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Provide an example of R programming.


Create a distribution of values that, when modeled, produces a curve that resembles:

Essentially, I would like to do something like:

x <- seq( 0, 2, by=0.01 )
y <- sin( 2 * pi * cos( x - 1/2 ) )
plot( x, y * runif( x ) )

But without the clump of data points around 0.5:


How would you create such a distribution?

Thank you!

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3 Answers 3

up vote 3 down vote accepted
slo<-0.5 #slope of underlying trend
sta<--0.5 #starting y value
amp<-0.2 #amplitude of sine wave
fre<-3 #frequency of sine wave
noi<-0.8 #amplitude of noise term
y<-sta+(slo*x)+(amp*sin(fre*x)) #y no noise
ywnoise<-y+(noi*(runif(length(x))-0.5)) #y with noise

lines(x,y, col="orange")
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That would be exactly what I had in mind. Brilliant, thank you. (Nice touch with the grid.) –  Dave Jarvis Dec 19 '10 at 23:37
Codeismucheasiertoreadifyouusespaces –  hadley Dec 21 '10 at 21:59

Since sin(2*pi*cos(x-0.5)) goes to zero at 0.5 you should try just adding runif()

x <- seq( 0, 2, by=0.01 )
y <- sin( 2 * pi * cos( x - 1/2 ) ) +runif(201)
plot( x,y  )
lines(loess(y~x)$x, lowess(y~x)$y)
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@DSWin: Another excellent solution. Thank you. –  Dave Jarvis Dec 19 '10 at 23:28

Hmmm... I'm not sure if you need any specific statistical property for your distribution, but something like this gets rid of the clump

plot(x,y+rnorm(length(x), 0, 0.2))
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That's pretty close to what I was looking to use. Thank you! –  Dave Jarvis Dec 19 '10 at 23:22

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