# A better explanation of using stream to generate numbers with alternating signs

The code here can generate numbers like this [1 -2 3 -4 5 -6 7 -8 9 -10 ...]

``````(define (integers-starting-from n)
(cons-stream n (stream-map - (integers-starting-from (+ n 1)))))
``````

I don't quite understand the way it generates alternating signs. Can someone please give me a better description to help me visualise this?

You can run the code in mit-scheme.

-

Let's think of it like this:

Too generate a infinite stream of integers, we would want to do

``````(define (integers-starting-from n)
(cons-stream n (integers-starting-from (+ n 1))))
``````

This would like something like this (for starting with n=1):

``````(+1 +2 +3 +4 +5 ...)
``````

Now, let's assume that we take all the elements from the second place, and invert their sign:

``````(+1 -2 -3 -4 -5 ...)
``````

Let's do the same for the third place and on:

``````(+1 -2 +3 +4 +5 ...)
``````

Repeat twice more, each time beginning at the next place:

``````(+1 -2 +3 -4 -5 ...)
(+1 -2 +3 -4 +5 ...)
``````

As we can see, if after each element we add the rest of the integer stream, after inverting it's sign (inverting the sign of the rest of the stream), we will get exactly what you wanted - a stream of integers with alternating signs. Each time we use `stream-map` with `-` on the rest of the stream to invert it's sign, where the "rest of the stream" is just the stream starting from `(+ n 1)`.

Wrap it all up with `cons-stream` and you should have it.

-
Thanks very much. This is exactly what I am looking for. –  yang-qu Jun 11 '11 at 11:33
``````(cons-stream n (stream-map - (integers-starting-from (+ n 1)))))
is doing two things, firstly it's `cons-stream` the value `n` and the value form evaluating `(stream-map - (integers-starting-from (+ n 1)))` which happens to be inversion of the stream as the monadic case of `-` is to negate. Thus your alternating pattern.
``````(define (integers-starting-from n)