# How can I multiply vectors without a loop?

I have two vectors:

``````x = c(1,2,3)
y = c(4,5,2)
``````

and I want to multiply each element of `x` with each element in `y` and then sum it all up. So what I want to do is something along the lines of:

``````1*(4 + 5 + 2) + 2*(4 + 5 + 2) + 3*(4 + 5 + 2) = 11 + 22 + 33 = 66
``````

Is there a way to do it without loops? Thanks in advance

-
many ways! what have you tried so far? have you found `?sum`? – Justin Oct 16 '12 at 22:36

Here's what I'd use!

``````sum(x) * sum(y)
# [1] 66
``````
-
No fair! You used math! – joran Oct 16 '12 at 22:39
That's cheating!!!!!!! :) +1 for the simplistic approach. Logic beats programming skills. – Tyler Rinker Oct 16 '12 at 22:43
So have I been flagged for migration to math.stackexchange.com? – Josh O'Brien Oct 16 '12 at 22:46

Try:

``````sum(x*sum(y))
[1] 66
``````

Vectorised operators are neat!

`?mapply` is also a handy function to keep in mind when doing these sorts of tasks: E.g.:

``````mapply("*",x,y)
``````

...will do x[1] * y[1], x[2] * y[2] etc... to produce

``````mapply("*",x,y)
[1]  4 10  6
``````

Summary functions like `sum` can also be used on one side, like:

``````mapply("*",x,sum(y))
[1] 11 22 33
``````

Which means a long-hand way of doing your calculations would also be:

``````sum(mapply("*",x,sum(y)))
[1] 66
``````
-

Three other ideas besides Josh and thelatemail's excellent ideas:

``````sum(do.call("*", expand.grid(x, y)))
sum(outer(x, y)) ## or equivalently: sum(x %o% y)
sum(sapply(split(x, x), function(z) z * y))
``````
-
and as a more explicit variant of the second `sum(outer(x, y, "*"))` – Henry Oct 16 '12 at 22:57

We can use `x %*% t(y)` to get a matrix that has the products we want and then just use `sum` to add everything in the matrix together.

``````sum(x %*% t(y))
#[1] 66
``````

And a slightly more efficient version of this same idea (Thanks to Gavin)

``````sum(tcrossprod(x, y))
#[1] 66
``````
-
Another math cheater :P + 1 – Tyler Rinker Oct 17 '12 at 6:11
+1 `tcrossprod(x, y)` is supposed to be a slightly more efficient version of `x %*% t(y)`. – Gavin Simpson Oct 17 '12 at 9:12