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I have a linear regression of the form:

Y= B0 + B1*X1 + B2*X2 + Be*Xe

If I assume values for Beta (0.38,0.27,0.10) and also assume that Xi are normally distributed with N(0,1).

How can I generate a dataset that will be a linear combination of these variables?

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What have you tried? beta length is 3 or 4? –  agstudy Jan 17 '13 at 19:42
It's not clear to me what the formula above represents -- the Bi's in the equation are the Betas? What are Be and Xe? –  user295691 Jan 17 '13 at 19:46
presumably Be is the standard error of the residuals -- but I agree that it would be useful if you defined it. –  Ben Bolker Jan 17 '13 at 20:31

2 Answers 2

up vote 5 down vote accepted

This should work:

beta =c(0.38,0.27,0.10)
beta0 <- 1
N <- 10           
x <- matrix(rnorm(n=N*3) ,ncol=3) ## generate (x1,x2,xe)
y <- beta0 + x %*% beta
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Thanks! Once I have this how can I use specific values of betas to predict Y ? –  user1723765 Jan 17 '13 at 20:37

If I'm understanding the question correctly, you can generate this with a simple expression:

Y <- .38 + .27 * rnorm(1000) + .10 * rnorm(1000)

which will give you a vector, Y, distributed based on the formula above.

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