I've been searching the web for an implementation of the Sieve of Eratosthenes in scheme and although I came up with a lot of content, none of them seemed to have made it like I need it to be done.

The problem is most algorithms either use a static end or use iteration. This paired with my lack of knowledge of the language led me to ask all of you for help.

I need an implementation of the Sieve that takes in one argument (number to Sieve until), uses only recursion and has a list of "cons" of a number with a `#t`

(true) or `#f`

(false).

So essentially the algorithm would go as such:

- Make list from 2 - inputed number with each number starting as true
- Recursively go through and mark each number that is divisible by 2 false
- Then go on to the next "true" number in the list until only primes are left marked true
- Output the list

Example output:

> (erat-sieve 20)

((2 . #t) (3 . #t) (4 . #f) (5 . #t) (6 . #f) (7 . #t) (8 . #f) (9 . #f) (10 . #f) (11 . #t) (12 . #f) (13 . #t) (14 . #f) (15 . #f) (16 . #f) (17 . #t) (18 . #f) (19 . #t) (20 . #f))

If you could also have comments thoroughly explaining the code, that would be extremely appreciated.

Thank you!

**REVISED**:::
So I've learned a bit of scheme to further explain my question...

This makes the list.

```
(define (makeList n)
(if (> n 2)
(append (makeList (- n 1)) (list (cons n (and))))
(list (cons 2 (and)))))
```

This returns a list with each multiple of the divisor marked false.

```
(define (mark-off-multiples numbers divisor)
(if (null? numbers)
'()
(append
(list (cons (car (car numbers))
(not (zero? (modulo (car (car numbers)) divisor)))))
(mark-off-multiples (cdr numbers) divisor))))
```

Now this is the function I'm having trouble with, it seems like it should work, I've gone through it manually three times, but I can't figure out why its not returning what I need.

```
(define (call-mark-off-multiples-for-each-true-number numbers)
(if (null? numbers)
'()
(if (cdr (car numbers))
(append (list (car numbers))
(call-mark-off-multiples-for-each-true-number
(mark-off-multiples (cdr numbers) (car (car numbers)))))
(append (list (car numbers))
(call-mark-off-multiples-for-each-true-number
(cdr numbers))))))
```

What I'm trying to make it do is, as the function name suggests, call mark-off-multiples for each number that is still marked true down the list. So you pass in `((3.#t)(4.#t)(5.#t))`

and then it calls `mark-off-multiples`

for 2 and returns `(3.#t)(4.#f)(5.#t)`

and you append `(2.#t)`

to it. Then it calls itself again passing in `(3.#t)(4.#f)(5.#t)`

and calls mark-off-multiples with the *cdr* of the list returning `(4.#f)(5.#t)`

and keeps going down the list...

The output I then get returned is a list with all trues.

This, hopefully with help you better understand my predicament.