Constrained tuning: Difference between revisions

@@ Line 145: / Line 145: @@
 <math>n = 1/g = \operatorname {mean} (V)</math>
-Unlike TE or TOP, the optimal edo number space in TOC is linear with respect to A. That is, if A = A<sub>1</sub> + A<sub>2</sub>, then
+Unlike TE or TOP, the optimal edo number space in TOC is linear with respect to A. That is, if A = ''α''A<sub>1</sub> + ''β''A<sub>2</sub>, then
 <math>
 n = \frac {AW \vec j}{J \vec j} \\
-= \frac {(A_1 + A_2) W \vec j}{J \vec j} \\
+= \frac {(\alpha A_1 + \beta A_2) W \vec j}{J \vec j} \\
-= \frac {A_1 W \vec j}{J \vec j} + \frac {A_2 W \vec j}{J \vec j} \\
+= \alpha \frac {A_1 W \vec j}{J \vec j} + \beta \frac {A_2 W \vec j}{J \vec j} \\
-= n_1 + n_2
+= \alpha n_1 + \beta n_2
 </math>