# Constrained least-square regression - Matlab or R

I'm doing a least-square regression on some data, the function has the form

``````y ~ a + b*x
``````

and I want the regression line to pass through a specific point P(x,y) (which is not the origin). How can I do that?

I'm using the lm command in R and the basic fitting GUI in Matlab. I think that I could use the constrOptim command (in R) or translate the origin into the point P, but I'm wondering if there's a specific command to do that.

I only need the solution for one of these programs, then I can use the coefficients in the other one.

-

Just center the data appropriately and force the regression through the 'origin':

``````lm(y ~ I(x-x0)-1, offset=rep(y0,nrow(dat)) data=dat)
``````

You might then need to adjust the intercept coefficient accordingly.

edited: `offset` needs to be a vector of the correct length. Another way to do this would be:

``````set.seed(1)
d <- data.frame(x=1:10,y=rnorm(10,mean=1:10,sd=0.1))
x0 <- 3
y0 <- 3
(lm1 <- lm(y ~ I(x-x0)-1, offset=y0, data=data.frame(d,y0)))
``````

This gives a slope of 1.005. The intercept would be `coef(lm1)*(-y0/x0)`, I think.

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I've tried as you say with `x0 <- 3.15 y0 <-283.56 regression <- lm(y ~ I(x-x0)-1, offset=y0)` (I think that `data = dat` is not necessary in this case) but I have this error : `Error in model.frame.default(formula = y ~ I(x - x0) - 1, : variable lengths differ (found for '(offset)')`. I don't understand why.. –  amcabassi Jun 3 '13 at 21:58
Thanks for your answer. I've asked how offset works in another question. –  amcabassi Jun 4 '13 at 14:41
Thanks a lot for editing the question! Both of the solutions you've proposed work. –  amcabassi Jun 4 '13 at 16:20