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(Created page with " The Root-Mean-Squared Error is defined as {{Equation|<math> \sqrt{ \bigg\langle \big( x - y \big)^2 \bigg\rangle } </math>|2=1}} The Relative-Mean-Absolute Error is define...") |
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The Root-Mean-Squared Error is defined as | The Root-Mean-Squared Error is defined as | ||
{{Equation|<math> \sqrt{ \bigg\langle \big( x - y \big)^2 \bigg\rangle } </math>|2=1}} | {{Equation|<math> RMSE = \sqrt{ \bigg\langle \big( x - y \big)^2 \bigg\rangle } </math>|2=1}} | ||
The Relative-Mean-Absolute Error is defined as | The Relative-Mean-Absolute Error is defined as | ||
{{Equation|<math> \frac { \bigg\langle \big| x - y \big| \bigg\rangle }{ \big| x \big| } </math>|2=2}} | {{Equation|<math> RMAE = \frac { \bigg\langle \big| x - y \big| \bigg\rangle }{ \big| x \big| } </math>|2=2}} | ||
The Relative-Mean-Absolute Error is defined as | The Relative-Mean-Absolute Error is defined as | ||
{{Equation|<math> \frac { \langle xy \rangle - \langle x \rangle \langle y \rangle }{ \sqrt{ \langle x^2 \rangle - \langle x \rangle ^2 \sqrt{ \langle y^2 \rangle - \langle y \rangle ^2} </math>|2=3}} | {{Equation|<math> R = \frac { \langle xy \rangle - \langle x \rangle \langle y \rangle }{ \sqrt{ \langle x^2 \rangle - \langle x \rangle ^2} \sqrt{ \langle y^2 \rangle - \langle y \rangle ^2} } </math>|2=3}} | ||
Revision as of 18:32, 13 October 2010
The Root-Mean-Squared Error is defined as
| (1) |
The Relative-Mean-Absolute Error is defined as
| (2) |
The Relative-Mean-Absolute Error is defined as
| (3) |
