# Fitting a function with an imaginary part

I'm actually new to `MATLAB`. I have some experimental data which is a plot of (R vs. f). I want to fit a function to the data and want to derive some parameters. I got fixed in trying to put all the equations together. Could anyone help me out?

``````R=-K*Im(C) %----------(1) (Im= imaginary part; K=constant)
C = (Ep-Em)/(Ep+2Em) %-------------(2)
Ep=Ea*[(A^3)+2((Ei-Ea)/(Ei+2Ea))]/[(A^3)-((Ei-Ea)/(Ei+2Ea))] %--------------(3)
``````

The parameters to be estimated are `Ea` and `Ei`.

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Not exactly sure what you are asking, but for 'solving' complicated problems in general you can always try to loop over the domain of all your variables and see which combination provides the best result. –  Dennis Jaheruddin Dec 28 '12 at 14:53
Could you please be more specific about what you really have, what you want to do and what your equations mean? –  Acorbe Dec 28 '12 at 15:05
@DennisJaheruddin - this is rarely a good idea (ok, it is terrible) for fitting models. It tends to be extremely slow, when there are very good tools available for fitting. –  user85109 Dec 28 '12 at 15:22
Thanks. It's an electrorotation exp which yields a plot of R(rotation rate) vs. f(frequency). Theoretically, eqns (1-3) give a plot similar to the experimental data. Same eqns(1-3) are expected to be used to derive Ea and Ei through curve fitting as described in some publications.I don't really know how to go about combining all the eqns and doing the fitting using MATLAB. –  user1934596 Dec 29 '12 at 8:24
@woodchips I disagree, the asker has to estimate only 2 (assumed to be scalar) variables. In this case the total time of running the program and designing it is typicaly lowest with the simplest solution. –  Dennis Jaheruddin Dec 29 '12 at 20:16