# recursive function accepts list in scheme

I'm new to Scheme and this is my very first Functional language. Implementing almost everything recursively seems to be awkward for me. Nevertheless, was able to implement functions of Factorial and Fibonacci problems having a single integer input.

However, what about when your function has an input of a list? Suppose this exercise:

FUNCTION: ret10 - extracts and returns as a list all the numbers greater than 10 that are found in a given list, guile> (ret10 ‘(x e (h n) 1 23 12 o)) OUTPUT: (23 12)

Should I have (define c(list)) as the argument of my function in this? or is there any other way?

Here's my derived solution based on sir Óscar López's answer below.. hope this helps others:

``````(define (ret10 lst)
(cond
((null? lst) '())

((and (number? (car lst)) (> (car lst) 10))
(cons (car lst)
(ret10 (cdr lst))))

(else (ret10 (cdr lst)))
)
)
``````
-
oops. I meant greater than 10. Sorry for about that. Edited it. – BurnzZ Aug 3 '13 at 2:45

This kind of problem where you receive a list as input and return another list as output has a well-known template for a solution. I'd start by recommending you take a look at The Little Schemer or How to Design Programs, either book will teach you the correct way to start thinking about the solution.

First, I'll show you how to solve a similar problem: copying a list, exactly as it comes. That'll demonstrate the general structure of the solution:

``````(define (copy lst)
(cond ((null? lst)                ; if the input list is empty
'())                       ; then return the empty list
(else                       ; otherwise create a new list
(cons (car lst)            ; `cons` the first element
(copy (cdr lst)))))) ; and advance recursion over rest of list
``````

Now let's see how the above relates to your problem. Clearly, the base case for the recursion will be the same. What's different is that we `cons` the first element with the rest of the list only if it's a number (hint: use the `number?` procedure) and it's greater than `10`. If the condition doesn't hold, we just advance the recursion, without consing anything. Here's the general idea, fill-in the blanks:

``````(define (ret10 lst)
(cond (<???> <???>)          ; base case: empty list
(<???>                 ; if the condition holds
(cons <???>           ; `cons` first element
(ret10 <???>))) ; and advance recursion
(else                  ; otherwise
(ret10 <???>))))      ; simply advance recursion
``````

Don't forget to test it:

``````(ret10 '(x e (h n) 1 23 12 o))
=> '(23 12)
``````

As a final note: normally you'd solve this problem using the `filter` procedure - which takes as input a list and returns as output another list with only the elements that satisfy a given predicate. After you learn and understand how to write a solution "by hand", take a look at `filter` and write the solution using it, just to compare different approaches.

-
Whoooaaa!!! Thanks sir Oscar! you're the best. Thanks for letting me discover the code on my own and not spoiling the answers right away. hehe. I updated my post to bear the the solution I made. I hope it will help others! – BurnzZ Aug 4 '13 at 16:39
@BurnzZ always my pleasure :) – Óscar López Aug 4 '13 at 16:43

Solve the problem for the first element of the list and the recurse on rest of the list. Make sure you handle the termination condition (list is `null?`) and combine results (`cons` or `append` in the following)

``````(define (extract pred? list)
(if (null? list)
'()