How can I compute the standard error for coefficients returned from curve fitting functions in the Curve Fitting Toolbox?
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MathWorks Support Team
on 18 Oct 2013
Commented: Adam Danz
on 29 Aug 2019
I fit my data to a polynomial model using the FIT function from the Curve Fitting Toolbox as follows:
load census
[fitresult,gof1,out1] = fit(cdate,pop,'poly2');
The FIT function returns the following coefficients, along with confidence intervals:
fitresult =
Linear model Poly2:
fit1(x) = p1*x^2 + p2*x + p3
Coefficients (with 95% confidence bounds):
p1 = 0.006541 (0.006124, 0.006958)
p2 = -23.51 (-25.09, -21.93)
p3 = 2.113e+004 (1.964e+004, 2.262e+004)
I am interested in finding the standard error of the coefficients rather than the confidence interval.
Accepted Answer
MathWorks Support Team
on 29 Aug 2019
Edited: MathWorks Support Team
on 28 Aug 2019
The FIT function in the Curve Fitting Toolbox does not currently return the standard error or variance information on the estimated coefficients.
You can compute the standard errors from the confidence interval in the following manner.
Let "fitresult" be the result of calling "fit", and "df" be the degrees of freedom:
>> alpha = 0.95
>> ci = confint(fitresult, alpha)
>> t = tinv((1+alpha)/2, df);
>> se = (ci(2,:)-ci(1,:)) ./ (2*t) % Standard Error
Alternatively, models fitted using the Statistics Toolbox methods will have their coefficient-covariance matrices calculated and stored automatically as a model property. For example, you can access the coefficient-covariance matrix of a model "mdl" generated as output of the command "fitlm" by the command "mdl.Coefficient." See the following documentation link for more information:
You can also refer to the following discussion on MATLAB Answers:
3 Comments
John D'Errico
on 29 Aug 2019
df should be the number of observations minus the number of estimated parameters.
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