deriviation_of_a_and_b_in_a_simple_regression
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| deriviation_of_a_and_b_in_a_simple_regression [2025/08/04 21:00] – hkimscil | deriviation_of_a_and_b_in_a_simple_regression [2025/08/04 21:24] (current) – hkimscil | ||
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| \begin{eqnarray*} | \begin{eqnarray*} | ||
| - | \sum{(Y_i - \hat{Y_i})^2} & = & \sum{(Y_i - (a + bX_i))^2} | + | \sum{(Y_i - \hat{Y_i})^2} |
| + | & = & \sum{(Y_i - (a + bX_i))^2} | ||
| & = & \text{SSE or SS.residual} \;\;\; \text{(and this should be the least value.)} | & = & \text{SSE or SS.residual} \;\;\; \text{(and this should be the least value.)} | ||
| \end{eqnarray*} | \end{eqnarray*} | ||
| Line 14: | Line 15: | ||
| \text{for a (constant)} \\ | \text{for a (constant)} \\ | ||
| \\ | \\ | ||
| - | \dfrac{\text{d}}{\text{da}} \sum{(Y_i - (a + bX_i))^2} & = & \sum \dfrac{\text{d}}{\text{da}} {(Y_i - (a + bX_i))^2} \\ | + | \dfrac{\text{d}}{\text{da}} \sum{(Y_i - (a + bX_i))^2} |
| - | & = & \sum{2 (Y_i - (a + bX_i))} | + | & = & \sum \dfrac{\text{d}}{\text{da}} {(Y_i - (a + bX_i))^2} \\ |
| - | & \because | + | & & \because |
| + | & & \therefore{} | ||
| + | & = & \sum \dfrac{\text{dresidual}^2} {da} \\ | ||
| + | & = & \sum \dfrac{\text{dresidual}^2}{\text{dresidual}} * \dfrac{\text{dresidual}}{\text{da}} \\ | ||
| + | & = & \sum{2 * \text{residual}} * {\dfrac{\text{dresidual}}{\text{da}}} \;\;\;\; \\ | ||
| + | & = & \sum{2 * \text{residual}} * {\dfrac{d{(Y_i - (a + bX_i))}}{\text{da}}} \;\;\;\; \\ | ||
| + | & = & \sum{2 * \text{residual}} * (0 - 1 - 0) \;\;\;\; \\ | ||
| + | & & \because{Y_i = 0; \;\;\; a = 1; \;\;\; bX_i = 0} \\ | ||
| + | & = & \sum{2 * \text{residual}} * (-1) \; | ||
| & = & -2 \sum{(Y_i - (a + bX_i))} \\ | & = & -2 \sum{(Y_i - (a + bX_i))} \\ | ||
| \\ | \\ | ||
| Line 35: | Line 44: | ||
| \text{for b, (coefficient)} \\ | \text{for b, (coefficient)} \\ | ||
| \\ | \\ | ||
| - | \dfrac{\text{d}}{\text{dx}} \sum{(Y_i - (a + bX_i))^2} | + | \dfrac{\text{d}}{\text{db}} \sum{(Y_i - (a + bX_i))^2} |
| & = & \sum{2 (Y_i - (a + bX_i))} * (-X_i) \;\;\;\; \\ | & = & \sum{2 (Y_i - (a + bX_i))} * (-X_i) \;\;\;\; \\ | ||
| & \because & \dfrac{\text{d}}{\text{dv for b}} (Y_i - (a+bX_i)) = -X_i \\ | & \because & \dfrac{\text{d}}{\text{dv for b}} (Y_i - (a+bX_i)) = -X_i \\ | ||
deriviation_of_a_and_b_in_a_simple_regression.1754341235.txt.gz · Last modified: by hkimscil