As stated previously you do not need mutable state to do your job. However, if you really want to use them you can easily change Keen's solution to get what you want. First you have to translate his code in a tail recursive way. You can begin with `mkjump`

```
(define (mkjump lst) (reverse (mkjump-tr lst '())))
(define (mkjump-tr lst sol)
(if (null? lst)
sol
(mkjump-tr (cdr lst)
(cons (cons (car lst) (wrapper (car lst) (cdr lst)))
sol)) ))
```

Then you can change `modmap`

```
(define (modmap proc lst) (reverse (modmap-tr proc lst '())))
(define (modmap-tr proc lst sol)
(cond ((null? lst) sol)
((proc (car lst)) (modmap-tr proc
(cdr lst)
(cons (proc (car lst)) sol) ))
(else (modmap-tr proc (cdr lst) sol))))
```

The tail recursive `mkjump-tr`

will be translated in an iterative process. This is because it can be seen as a *while* loop. This enable you to create this loop with the `do`

construction. This way `mkjump-tr`

can be write as

```
(define (mkjump-tr lst sol)
(do ((lst lst (cdr lst))
(sol sol (cons (cons (car lst) (wrapper (car lst) (cdr lst)))
sol)) )
((null? lst) sol)
))
```

and `modmap-tr`

can be translated as

```
(define (modmap-tr proc lst sol)
(do ((lst lst (cdr lst))
(sol sol (if (proc (car lst)) (cons (proc (car lst)) sol) sol)) )
((null? lst) sol)
))
```

But since we do not have recursive form, we can directly write these `do`

's in the former functions `mkjump`

and `modmap`

. So we get

```
(define (mkjump lst)
(do ((lst lst (cdr lst))
(sol '() (cons (cons (car lst) (wrapper (car lst) (cdr lst)))
sol)) )
((null? lst) (reverse sol))
))
(define (modmap proc lst)
(do ((lst lst (cdr lst))
(sol '() (if (proc (car lst)) (cons (proc (car lst)) sol) sol)) )
((null? lst) (reverse sol))
))
```

You could see some slight changes: `reverse`

is added before `sol`

and `sol`

is initialize by the empty list in both case.

Finally, if you **really** want to see some `set!`

somewhere, just add them by breaking the `do`

-loop construction. Here is the solution for `mkjump`

```
(define (mkjump lst)
(let ((elt 'undefined)
(lst lst)
(sol '()))
(do ()
((null? lst) (reverse sol))
(set! elt (car lst))
(set! lst (cdr lst))
(set! sol (cons (cons elt (wrapper elt lst)) sol))
)))
```

I will let you change `modmap`

. These two last modifications obfuscate the idea behind the algorithm. Therefore, it is a bad idea to change them this way, since they will not improve anything. The first modification can be a good idea however. So I will suggest you to keep the first modification.

Is this what have you expected ?

`mkjump`

to return the right answer, not to change`lst`

, unless you assignment explicitly requires that`lst`

change as well. – Sam Tobin-Hochstadt Jun 18 '11 at 22:22