50edo: Difference between revisions

Line 14:

In the [[5-limit]], 50edo tempers out [[81/80]], making it a [[meantone]] system, and in that capacity has historically has drawn some notice. In [http://lit.gfax.ch/Harmonics%202nd%20Edition%20%28Robert%20Smith%29.pdf "Harmonics or the Philosophy of Musical Sounds"] (1759) by Robert Smith, a musical temperament is described where the octave is divided into 50 equal parts – 50edo, in one word. Later, W.S.B. Woolhouse noted it was fairly close to the [[Target_tunings|least squares]] tuning for 5-limit meantone. 50edo, however, is especially interesting from a higher limit point of view. While [[31edo]] extends meantone with a [[7/4]] which is nearly pure, 50 has a flat 7/4 but both [[11/8]] and [[13/8]] are nearly pure. It is the highest edo which maps [[9/8]] and [[10/9]] to the same interval in a [[consistent]] manner, with two stacked fifths falling almost precisely in the middle of the two.

50edo tempers out 126/125, 225/224 and 3136/3125 in the [[7-limit]], indicating it [[support]]s septimal meantone; 245/242, 385/384 and 540/539 in the [[11-limit]] and 105/104, 144/143 and 196/195 in the [[13-limit]], and can be used for even higher limits. Aside from meantone and its extension meanpop, it can be used to advantage for the [[Starling temperaments #Coblack temperament|coblack (15&50) temperament]], and provides the optimal patent val for 11 and 13 limit [[Meantone_family #Bimeantone|bimeantone]]. It is also the unique equal temperament tempering out both 81/80 and the [[vishnuzma]], {{monzo|23 6 -14}};, so that in 50et seven chromatic semitones are a perfect fourth. In 12et by comparison this gives a fifth, in 31et a doubly diminished fifth, and in 19et a diminished fourth.

50edo tempers out 126/125, 225/224 and 3136/3125 in the [[7-limit]], indicating it [[support]]s septimal meantone; 245/242, 385/384 and 540/539 in the [[11-limit]] and 105/104, 144/143 and 196/195 in the [[13-limit]], and can be used for even higher limits. Aside from meantone and its extension meanpop, it can be used to advantage for the [[Starling temperaments #Coblack temperament|coblack (15&50) temperament]], and provides the optimal patent val for 11 and 13-limit [[Meantone_family #Bimeantone|bimeantone]]. It is also the unique equal temperament tempering out both 81/80 and the [[vishnuzma]], {{monzo|23 6 -14}};, so that in 50et seven chromatic semitones are a perfect fourth. In 12et by comparison this gives a fifth, in 31et a doubly diminished fifth, and in 19et a diminished fourth.

=== Odd harmonics ===

Line 20:

=== Relations ===

The 50edo system is related to [[7edo]], [[12edo]], [[19edo]], [[31edo]] as the next approximation to the "Golden Tone System" ([[Das Goldene Tonsystem]]) of [[Thorvald Kornerup]] (and similarly as the next step from 31edo in [[Joseph Yasser]]'s "[http://books.google.com.au/books/about/A_theory_of_evolving_tonality.html?id=-XUsAAAAMAAJ&redir_esc=y A Theory of Evolving Tonality]").

The 50edo system is related to [[7edo]], [[12edo]], [[19edo]], [[31edo]] as the next approximation to the "[[Golden meantone|Golden Tone System]]" ([[Das Goldene Tonsystem]]) of [[Thorvald Kornerup]] (and similarly as the next step from 31edo in [[Joseph Yasser]]'s "[http://books.google.com.au/books/about/A_theory_of_evolving_tonality.html?id=-XUsAAAAMAAJ&redir_esc=y A Theory of Evolving Tonality]").

