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| <h2>IMPORTED REVISION FROM WIKISPACES</h2>
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| This is an imported revision from Wikispaces. The revision metadata is included below for reference:<br>
| | The '''Tenney norm''', otherwise known as '''harmonic distance''' ('''HD''') or '''Tenney height''', is commonly used as a measure of [[complexity]] for [[just interval]]s. If ''n''/''d'' is a positive rational number reduced to its lowest terms, then the [[Benedetti height]] is the integer ''nd''. Often it is more convenient instead to take the logarithm, usually base 2 ([[log2]]), of the Benedetti height, leading to the Tenney norm. |
| : This revision was by author [[User:clumma|clumma]] and made on <tt>2015-02-06 23:20:42 UTC</tt>.<br>
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| : The original revision id was <tt>540068698</tt>.<br>
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| : The revision comment was: <tt></tt><br>
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| The revision contents are below, presented both in the original Wikispaces Wikitext format, and in HTML exactly as Wikispaces rendered it.<br>
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| <h4>Original Wikitext content:</h4>
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| <div style="width:100%; max-height:400pt; overflow:auto; background-color:#f8f9fa; border: 1px solid #eaecf0; padding:0em"><pre style="margin:0px;border:none;background:none;word-wrap:break-word;white-space: pre-wrap ! important" class="old-revision-html">If p/q is a positive rational number reduced to its lowest terms, then the [[Benedetti height]] is the integer pq. Often it is more convenient instead to take the logarithm, usually base 2 ([[log2]]), of the [[Benedetti height]], leading to Tenney [[height]]. In either form it is widely used as a [[measure of inharmonicity]] and/or complexity for intervals.
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| The //Tenney height// of a [[monzo]] is given by | | == Computation == |
| [[code]]
| | === Ratio form === |
| || |e2 e3 ... ep> || = |e2| + log2(3)|e3| + ... + log2(p)|ep| = log2(2^|e2| * 3^|e3| * ... * p^|ep|)
| | The Tenney norm of a ratio ''n''/''d'' is given by |
| [[code]]
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| ==Examples==
| | $$\log_2 (nd) $$ |
| ||~ Interval names ||~ Frequency ratio ||~ [[monzo|ket vector]] ||~ log2 (Benedetti height) ||
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| || prime || 1/1 || |0> || 0 ||
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| || octave || 2/1 || |1> || 1 ||
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| || just perfect fifth || 3/2 || |-1 1> || log2(6) = 2.585 ||
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| || just major third || 5/4 || |-2 0 1> || log2(20) = 4.322 ||
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| || harmonic seventh || 7/4 || |-2 0 0 1> || log2(28) = 4.807 ||
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| </pre></div>
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| <h4>Original HTML content:</h4>
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| <div style="width:100%; max-height:400pt; overflow:auto; background-color:#f8f9fa; border: 1px solid #eaecf0; padding:0em"><pre style="margin:0px;border:none;background:none;word-wrap:break-word;width:200%;white-space: pre-wrap ! important" class="old-revision-html"><html><head><title>Tenney Height</title></head><body>If p/q is a positive rational number reduced to its lowest terms, then the <a class="wiki_link" href="/Benedetti%20height">Benedetti height</a> is the integer pq. Often it is more convenient instead to take the logarithm, usually base 2 (<a class="wiki_link" href="/log2">log2</a>), of the <a class="wiki_link" href="/Benedetti%20height">Benedetti height</a>, leading to Tenney <a class="wiki_link" href="/height">height</a>. In either form it is widely used as a <a class="wiki_link" href="/measure%20of%20inharmonicity">measure of inharmonicity</a> and/or complexity for intervals.<br />
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| <br />
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| The <em>Tenney height</em> of a <a class="wiki_link" href="/monzo">monzo</a> is given by<br />
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| &lt;pre class=&quot;text&quot;&gt;|| |e2 e3 ... ep&amp;gt; || = |e2| + log2(3)|e3| + ... + log2(p)|ep| = log2(2^|e2| * 3^|e3| * ... * p^|ep|)&lt;/pre&gt;
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| * GeSHi (C) 2004 - 2007 Nigel McNie, 2007 - 2008 Benny Baumann
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| * (http://qbnz.com/highlighter/ and http://geshi.org/)
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| */
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| | === Vector form === |
| </style><pre class="text">|| |e2 e3 ... ep&gt; || = |e2| + log2(3)|e3| + ... + log2(p)|ep| = log2(2^|e2| * 3^|e3| * ... * p^|ep|)</pre>
| | The Tenney norm of a [[harmonic limit|''p''-limit]] [[monzo]] {{nowrap|'''m''' {{=}} {{monzo| ''m''<sub>1</sub> ''m''<sub>2</sub> … ''m''<sub>π (''p'')</sub> }}}} (π being the {{w|prime-counting function}}) is given by |
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| <!-- ws:end:WikiTextCodeRule:0 --><br />
| | $$ |
| <!-- ws:start:WikiTextHeadingRule:1:&lt;h2&gt; --><h2 id="toc0"><a name="x-Examples"></a><!-- ws:end:WikiTextHeadingRule:1 -->Examples</h2> | | \begin{align} |
| | \norm{H \vec m}_1 &= \abs{m_1} + \abs{m_2} \log_2 (3) + \ldots + \abs{m_{\pi (p)}} \log_2 (p) \\ |
| | &= \log_2\left(2^{\abs{m_1}} \cdot 3^{\abs{m_2}} \cdot \ldots \cdot p^{\abs{m_{\pi (p)}}}\right) |
| | \end{align} |
| | $$ |
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| | where ''H'' is the transformation matrix such that, for the prime basis {{nowrap| ''Q'' {{=}} {{val| 2 3 5 … ''p'' }} }}, |
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| <table class="wiki_table">
| | $$ H = \operatorname {diag} (\log_2 (Q)) $$ |
| <tr>
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| <th>Interval names<br />
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| </th>
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| <th>Frequency ratio<br />
