Scheme, lists, and graph theory

I'm trying to develop a Scheme function that will take a graph as defined:

``````(define aGraph
{Mexico {USA}}
``````

and find the number of nodes bordering the specified node of the graph. I believe I am approaching this problem the wrong way; here is what I have done so far:

``````(define (nodes n graph)
(cond ((null? n) '())
(else
(cond ((eqv? n (first graph)) (length (first graph)))
(else (nodes n (rest graph)))))))
``````

Needless to say, it doesn't work (The function can be called like this: (nodes 'USA aGraph), which in theory should return 2). What advice do you have to offer so that I may get on the right track?

-

Let's examine this line:

``````  (cond ((eqv? n (first graph)) (length (first graph)))
``````

You are treating `(first graph)` as both the node key in `(eqv? n (first graph))` and as the bordering nodes in `(length (first graph))` -- perhaps this will work better:

``````  (cond ((eqv? n (first (first graph))) (length (second (first graph))))
``````
-
Thank you very much for your reply; I now see what I was doing wrong, and the problem is solved. –  Lawrence Wade Oct 2 '11 at 1:36