# Scheme defining functon

i'm trying to come up with a way to add only positive integers up to a certain number in scheme an i can't for the life of me figure out a way to do it, i was trying to use recursion.

this is what i have so far:

``````(define sumEven
(lambda(n)
(cond((> n 0)1)
((even? n) (* (sumEven n (-(* 2 n) 1)
``````

i was thinking the call would do something like:

`````` (sumEven N)=2 + 4 + ... + 2*N
``````

and output something like this:

``````(sumEven 1)  ==> 2
(sumEven 4)  ==> 20
(sumEven 5)  ==> 30
``````

but i'm not sure how to just add the even int and skip the odd or is this even possible?

-

You mean like this?

``````(define (sumEven n)
(if (= n 0)
0
(+ (* 2 n) (sumEven (- n 1)))))

(sumEven 1)
(sumEven 4)
(sumEven 5)

2
20
30
``````
-
did not know it could be that simple,maybe i was over thinking it thanks for the help –  slim Mar 17 '13 at 0:10

Notice that you can also implement the `sumEven` procedure by means of a tail recursive function, this has the advantage of reducing stack space requirements from linear, or O(n), to constant, or O(1). It's the recommended way to write a recursive procedure, whenever possible:

``````(define sumEven
(lambda (n)
(let loop ((n n)
(acc 0))
(cond ((zero? n)
acc)
(else
(loop (sub1 n) (+ (* 2 n) acc)))))))
``````

Yet another alternative, in tune with a more functional-programming style, would be to use list operations and higher-order functions for creating a list with the numbers to be added, and then add them; for instance like this:

``````(define sumEven
(lambda (n)
(apply + (build-list (add1 n) (curry * 2)))))
``````

Either way, the results are as expected:

``````(sumEven 1)
=> 2
(sumEven 4)
=> 20
(sumEven 5)
=> 30
``````
-
thanks for the tip this will help me finish the program the i'am making –  slim Mar 17 '13 at 0:11