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| </th>
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| <th><a class="wiki_link" href="/monzo">ket vector</a><br />
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| </th>
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| <th>log2 (Benedetti height)<br />
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| </th>
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| </tr>
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| <tr>
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| <td>prime<br />
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| </td>
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| <td>1/1<br />
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| </td>
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| <td>|0&gt;<br />
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| </td>
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| <td>0<br />
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| </td>
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| </tr>
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| <tr>
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| <td>octave<br />
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| </td>
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| <td>2/1<br />
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| </td>
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| <td>|1&gt;<br />
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| </td>
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| <td>1<br />
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| </td>
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| </tr>
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| <tr>
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| <td>just perfect fifth<br />
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| </td>
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| <td>3/2<br />
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| </td>
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| <td>|-1 1&gt;<br />
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| </td>
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| <td>log2(6) = 2.585<br />
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| </td>
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| </tr>
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| <tr>
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| <td>just major third<br />
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| </td>
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| <td>5/4<br />
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| </td>
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| <td>|-2 0 1&gt;<br />
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| </td>
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| <td>log2(20) = 4.322<br />
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| </td>
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| </tr>
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| <tr>
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| <td>harmonic seventh<br />
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| </td>
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| <td>7/4<br />
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| </td>
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| <td>|-2 0 0 1&gt;<br />
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| </td>
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| <td>log2(28) = 4.807<br />
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| </td>
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| </tr>
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| </table>
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| </body></html></pre></div> | | == Examples == |
| | {| class="wikitable center-2" |
| | |- |
| | ! Interval name |
| | ! Ratio (''n''/''d'') |
| | ! Monzo |
| | ! Tenney norm |
| | |- |
| | | Unison |
| | | [[1/1]] |
| | | {{Monzo| 0 }} |
| | | 0 |
| | |- |
| | | Octave |
| | | [[2/1]] |
| | | {{Monzo| 1 }} |
| | | 1 |
| | |- |
| | | Just perfect fifth |
| | | [[3/2]] |
| | | {{Monzo| -1 1 }} |
| | | 2.585 |
| | |- |
| | | Just major third |
| | | [[5/4]] |
| | | {{Monzo| -2 0 1 }} |
| | | 4.322 |
| | |- |
| | | Harmonic seventh |
| | | [[7/4]] |
| | | {{Monzo| -2 0 0 1 }} |
| | | 4.807 |
| | |} |
| | |
| | == History and terminology == |
| | In general mathematics, this measurement is known as ''log-product complexity''. With respect to microtonal tuning, this measurement was first described by [[James Tenney]], who himself called it ''harmonic distance''.<ref>[https://www.plainsound.org/pdfs/JC&ToH.pdf ''John Cage and the Theory of Harmony'']. James Tenney. </ref><ref>[https://zh.booksc.eu/book/68954431/f87a1d ''On the Conception and Measure of Consonance'']. Alex Wand. </ref><ref>[https://scholar.sun.ac.za/bitstream/handle/10019.1/98644/brand_signal_2016.pdf?sequence=2&isAllowed=y ''A Signal-Based Model of Teleology in Tonal Music'']. Mark André Brand. p. 28. "Tenney's measure of ''harmonic distance'' (Hd) is thus singled out as perhaps his most 'crucial development', affording him the means towards 'compactness'. His is a Manhattan, rather than Euclidean metric, defined as {{nowrap|Hd(''a''/''b'') {{=}} ''k'' log(''ab'')}}, with ''a''/''b'' the maximally reduced ratio representing the frequency difference, and {{nowrap|''k'' {{=}} 1}} indicating measure in octaves."</ref> This terminology was also used in [[Paul Erlich]]'s paper [[A Middle Path]]<ref>Wherein Erlich writes: "This is why, in Tenney’s terminology, the taxicab distance an interval traverses in his lattice is the 'Harmonic Distance' of that interval."</ref>. |
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| | == See also == |
| | * [[Generalized Tenney norms and Tp interval space|Generalized Tenney norms and T<sub>''p''</sub> interval space]] |
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| | == References == |
| | <references /> |
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| | [[Category:Consonance and dissonance]] |
| | [[Category:Harmonic entropy]] |
| | [[Category:Interval complexity measures]] |
| | [[Category:Tenney-weighted measures]] |