128/99: Difference between revisions

Line 3:

| Monzo = 7 -2 0 0 -1

| Cents = 444.77205

| Name = undecimal subfourth, minor fourth, Alpharabian paraminor fourth, just paraminor fourth

| Name = undecimal subfourth, undecimal minor fourth, Alpharabian paraminor fourth, just paraminor fourth

| Color name =

| FJS name =

Line 9:

}}

In [[11-limit]] [[just intonation]], '''128/99''' is an '''undecimal subfourth''' measuring about 444.8¢. It is the inversion of [[99/64]], the undecimal superfifth. This interval is also known as the '''minor fourth''' through analogy with [[11/8]] being the "major fourth" as named by [[Ivan Wyschnegradsky]], and can additionally be somewhat similarly dubbed the '''Alpharabian paraminor fourth''' or even the '''just paraminor fourth'''. It is distinguished from the simpler [[22/17]] by the [[1089/1088|twosquare comma]].

In [[11-limit]] [[just intonation]], '''128/99''' is an '''undecimal subfourth''' measuring about 444.8¢. It is the inversion of [[99/64]], the undecimal superfifth. This interval is also known as the '''undecimal minor fourth''' through analogy with [[11/8]] being the "major fourth" as named by [[Ivan Wyschnegradsky]], and can additionally be somewhat similarly dubbed the '''Alpharabian paraminor fourth''' or even the '''just paraminor fourth'''. It is distinguished from the simpler [[22/17]] by the [[1089/1088|twosquare comma]].

== Approximation ==

@@ Line 3: / Line 3: @@
 | Monzo = 7 -2 0 0 -1
 | Cents = 444.77205
-| Name = undecimal subfourth, <br>minor fourth, <br>Alpharabian paraminor fourth, <br>just paraminor fourth
+| Name = undecimal subfourth, <br>undecimal minor fourth, <br>Alpharabian paraminor fourth, <br>just paraminor fourth
 | Color name =
 | FJS name =
@@ Line 9: / Line 9: @@
 }}
-In [[11-limit]] [[just intonation]], '''128/99''' is an '''undecimal subfourth''' measuring about 444.8¢. It is the inversion of [[99/64]], the undecimal superfifth.  This interval is also known as the '''minor fourth''' through analogy with [[11/8]] being the "major fourth" as named by [[Ivan Wyschnegradsky]], and can additionally be somewhat similarly dubbed the '''Alpharabian paraminor fourth''' or even the '''just paraminor fourth'''.  It is distinguished from the simpler [[22/17]] by the [[1089/1088|twosquare comma]].
+In [[11-limit]] [[just intonation]], '''128/99''' is an '''undecimal subfourth''' measuring about 444.8¢. It is the inversion of [[99/64]], the undecimal superfifth.  This interval is also known as the '''undecimal minor fourth''' through analogy with [[11/8]] being the "major fourth" as named by [[Ivan Wyschnegradsky]], and can additionally be somewhat similarly dubbed the '''Alpharabian paraminor fourth''' or even the '''just paraminor fourth'''.  It is distinguished from the simpler [[22/17]] by the [[1089/1088|twosquare comma]].
 == Approximation ==