Root mean square: Difference between revisions

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 == Examples ==
-The root mean square of [[1/1]] (0{{cent}}) and [[3/2]] (≈701.955{{cent}}) is <math>RMS(\frac{1}{1}, \frac{3}{2}) = \sqrt{\frac{13}{8}}</math> (≈420.264{{cent}}).
+The root mean square of [[1/1]] (0{{cent}}) and [[3/2]] (≈ 701.955{{cent}}) is <math>\operatorname {RMS}(\frac{1}{1}, \frac{3}{2}) = \sqrt{\frac{13}{8}}</math> (≈ 420.264{{cent}}).
-The root mean square of [[5/4]] (≈386.314{{cent}}) and [[6/5]] (≈315.641{{cent}}) is <math>RMS(\frac{5}{4}, \frac{6}{5}) = \sqrt{\frac{1201}{800}}</math> (≈351.699{{cent}}).
+The root mean square of [[5/4]] (≈ 386.314{{cent}}) and [[6/5]] (≈ 315.641{{cent}}) is <math>\operatorname {RMS}(\frac{5}{4}, \frac{6}{5}) = \sqrt{\frac{1201}{800}}</math> (≈ 351.699{{cent}}).
-The root mean square of [[9/8]] (≈203.910{{cent}}) and [[10/9]] (≈182.404{{cent}}) is <math>RMS(\frac{9}{8}, \frac{10}{9}) = \sqrt{\frac{12961}{10368}}</math> (≈193.224{{cent}}).
+The root mean square of [[9/8]] (≈ 203.910{{cent}}) and [[10/9]] (≈ 182.404{{cent}}) is <math>\operatorname {RMS}(\frac{9}{8}, \frac{10}{9}) = \sqrt{\frac{12961}{10368}}</math> (≈ 193.224{{cent}}).
 == See also ==