Difference between revisions of "TI-BASIC:Linreg Error"
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The routine returns a two-element list; σ,,''a'',, is the first element, and σ,,''b'',, is the second element. | The routine returns a two-element list; σ,,''a'',, is the first element, and σ,,''b'',, is the second element. | ||
− | If one prefers to use the function [[TI-BASIC:LinReg_A_Bx|LinReg(a+bx)]] instead of [[TI-BASIC: | + | If one prefers to use the function [[TI-BASIC:LinReg_A_Bx|LinReg(a+bx)]] instead of [[TI-BASIC:Linreg_Ax_B|LinReg(ax+b)]], the appropriate routine is: |
:2-Var Stats | :2-Var Stats |
Latest revision as of 23:54, 24 February 2016
Routine Summary
Calculates the standard error associated with linear regression coefficients.
Inputs
L₁ - values of the independent variable L₂ - values of the dependent variable
Outputs
Ans - a 2-element list containing the standard errors
Variables Used
L₁, L₂,
Calculator Compatibility
TI-83/84/+/SE
Download
No download provided.
:2-Var Stats :LinReg(ax+b) :a√((r²ֿ¹−1)/(n-2)){1,√(Σx²/n)}
This routine computes the standard error (uncertainty) associated with the linear regression coefficients a and b (σ,,a,, and σ,,b,,, respectively) for the regression equation y=a//x+b. Precisely stated, the true value of the coefficient a is expected to be within the interval a±σ,,a,,, and similarly for b.
The routine returns a two-element list; σ,,a,, is the first element, and σ,,b,, is the second element.
If one prefers to use the function LinReg(a+bx) instead of LinReg(ax+b), the appropriate routine is:
:2-Var Stats :LinReg(a+bx) :b√((r²ֿ¹−1)/(n-2)){√(Σx²/n),1}
(note that the meanings of σ,,a,, and σ,,b,, have now interchanged).
In both routines, r², a, b, n, and Σx² are statistical variables.
Formulas
For the fitting equation y=a//x+b,
<math> \definecolor{darkgreen}{rgb}{0.90,0.91,0.859}\pagecolor{darkgreen} \begin{align*} \sigma_a&=a\sqrt{\frac{\frac1{r^2}-1}{n-2}} \\ \sigma_b&=\sigma_a\sqrt{\frac{\Sigma x^2}{n}} \end{align*} </math>
where n is the number of data points, r² is the coefficient of determination, and Σx² is the sum of squares of the independent variable values.
Error Conditions
- ERR:DIM MISMATCH is thrown if the two lists' sizes are not the same.
Reference
Lichten, William. Data and Error Analysis., 2nd. ed., Prentice Hall: Upper Saddle River, NJ, 1999.