Matrix multiplication in R, strange results [duplicate]

This question already has an answer here:

While checking some matrix multiplication operations, I came across a strange behavior. I get different results when I perform the multiplication "by hand" (using the product and the sum) and when using the matrix multiplication operator %*%.

``````c <- 1:10
a <- 100^(0:9)
p1 <- sum(a*c)
p2 <- a%*%c
p1==p2
[,1]
[1,] FALSE
p1-p2
[,1]
[1,] -2048
``````

However, when I use any other value for a (e.g., a <- 101^0:9) , I do get the same results:

``````c <- 1:10
a <- 101^(0:9)
p1 <- sum(a*c)
p2 <- a%*%c
p1==p2
[,1]
[1,] TRUE
p1-p2
[,1]
[1,] 0
``````

Any idea why this is happening?

Thank you, Pedro

-

marked as duplicate by Roland, flodel, Brian Diggs, joran, ThomasJul 25 '13 at 20:26

See this. Use `all.equal` to test for equality. –  Roland Dec 7 '12 at 11:48
"Any other value" is not necessarily OK. Try `f <- function(b) { a <- b^(0:9); c<- 1:10; sum(a*c) - a %*% c }; bvec <- 80:120; r <- sapply(bvec,f); plot(bvec,r,type="b")` –  Ben Bolker Dec 7 '12 at 14:23
`%*%` does compute its results in a slightly different way, which means that different rounding errors occur at different places, leading to a different overall result.
I'm just guessing, but I believe that this might be due to `sum` keeping its accumulator in a machine floating point register, which has 80 bit extended precision on Intel architectures. If you want to know for certain, you'd have to look at the assembly code of R.
If you're going to go that route, you could convert the data to `mpfr` class (see the `Rmpfr` package). –  Carl Witthoft Dec 7 '12 at 14:15