Module:ED intro: Difference between revisions

Line 44:

intro_text = "'''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/about ''s''{{cent}}."

else

intro_text = "'''''k'' equal divisions of the octave''' (abbreviated '''''k''edo''' or '''''k''ed2'''), also called '''''k''-tone equal temperament''' ('''''k''tet''') or '''''k'' equal temperament''' ('''''k''et''') when viewed under a [[regular temperament]] perspective, is the [[tuning system]] that divides the [[octave]] into ''k'' [[equal]] parts of exactly/about ''s''{{c}} each. Each step represents a [[frequency ratio]] of 21/''k'', or the ''kth'' root of 2."

intro_text = "'''''k'' equal divisions of the octave''' (abbreviated '''''k''edo''' or '''''k''ed2'''), also called '''''k''-tone equal temperament''' ('''''k''tet''') or '''''k'' equal temperament''' ('''''k''et''') when viewed under a [[regular temperament]] perspective, is the [[tuning system]] that divides the [[octave]] into ''k'' [[equal]] parts of exactly/about ''s''{{cent}} each. Each step represents a [[frequency ratio]] of 21/''k'', or the ''kth'' root of 2."

end

Line 70:

local intro_text = ""

if ed == 1 then

intro_text = "'''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 exactly/about ''s''{{c}}."

intro_text = "'''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 exactly/about ''s''{{cent}}."

else

intro_text = "'''''k'' equal divisions of the tritave''', '''perfect twelfth''', or '''3rd harmonic''' (abbreviated '''''k''edt''' or '''''k''ed3'''), is a [[nonoctave]] [[tuning system]] that divides the interval of [[3/1]] into ''k'' [[equal]] parts of exactly/about ''s''{{c}} each. Each step represents a [[frequency ratio]] of 31/''k'', or the ''kth'' root of 3."

intro_text = "'''''k'' equal divisions of the tritave''', '''perfect twelfth''', or '''3rd harmonic''' (abbreviated '''''k''edt''' or '''''k''ed3'''), is a [[nonoctave]] [[tuning system]] that divides the interval of [[3/1]] into ''k'' [[equal]] parts of exactly/about ''s''{{cent}} each. Each step represents a [[frequency ratio]] of 31/''k'', or the ''kth'' root of 3."

end

Line 98:

local intro_text = ""

if ed == 1 then

intro_text = "'''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 exactly/about ''s''~~⁠ ⁠[[¢]]~~."

intro_text = "'''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 exactly/about ''s''{{cent}}."

else

intro_text = "'''''k'' equal divisions of the perfect fifth''' (abbreviated '''''k''edf''' or '''''k''ed3/2''') is a [[nonoctave]] [[tuning system]] that divides the interval of [[3/2]] into ''k'' [[equal]] parts of exactly/about ''s''~~⁠ ⁠[[¢]]~~ each. Each step represents a [[frequency ratio]] of (3/2)1/''k'', or the ''kth'' root of 3/2."

intro_text = "'''''k'' equal divisions of the perfect fifth''' (abbreviated '''''k''edf''' or '''''k''ed3/2''') is a [[nonoctave]] [[tuning system]] that divides the interval of [[3/2]] into ''k'' [[equal]] parts of exactly/about ''s''{{cent}} each. Each step represents a [[frequency ratio]] of (3/2)1/''k'', or the ''kth'' root of 3/2."

end

@@ Line 44: / Line 44: @@
 		intro_text = "'''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/about ''s''{{cent}}."
 	else
-		intro_text = "'''''k'' equal divisions of the octave''' (abbreviated '''''k''edo''' or '''''k''ed2'''), also called '''''k''-tone equal temperament''' ('''''k''tet''') or '''''k'' equal temperament''' ('''''k''et''') when viewed under a [[regular temperament]] perspective, is the [[tuning system]] that divides the [[octave]] into ''k'' [[equal]] parts of exactly/about ''s''{{c}} each. Each step represents a [[frequency ratio]] of 2<sup>1/''k''</sup>, or the ''kth'' root of 2."
+		intro_text = "'''''k'' equal divisions of the octave''' (abbreviated '''''k''edo''' or '''''k''ed2'''), also called '''''k''-tone equal temperament''' ('''''k''tet''') or '''''k'' equal temperament''' ('''''k''et''') when viewed under a [[regular temperament]] perspective, is the [[tuning system]] that divides the [[octave]] into ''k'' [[equal]] parts of exactly/about ''s''{{cent}} each. Each step represents a [[frequency ratio]] of 2<sup>1/''k''</sup>, or the ''kth'' root of 2."
 	end
@@ Line 70: / Line 70: @@
 	local intro_text = ""
 	if ed == 1 then
-		intro_text = "'''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 exactly/about ''s''{{c}}."
+		intro_text = "'''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 exactly/about ''s''{{cent}}."
 	else
-		intro_text = "'''''k'' equal divisions of the tritave''', '''perfect twelfth''', or '''3rd harmonic''' (abbreviated '''''k''edt''' or '''''k''ed3'''), is a [[nonoctave]] [[tuning system]] that divides the interval of [[3/1]] into ''k'' [[equal]] parts of exactly/about ''s''{{c}} each. Each step represents a [[frequency ratio]] of 3<sup>1/''k''</sup>, or the ''kth'' root of 3."
+		intro_text = "'''''k'' equal divisions of the tritave''', '''perfect twelfth''', or '''3rd harmonic''' (abbreviated '''''k''edt''' or '''''k''ed3'''), is a [[nonoctave]] [[tuning system]] that divides the interval of [[3/1]] into ''k'' [[equal]] parts of exactly/about ''s''{{cent}} each. Each step represents a [[frequency ratio]] of 3<sup>1/''k''</sup>, or the ''kth'' root of 3."
 	end
@@ Line 98: / Line 98: @@
 	local intro_text = ""
 	if ed == 1 then
-		intro_text = "'''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 exactly/about ''s''&#x2060;&#x200A;&#x2060;[[¢]]."
+		intro_text = "'''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 exactly/about ''s''{{cent}}."
 	else
-		intro_text = "'''''k'' equal divisions of the perfect fifth''' (abbreviated '''''k''edf''' or '''''k''ed3/2''') is a [[nonoctave]] [[tuning system]] that divides the interval of [[3/2]] into ''k'' [[equal]] parts of exactly/about ''s''&#x2060;&#x200A;&#x2060;[[¢]] each. Each step represents a [[frequency ratio]] of (3/2)<sup>1/''k''</sup>, or the ''kth'' root of 3/2."
+		intro_text = "'''''k'' equal divisions of the perfect fifth''' (abbreviated '''''k''edf''' or '''''k''ed3/2''') is a [[nonoctave]] [[tuning system]] that divides the interval of [[3/2]] into ''k'' [[equal]] parts of exactly/about ''s''{{cent}} each. Each step represents a [[frequency ratio]] of (3/2)<sup>1/''k''</sup>, or the ''kth'' root of 3/2."
 	end