for
Data Linearization Method for
Exponential
Curve
Fitting.
Fit the curve ![[Graphics:Images/NonLinearCurveFitMod_gr_1.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_1.gif){kind=small}
to
the data points ![[Graphics:Images/NonLinearCurveFitMod_gr_2.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_2.gif){kind=small}
.
Taking the logarithm of both sides we obtain ![[Graphics:Images/NonLinearCurveFitMod_gr_3.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_3.gif){kind=small}
![[Graphics:Images/NonLinearCurveFitMod_gr_4.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_4.gif){kind=small}
, thus
![[Graphics:Images/NonLinearCurveFitMod_gr_5.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_5.gif){kind=small}
.
Introduce the change of variable ![[Graphics:Images/NonLinearCurveFitMod_gr_6.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_6.gif){kind=small}
. Then
the previous equation becomes
![[Graphics:Images/NonLinearCurveFitMod_gr_7.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_7.gif){kind=small}
which is a linear equation in the variables X and Y.
Use the change of
variables ![[Graphics:Images/NonLinearCurveFitMod_gr_8.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_8.gif){kind=small}
on
all the data points and obtain
![[Graphics:Images/NonLinearCurveFitMod_gr_9.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_9.gif){kind=small}
for ![[Graphics:Images/NonLinearCurveFitMod_gr_10.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_10.gif){kind=small}
.
Fit the points ![[Graphics:Images/NonLinearCurveFitMod_gr_11.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_11.gif){kind=small}
with
a "least squares line" of the
form ![[Graphics:Images/NonLinearCurveFitMod_gr_12.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_12.gif){kind=small}
.
Comparing the equations ![[Graphics:Images/NonLinearCurveFitMod_gr_13.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_13.gif){kind=small}
we
see that ![[Graphics:Images/NonLinearCurveFitMod_gr_14.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_14.gif){kind=small}
. Thus
![[Graphics:Images/NonLinearCurveFitMod_gr_15.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_15.gif){kind=small}
are used to construct the coefficients which are then used to "fit
the curve"
![[Graphics:Images/NonLinearCurveFitMod_gr_16.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_16.gif){kind=small}
to the given data points ![[Graphics:Images/NonLinearCurveFitMod_gr_17.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_17.gif){kind=small}
in
the xy-plane.
Proof Nonlinear Curve Fitting Nonlinear Curve Fitting
Computer Programs Nonlinear Curve Fitting Nonlinear Curve Fitting
Example 1. Fit the
curve ![[Graphics:Images/NonLinearCurveFitMod_gr_18.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_18.gif){kind=small}
to
the data points ![[Graphics:Images/NonLinearCurveFitMod_gr_19.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_19.gif){kind=small}
.
Solution
1.
Data Linearization Method for a
Power
Function Curve
Fitting.
Fit the curve ![[Graphics:Images/NonLinearCurveFitMod_gr_70.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_70.gif){kind=small}
to
the data points ![[Graphics:Images/NonLinearCurveFitMod_gr_71.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_71.gif){kind=small}
.
Taking the logarithm of both sides we obtain ![[Graphics:Images/NonLinearCurveFitMod_gr_72.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_72.gif){kind=small}
![[Graphics:Images/NonLinearCurveFitMod_gr_73.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_73.gif){kind=small}
, thus
![[Graphics:Images/NonLinearCurveFitMod_gr_74.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_74.gif){kind=small}
.
Introduce the change of variable ![[Graphics:Images/NonLinearCurveFitMod_gr_75.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_75.gif){kind=small}
. Then
the previous equation becomes
![[Graphics:Images/NonLinearCurveFitMod_gr_76.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_76.gif){kind=small}
which is a linear equation in the variables X and Y.
Use the change of
variables ![[Graphics:Images/NonLinearCurveFitMod_gr_77.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_77.gif){kind=small}
on
all the data points and obtain
![[Graphics:Images/NonLinearCurveFitMod_gr_78.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_78.gif){kind=small}
for ![[Graphics:Images/NonLinearCurveFitMod_gr_79.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_79.gif){kind=small}
.
Fit the points ![[Graphics:Images/NonLinearCurveFitMod_gr_80.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_80.gif){kind=small}
with
a "least squares line" of the
form ![[Graphics:Images/NonLinearCurveFitMod_gr_81.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_81.gif){kind=small}
.
Comparing the equations ![[Graphics:Images/NonLinearCurveFitMod_gr_82.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_82.gif){kind=small}
we
see that ![[Graphics:Images/NonLinearCurveFitMod_gr_83.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_83.gif){kind=small}
. Thus
![[Graphics:Images/NonLinearCurveFitMod_gr_84.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_84.gif){kind=small}
are used to construct the coefficients which are then used to "fit
the curve"
![[Graphics:Images/NonLinearCurveFitMod_gr_85.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_85.gif){kind=small}
to the given data points ![[Graphics:Images/NonLinearCurveFitMod_gr_86.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_86.gif){kind=small}
in
the xy-plane.
Proof Nonlinear Curve Fitting Nonlinear Curve Fitting
Example 2. Fit the
curve ![[Graphics:Images/NonLinearCurveFitMod_gr_87.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_87.gif){kind=small}
to
the data points ![[Graphics:Images/NonLinearCurveFitMod_gr_88.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_88.gif){kind=small}
.
Solution
2.
Example 3. Often
times a scientist must decide which formula "fits" the
data best.
3 (a). Find both the
"exponential fit" and "power fit" for the data
points ![[Graphics:Images/NonLinearCurveFitMod_gr_138.gif]](nonlinearfit/NonLinearCurveFitMod/Images/NonLinearCurveFitMod_gr_138.gif){kind=small}
.
3 (b). Discuss how
this was accomplished and what transformations were used in the
process.
3 (c). Determine which
curve fits the data best.
Solution
3.
Old Lab Project (Nonlinear Curve Fitting Nonlinear Curve Fitting). Internet hyperlinks to an old lab project.
Research Experience for Undergraduates
Nonlinear Curve Fitting Nonlinear Curve Fitting Internet hyperlinks to web sites and a bibliography of articles.
Download this Mathematica Notebook Nonlinear Curve Fitting
Return to Numerical Methods - Numerical Analysis
(c) John H. Mathews 2004