== Intervals ==

Line 470:

| [[9/8]], [[16/9]]

| 11.910

|}

~~{| class="wikitable center-all mw-collapsible mw-collapsed"~~

~~|+style=white-space:nowrap| Patent val mapping~~

|-

~~! Interval, complement~~

~~! Error (abs, [[cent|¢]])~~

|-

~~| '''[[16/13]], [[13/8]]'''~~

~~| '''0.528'''~~

|-

~~| [[15/14]], [[28/15]]~~

~~| 0.557~~

|-

~~| '''[[11/8]], [[16/11]]'''~~

~~| '''0.682'''~~

|-

~~| [[13/11]], [[22/13]]~~

~~| 1.210~~

|-

~~| [[13/10]], [[20/13]]~~

~~| 1.786~~

|-

~~| '''[[5/4]], [[8/5]]'''~~

~~| '''2.314'''~~

|-

~~| [[7/6]], [[12/7]]~~

~~| 2.871~~

|-

~~| [[11/10]], [[20/11]]~~

~~| 2.996~~

|-

~~| [[9/7]], [[14/9]]~~

~~| 3.084~~

|-

~~| [[6/5]], [[5/3]]~~

~~| 3.641~~

|-

~~| [[13/12]], [[24/13]]~~

~~| 5.427~~

|-

~~| '''[[4/3]], [[3/2]]'''~~

~~| '''5.955'''~~

|-

~~| [[7/5]], [[10/7]]~~

~~| 6.512~~

|-

~~| [[12/11]], [[11/6]]~~

~~| 6.637~~

|-

~~| [[15/13]], [[26/15]]~~

~~| 7.741~~

|-

~~| [[16/15]], [[15/8]]~~

~~| 8.269~~

|-

~~| [[14/13]], [[13/7]]~~

~~| 8.298~~

|-

~~| '''[[8/7]], [[7/4]]'''~~

~~| '''8.826'''~~

|-

~~| [[15/11]], [[22/15]]~~

~~| 8.951~~

|-

~~| [[14/11]], [[11/7]]~~

~~| 9.508~~

|-

~~| [[10/9]], [[9/5]]~~

~~| 9.596~~

|-

~~| [[18/13]], [[13/9]]~~

~~| 11.382~~

|-

~~| [[9/8]], [[16/9]]~~

~~| 11.910~~

|-

~~| ''[[11/9]], [[18/11]]''~~

~~| ''12.592''~~

|}

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[[Category:50edo]]

[[Category:Equal divisions of the octave]]

[[Category:Golden]]

[[Category:Golden meantone]]

[[Category:Meantone]]

[[Category:Meanpop]]

[[Category:Theory]]

