Template:ED intro/doc: Difference between revisions
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This template creates an introduction for an | This template creates an introduction for an equal division page, namely: | ||
* Equal divisions of the octave or second harmonic (edo). | * Equal divisions of the octave or second harmonic (edo). | ||
* Equal divisions of the tritave, perfect | * Equal divisions of the tritave, perfect twelfth, or third harmonic (edt). | ||
* Equal divisions of the fifth (edf). | * Equal divisions of the fifth (edf). | ||
* Equal divisions of an arbitrary harmonic. | * Equal divisions of an arbitrary harmonic. | ||
* Equal divisions of an arbitrary ratio. | * Equal divisions of an arbitrary ratio. | ||
* Equal divisions of an arbitrary cent value. | * Equal divisions of an arbitrary cent value. | ||
=== Usage === | === Usage === | ||
Supported formats are as shown: | Supported formats are as shown: | ||
* ''k''edo – equal divisions of the octave, sometimes denoted as ''k''ed2 | * <code>''k''edo</code> – equal divisions of the octave, sometimes denoted as <code>''k''ed2</code> | ||
* ''k''edt – equal divisions of the tritave/twelfth, sometimes denoted as ''k''ed3 | * <code>''k''edt</code> – equal divisions of the tritave/twelfth, sometimes denoted as <code>''k''ed3</code> | ||
* ''k''edf – equal divisions of the fifth, sometimes denoted as ''k''ed3/2 | * <code>''k''edf</code> – equal divisions of the fifth, sometimes denoted as <code>''k''ed3/2</code> | ||
* ''k''ed''p''/''q'' – equal divisions of an arbitrary ratio ''p''/''q'', or if written as ''k''ed''p'', equal divisions of a harmonic | * <code>''k''ed''p''/''q''</code> – equal divisions of an arbitrary ratio ''p''/''q'', or if written as <code>''k''ed''p''</code>, equal divisions of a harmonic | ||
* ''k''ed''c''c – equal divisions of an arbitrary cent value ''c'' | * <code>''k''ed''c''c</code> – equal divisions of an arbitrary cent value ''c'' | ||
* ''k'' – if no suffix is included, then it will be treated as an edo. | * <code>''k''</code> – if no suffix is included, then it will be treated as an edo. | ||
For | For equal division pages whose page title follows the above formats, add the following line without any parameters. | ||
<pre>{{ED intro}}</pre> | <pre>{{ED intro}}</pre> | ||
For | For equal division pages whose page title does not follow the aforementioned formats, include the intended equal division as an unnamed parameter. | ||
<pre>{{ED intro|6ed600c}}</pre> | <pre>{{ED intro|6ed600c}}</pre> | ||
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<pre>{{ED intro|1ed600.1c}}</pre> | <pre>{{ED intro|1ed600.1c}}</pre> | ||
{{{{ROOTPAGENAME}}|1ed600.1c}} | {{{{ROOTPAGENAME}}|1ed600.1c}} | ||
Latest revision as of 21:38, 25 May 2025
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This template should not be substituted. |
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This template uses Lua: |
This template creates an introduction for an equal division page, namely:
- Equal divisions of the octave or second harmonic (edo).
- Equal divisions of the tritave, perfect twelfth, or third harmonic (edt).
- Equal divisions of the fifth (edf).
- Equal divisions of an arbitrary harmonic.
- Equal divisions of an arbitrary ratio.
- Equal divisions of an arbitrary cent value.
Usage
Supported formats are as shown:
kedo
– equal divisions of the octave, sometimes denoted asked2
kedt
– equal divisions of the tritave/twelfth, sometimes denoted asked3
kedf
– equal divisions of the fifth, sometimes denoted asked3/2
kedp/q
– equal divisions of an arbitrary ratio p/q, or if written askedp
, equal divisions of a harmonickedcc
– equal divisions of an arbitrary cent value ck
– if no suffix is included, then it will be treated as an edo.
