# Sine curve fit using lm and nls in R

I am a beginner in curve fitting and several posts on Stackoverflow really helped me.

I tried to fit a sine curve to my data using `lm` and `nls` but both methods show a strange fit as shown below. Could anyone point out where I went wrong. I would suspect something to do with time but could not get it right. My data can be accessed from here.

``````data <- read.table(file="900days.txt", header=TRUE, sep="")
time<-data\$time
temperature<-data\$temperature

#lm fitting
xc<-cos(2*pi*time/366)
xs<-sin(2*pi*time/366)
fit.lm<-lm(temperature~xc+xs)
summary(fit.lm)
plot(temp~time, data=data, xlim=c(1, 900))
par(new=TRUE)
plot(fit.lm\$fitted, type="l", col="red", xlim=c(1, 900), pch=19, ann=FALSE, xaxt="n",
yaxt="n")

#nls fitting
fit.nls<-nls(temp~C+alpha*sin(W*time+phi),
start=list(C=27.63415, alpha=27.886, W=0.0652, phi=14.9286))
summary(fit.nls)
plot(fit.nls\$fitted, type="l", col="red", xlim=c(1, 900), pch=19, ann=FALSE, xaxt="n",
axt="n")
``````
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`fit.lm` is of class "lm" , so there's a plot method for it. `plot(fit.lm, type.....)` may be more what you want. –  Carl Witthoft Nov 20 '13 at 19:22

This is because the `NA` values are removed from the data to be fit (and your data has quite a few of them); hence, when you plot `fit.lm\$fitted` the plot method is interpreting the index of that series as the 'x' values to plot it against.

Try this [note how I've changed variable names to prevent conflicts with the functions `time` and `data` (read this post)]:

``````Data <- read.table(file="900days.txt", header=TRUE, sep="")
Time <- Data\$time
temperature <- Data\$temperature

xc<-cos(2*pi*Time/366)
xs<-sin(2*pi*Time/366)
fit.lm <- lm(temperature~xc+xs)

# access the fitted series (for plotting)
fit <- fitted(fit.lm)

# find predictions for original time series
pred <- predict(fit.lm, newdata=data.frame(Time=Time))

plot(temperature ~ Time, data= Data, xlim=c(1, 900))
lines(fit, col="red")
lines(Time, pred, col="blue")
``````

This gives me:

Which is probably what you were hoping for.

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Thanks a lot @Andy Batbour. The link is also very helpful. –  Eddie Nov 20 '13 at 21:06
I just wondering how to refine so that the curve actually fit the maximum temperature values. –  Eddie Nov 21 '13 at 17:22
@Eddie I'm not sure what you mean. Can you clarify? –  Andy Barbour Nov 21 '13 at 18:04
Thanks again @Andy Barbour, I was hoping that the blue curve is running through some of the maximum values(e.g at 29.5 degree Celcius at the first peak). At the moment, the highest peak for the predicition(blue curve) is somewhere around 28.8 degree Celcius. I am not sure how to refine this in lm. For nls, I think I can achieve that by changing my initial parameters value(which is also a tricky part). :) –  Eddie Nov 21 '13 at 19:21
Then I think you'd want to use the `'weights'` field; but, you may wish to ask over at stats.stackexchange.com –  Andy Barbour Nov 22 '13 at 1:57

How about choosing an X and an Y while doing your line plot instead of just choosing the Y.

``````plot(time,predict(fit.nls),type="l", col="red", xlim=c(1, 900), pch=19, ann=FALSE, xaxt="n",
yaxt="n")
``````

Also both `lm` and `nls` just give you the fitted points. So you must estimate the rest of the points in order to make a curve, a line plot. Since you are with `nls` and `lm`, perhaps the function `predict` maybe useful.

-

Not sure if this might help - I get a similar fit using sine only:

``````y = amplitude * sin(pi * (x - center) / width) + Offset

amplitude =  2.0009690806953033E+00
center = -2.5813588834888215E+01
width =  1.8077550471975817E+02
Offset =  2.6872265116104828E+01

Fitting target of lowest sum of squared absolute error = 3.6755174406241423E+01

Degrees of freedom (error): 90
Degrees of freedom (regression): 3
Chi-squared: 36.7551744062
R-squared: 0.816419142696
Model F-statistic: 133.415731033
Model F-statistic p-value: 1.11022302463e-16
Model log-likelihood: -89.2464811027
AIC: 1.98396768304
BIC: 2.09219299292
Root Mean Squared Error (RMSE): 0.625309918107

amplitude = 2.0009690806953033E+00
std err squared: 1.03828E-02
t-stat: 1.96374E+01
p-stat: 0.00000E+00
95% confidence intervals: [1.79853E+00, 2.20340E+00]
center = -2.5813588834888215E+01
std err squared: 2.98349E+01
t-stat: -4.72592E+00
p-stat: 8.41245E-06
95% confidence intervals: [-3.66651E+01, -1.49621E+01]
width = 1.8077550471975817E+02
std err squared: 3.54835E+00
t-stat: 9.59680E+01
p-stat: 0.00000E+00
95% confidence intervals: [1.77033E+02, 1.84518E+02]
Offset = 2.6872265116104828E+01
std err squared: 5.15458E-03
t-stat: 3.74289E+02
p-stat: 0.00000E+00
95% confidence intervals: [2.67296E+01, 2.70149E+01]

Coefficient Covariance Matrix
[ 0.02542366 0.01786683 -0.05016085 -0.00652111]
[ 1.78668314e-02 7.30548346e+01 -2.18160818e+01 1.24965136e-01]
[ -5.01608451e-02 -2.18160818e+01 8.68860810e+00 -1.27401806e-02]
[-0.00652111 0.12496514 -0.01274018 0.0126217 ]
``````

James Phillips zunzun@zunzun.com

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Thanks @James Phillips. Thats true. You might want to check this post stats.stackexchange.com/questions/60500/… –  Eddie Nov 27 '13 at 14:37