# lists/compound data

how would you develop a function one that would consume a list of symbols and returns the same list but with every instance of 'cat doubled?

so for example

 (one (cons 'animal(cons 'table (cons 'cat (cons 'bread
empty)))))


I would get (I suppose)

 (cons 'animal (cons 'table (cons 'cat (cons 'cat (cons 'bread
empty)))))


in return. I am getting frustrated reading the book and trying to figure this out.

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The logical procedure to use would be fold-left or fold-right from SRFI1/R6RS. –  leppie Feb 8 '13 at 19:32
BTW: (cons 'animal(cons 'table (cons 'cat (cons 'bread empty)))) is simply written as '(animal table cat bread) –  leppie Feb 8 '13 at 19:33
@leppie Not strictly the same if you want to use set-car! or set-cdr!. :-P –  Chris Jester-Young Feb 8 '13 at 20:03

This is one of the simplest examples of how to recursively traverse a list while building another list. You should write it yourself, because you're in the process of learning. I'll help you a bit with the general structure of the solution, fill in the blanks:

(define (copy lst)
(if <???>                 ; is the list empty?
<???>                 ; if so, return the empty list
(cons <???>           ; otherwise cons the first element of the list (*)
(copy <???>)))) ; and advance the recursion over the rest of the list


(*) ... but if the element is 'cat, then cons two copies of it.

Test it with the list in the question:

(copy (cons 'one (cons 'animal (cons 'table (cons 'cat (cons 'bread empty))))))


... Which happens to be equivalent to this:

(copy '(one animal table cat bread))


Either way, the result is a copy of the input list with the same elements (and two copies of each 'cat found), but residing inside new cons-cells.

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Leppie (who told me to "go play with your mutation in the traffic ;p" in response to my set-car!/set-cdr! comment above ;-)) wanted me to write a fold-based solution, so here it is!

(define (fun lst)
(fold-right (lambda (e r)
(case e
((cat) (cons* e e r))
(else (cons e r))))
'() lst))

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