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I am trying to curve fit some periodical experimental data, and discovered that the methods that work for curve-fitting to other functions do not work for trigonometric ones--at least--the way I am doing it.

Here is my code:

falseData = Table[{x, N[3*Sin[4*x]]}, {x, 10}];
model = a*Sin[b*x];
fit = NonlinearModelFit[falseData, model, {a, b}, x]
Show[ListPlot[falseData, PlotStyle -> Red], Plot[fit[x], {x, 1, 10}]]

And here is what the code generates:

FittedModel[-0.184706 Sin[1.00073 x]]

A failure of a curve fit

It works perfectly if I switch the Sin functions in this example to Log or to another type of function, but it fails when I try to use Sin or Cos.

Any suggestions?

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2  
This problem was substantially covered on Mathematica by this answer. –  rcollyer Apr 3 '12 at 1:40
    
@rcollyer Please remember that the Mma site is still in beta ... –  belisarius Apr 3 '12 at 13:15
    
Thank you rcollyer. I didn't find that link with the Google keywords I was using... –  James Mishra Apr 3 '12 at 13:22

1 Answer 1

up vote 3 down vote accepted

Try using NMinimize method:

falseData = Table[{x, N[3*Sin[4*x]]}, {x, 10}];
model = a*Sin[b*x];
fit = NonlinearModelFit[falseData, model, {a, b}, x, Method -> NMinimize]
Show[ListPlot[falseData, PlotStyle -> Red], Plot[fit[x], {x, 1, 10}]]

Here is the output:

FittedModel[-3. Sin[2.28319 x]]

And here is the resulting curve:

result of fitting

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