# Efficient random number list sum in Racket

What would be the most efficient way to first generate and then sum a list of random integers in Racket?

I am trying to implement an equivalent of the code in https://scottlocklin.wordpress.com/2011/11/30/only-fast-languages-are-interesting but I can only come up with slow imlpementations.

My first naive attempt (not random integers, but anyway):

``````(define (sum-list l)
(if (null? l)
0
(+ (first l) (sum-list (rest l)))))

(define avector

(time (sum-list avector))
``````

Please note that the efficient part of the code should only be the actual sum of the list, not the generation.

Thanks a lot.

• If you were interested in saving space, you could use a lazy version of build-vector (e.g. build-list from Lazy Racket) so that only one element from it need be in memory at a time. Nov 30, 2011 at 19:55

Here's a simple version, using `vector's:

``````#lang racket

(define N 3000000)
(define avector
(for/vector #:length N ([i (in-range N)]) (random)))

(define (sum-vec v)
(for/fold ([i 0.0]) ([e (in-vector v)]) (+ e i)))

(time (sum-vec avector))
``````

That runs in about 250 ms on my machine.

If we switch to using `flvector`:

``````#lang racket

(require racket/flonum)

(define N 3000000)
(define avector
(for/flvector #:length N ([i (in-range N)]) (random)))

(define (sum-vec v)
(for/fold ([i 0.0]) ([e (in-flvector v)]) (+ e i)))

(time (sum-vec avector))
``````

Then it runs in about 60 ms.

If we change it to use Typed Racket:

``````#lang typed/racket

(require racket/flonum)

(define N 3000000)
(define avector
(for/flvector #:length N ([i (in-range N)]) (random)))

(: sum-vec : FlVector -> Float)
(define (sum-vec v)
(for/fold ([i 0.0]) ([e (in-flvector v)]) (+ e i)))

(time (sum-vec avector))
``````

Now it runs in about 20 ms.

• That's a great reply, thanks a lot. I am taking my first steps in Racket and this single comment gives me enough material to study for a while! Typed Racket looks specially interesting. It reminds me of Ocaml-style signatures. Nov 30, 2011 at 16:14