@@ Line 14: / Line 14: @@
 In the [[5-limit]], 50edo tempers out [[81/80]], making it a [[meantone]] system, and in that capacity has historically has drawn some notice. In [http://lit.gfax.ch/Harmonics%202nd%20Edition%20%28Robert%20Smith%29.pdf "Harmonics or the Philosophy of Musical Sounds"] (1759) by Robert Smith, a musical temperament is described where the octave is divided into 50 equal parts &ndash; 50edo, in one word. Later, W.S.B. Woolhouse noted it was fairly close to the [[Target_tunings|least squares]] tuning for 5-limit meantone. 50edo, however, is especially interesting from a higher limit point of view. While [[31edo]] extends meantone with a [[7/4]] which is nearly pure, 50 has a flat 7/4 but both [[11/8]] and [[13/8]] are nearly pure. It is the highest edo which maps [[9/8]] and [[10/9]] to the same interval in a [[consistent]] manner, with two stacked fifths falling almost precisely in the middle of the two.
-edo tempers out 126/125, 225/224 and 3136/3125 in the [[7-limit]], indicating it [[support]]s septimal meantone; 245/242, 385/384 and 540/539 in the [[11-limit]] and 105/104, 144/143 and 196/195 in the [[13-limit]], and can be used for even higher limits. Aside from meantone and its extension meanpop, it can be used to advantage for the [[Starling temperaments #Coblack temperament|coblack (15&amp;50) temperament]], and provides the optimal patent val for 11 and 13 limit [[Meantone_family #Bimeantone|bimeantone]]. It is also the unique equal temperament tempering out both 81/80 and the [[vishnuzma]], {{monzo|23 6 -14}};, so that in 50et seven chromatic semitones are a perfect fourth. In 12et by comparison this gives a fifth, in 31et a doubly diminished fifth, and in 19et a diminished fourth.
+edo tempers out 126/125, 225/224 and 3136/3125 in the [[7-limit]], indicating it [[support]]s septimal meantone; 245/242, 385/384 and 540/539 in the [[11-limit]] and 105/104, 144/143 and 196/195 in the [[13-limit]], and can be used for even higher limits. Aside from meantone and its extension meanpop, it can be used to advantage for the [[Starling temperaments #Coblack temperament|coblack (15&amp;50) temperament]], and provides the optimal patent val for 11 and 13-limit [[Meantone_family #Bimeantone|bimeantone]]. It is also the unique equal temperament tempering out both 81/80 and the [[vishnuzma]], {{monzo|23 6 -14}};, so that in 50et seven chromatic semitones are a perfect fourth. In 12et by comparison this gives a fifth, in 31et a doubly diminished fifth, and in 19et a diminished fourth.
 === Odd harmonics ===
@@ Line 20: / Line 20: @@
 === Relations ===
-The 50edo system is related to [[7edo]], [[12edo]], [[19edo]], [[31edo]] as the next approximation to the "Golden Tone System" ([[Das Goldene Tonsystem]]) of [[Thorvald Kornerup]] (and similarly as the next step from 31edo in [[Joseph Yasser]]'s "[http://books.google.com.au/books/about/A_theory_of_evolving_tonality.html?id=-XUsAAAAMAAJ&redir_esc=y A Theory of Evolving Tonality]").
+The 50edo system is related to [[7edo]], [[12edo]], [[19edo]], [[31edo]] as the next approximation to the "[[Golden meantone|Golden Tone System]]" ([[Das Goldene Tonsystem]]) of [[Thorvald Kornerup]] (and similarly as the next step from 31edo in [[Joseph Yasser]]'s "[http://books.google.com.au/books/about/A_theory_of_evolving_tonality.html?id=-XUsAAAAMAAJ&redir_esc=y A Theory of Evolving Tonality]").
 == Intervals ==
@@ Line 470: / Line 470: @@
 | [[9/8]], [[16/9]]
 | 11.910
-|}
-{| class="wikitable center-all mw-collapsible mw-collapsed"
-|+style=white-space:nowrap| Patent val mapping
-|-
-! Interval, complement
-! Error (abs, [[cent|¢]])
-|-
-| '''[[16/13]], [[13/8]]'''
-| '''0.528'''
-|-
-| [[15/14]], [[28/15]]
-| 0.557
-|-
-| '''[[11/8]], [[16/11]]'''
-| '''0.682'''
-|-
-| [[13/11]], [[22/13]]
-| 1.210
-|-
-| [[13/10]], [[20/13]]
-| 1.786
-|-
-| '''[[5/4]], [[8/5]]'''
-| '''2.314'''
-|-
-| [[7/6]], [[12/7]]
-| 2.871
-|-
-| [[11/10]], [[20/11]]
-| 2.996
-|-
-| [[9/7]], [[14/9]]
-| 3.084
-|-
-| [[6/5]], [[5/3]]
-| 3.641
-|-
-| [[13/12]], [[24/13]]
-| 5.427
-|-
-| '''[[4/3]], [[3/2]]'''
-| '''5.955'''
-|-
-| [[7/5]], [[10/7]]
-| 6.512
-|-
-| [[12/11]], [[11/6]]
-| 6.637
-|-
-| [[15/13]], [[26/15]]
-| 7.741
-|-
-| [[16/15]], [[15/8]]
-| 8.269
-|-
-| [[14/13]], [[13/7]]
-| 8.298
-|-
-| '''[[8/7]], [[7/4]]'''
-| '''8.826'''
-|-
-| [[15/11]], [[22/15]]
-| 8.951
-|-
-| [[14/11]], [[11/7]]
-| 9.508
-|-
-| [[10/9]], [[9/5]]
-| 9.596
-|-
-| [[18/13]], [[13/9]]
-| 11.382
-|-
-| [[9/8]], [[16/9]]
-| 11.910
-|-
-| ''[[11/9]], [[18/11]]''
-| ''12.592''
 |}
@@ Line 943: / Line 864: @@
 [[Category:50edo]]
 [[Category:Equal divisions of the octave]]
-[[Category:Golden]]
+[[Category:Golden meantone]]
 [[Category:Meantone]]
 [[Category:Meanpop]]
 [[Category:Theory]]