-note "Highschool" scales.

=Scales=
[[9highschool]]
[[10highschool1]]
[[10highschool2]]
[[12highschool1]]
[[12highschool2]]
[[12highschool3]]
[[12highschool4]]
[[15highschool1]]
[[15highschool2]]
[[19highschool1]]
[[19highschool2]]

<html><head><title>Highschool scales</title></head><body>When <a class="wiki_link" href="/Gene%20Ward%20Smith">Gene Ward Smith</a> was in high school he made his first venture into the world of scale creation, devising a system of just intonation scales which were therefore given the name <em>highschool scales</em>. They were based on the observation that superparticular ratios whose numerators were square or triangular numbers make for good intervals for constructing scales, and that these two were related. If S[n] is n^2/(n^2-1), the superparticular ratio with square numerator n^2, and T[n] is the superparticular ratio with triagular numerator n(n+1)/2, then we have the following relationships:<br />
<br />
T[n] = S[n] * S[n+1]<br />
S[n] = T[2n-1] * T[2n] <br />
<br />
Using these, we can break apart every scale step with a square numerator into two with trangular numerators, and every step with a triangular numerator into two with square numerators.<br />
<br />
Now starting with the famous Ptolemy-Zarlino JI diatonic:<br />
<br />
9/8, 5/4, 4/3, 3/2, 5/3, 15/8, 2<br />
<br />
with intervals 9/8 10/9 16/15 9/8 10/9 9/8 16/15, we may split both the 9/8 and 10/9 in half by<br />
<br />
9/8 = 15/14 * 21/20 (square denominator to two triangular)<br />
<br />
10/9 = 16/15 * 25/24 (triangular denominator to two square)<br />
<br />
and used them to expand the scale. The choices involving 10/9 are virtally automatic: between 9/8 and 5/4 we choose between 6/5 and 75/64, so we choose 6/5; between 3/2 and 5/3 we choose between 8/5 and 25/16, and so select 8/5. This gives us a natural nine-note extension which is more or less self-recommending, and which showed up in the survey of 9-note, 5-limit Fokker blocks as &quot;mavlim7&quot;, one of the 27/25&amp;135/128 blocks.<br />
<br />
Splitting 9/8 and introducing the 7-limit is where it gets more interesting. Between 5/3 and 15/8 we have a choice between 7/4 and 25/14, and so of course we choose 7/4. There seems to be no clear reason to choose either 15/14 or 21/20 between 1 and 9/8, and so we may try both. Then between 4/3 and 3/2, we must decide between 7/5 and 10/7. But clearly 7/5 goes with 21/20, and 10/7 with 15/14, and we are done, having constructed the two 12-note &quot;Highschool&quot; scales.<br />
<br />
<!-- ws:start:WikiTextHeadingRule:0:&lt;h1&gt; --><h1 id="toc0"><a name="Scales"></a><!-- ws:end:WikiTextHeadingRule:0 -->Scales</h1>
<a class="wiki_link" href="/9highschool">9highschool</a><br />
<a class="wiki_link" href="/10highschool1">10highschool1</a><br />
<a class="wiki_link" href="/10highschool2">10highschool2</a><br />
<a class="wiki_link" href="/12highschool1">12highschool1</a><br />
<a class="wiki_link" href="/12highschool2">12highschool2</a><br />
<a class="wiki_link" href="/12highschool3">12highschool3</a><br />
<a class="wiki_link" href="/12highschool4">12highschool4</a><br />
<a class="wiki_link" href="/15highschool1">15highschool1</a><br />
<a class="wiki_link" href="/15highschool2">15highschool2</a><br />
<a class="wiki_link" href="/19highschool1">19highschool1</a><br />
<a class="wiki_link" href="/19highschool2">19highschool2</a></body></html>