For equal division pages whose page title follows the above formats, add the following line without any parameters.
{{ED intro}}
For equal division pages whose page title does not follow the aforementioned formats, include the intended equal division as an unnamed parameter.
{{ED intro|6ed600c}}
Examples
{{ED intro|12}}
{{ED intro|12edo}}
12 equal divisions of the octave (abbreviated 12edo or 12ed2), also called 12-tone equal temperament (12tet) or 12 equal temperament (12et) when viewed under a regular temperament perspective, is the tuning system that divides the octave into 12 equal parts of exactly 100 ¢ each. Each step represents a frequency ratio of 21/12, or the 12th root of 2.
{{ED intro|13edt}}
13 equal divisions of the tritave, perfect twelfth, or 3rd harmonic (abbreviated 13edt or 13ed3), is a nonoctave tuning system that divides the interval of 3/1 into 13 equal parts of about 146 ¢ each. Each step represents a frequency ratio of 31/13, or the 13th root of 3.
{{ED intro|7edf}}
7 equal divisions of the perfect fifth (abbreviated 7edf or 7ed3/2) is a nonoctave tuning system that divides the interval of 3/2 into 7 equal parts of about 100 ¢ each. Each step represents a frequency ratio of (3/2)1/7, or the 7th root of 3/2.
{{ED intro|12ed5}}
12 equal divisions of the 5th harmonic (abbreviated 12ed5) is a nonoctave tuning system that divides the interval of 5/1 into 12 equal parts of about 232 ¢ each. Each step represents a frequency ratio of 51/12, or the 12th root of 5.
{{ED intro|12ed5/2}}
12 equal divisions of 5/2 (abbreviated 12ed5/2) is a nonoctave tuning system that divides the interval of 5/2 into 12 equal parts of about 132 ¢ each. Each step represents a frequency ratio of (5/2)1/12, or the 12th root of 5/2.
{{ED intro|12ed600c}}
12 equal divisions of 600 ¢ (abbreviated 12ed600 ¢) is a nonoctave tuning system that divides the interval of 600 ¢ into 12 equal parts of exactly 50 ¢ each.
{{ED intro|12ed600.1c}}
12 equal divisions of 600.1 ¢ (abbreviated 12ed600.1 ¢) is a nonoctave tuning system that divides the interval of 600.1 ¢ into 12 equal parts of about 50 ¢ each.
Equal-step tunings (1 equal division)
{{ED intro|1edo}}
1 equal division of the octave (abbreviated 1edo or 1ed2), also called 1-tone equal temperament (1tet) or 1 equal temperament (1et) when viewed under a regular temperament perspective, is the tuning system that uses equal steps of 2/1 (one octave), or exactly 1200 ¢.
{{ED intro|1edt}}
1 equal division of the tritave, perfect twelfth, or 3rd harmonic (abbreviated 1edt or 1ed3), is a nonoctave tuning system that uses equal steps of 3/1 (one tritave), or about 1900 ¢.
{{ED intro|1edf}}
1 equal division of the perfect fifth (abbreviated 1edf or 1ed3/2) is a nonoctave tuning system that uses equal steps of 3/2 (one perfect fifth), or about 702 ¢.
{{ED intro|1ed5}}
1 equal division of the 5th harmonic (abbreviated 1ed5) is a nonoctave tuning system that uses equal steps of 5/1, or about 2790 ¢.
{{ED intro|1ed5/2}}
1 equal division of 5/2 (abbreviated 1ed5/2) is a nonoctave tuning system that uses equal steps of 5/2, or about 1590 ¢.
{{ED intro|1ed600c}}
1 equal division of 600 ¢ (abbreviated 1ed600 ¢) is a nonoctave tuning system that uses equal steps of 600 ¢.
{{ED intro|1ed600.1c}}
1 equal division of 600.1 ¢ (abbreviated 1ed600.1 ¢) is a nonoctave tuning system that uses equal steps of 600.1 ¢.