Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

Background

Provide an example of R programming.

Problem

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:

Question

How would you create such a distribution?

Thank you!

share|improve this question

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
x<-seq(0,2,0.01)
y<-sta+(slo*x)+(amp*sin(fre*x)) #y no noise
ywnoise<-y+(noi*(runif(length(x))-0.5)) #y with noise

plot(x,ywnoise)
lines(x,y, col="orange")
grid()
share|improve this answer
    
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)
share|improve this answer
    
@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))
share|improve this answer
    
That's pretty close to what I was looking to use. Thank you! –  Dave Jarvis Dec 19 '10 at 23:22

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.