Algorithm for a graph problem

I need to check the connectedness of directional nodes in a list. It is basically questions with 2 to 7 answers each. The answer picked dictates the next question. Since these pairs will be manually captured, I need to check each possible path for looping back (not allowed) and dead ends (all routes must stop at the END node) Any pointers?

``````start --> n1 --- n2 --- n3 --- n4 --- end

\  /   \      \   /       /

n5     \      n6------ n7

\      \     /       /

n8----n9---n10----n11

DIRECTION -->
``````
-
I'm a little confused by the graph. Does n8 only have 1 answer? what about n9? –  Rob Elliott Jul 27 '09 at 12:20
No, none of the questions n1-n11 has less than 2 answers. the graph is an illustration of the different paths possible with different answers. Example: n1 has 4 answers, 3 of which point to n2, and the remainder pointing to n5. A question's answers could point to a diffrent next Question each, but I tried to keep the graph illustration simple. –  callisto Jul 27 '09 at 12:32
Oh Wait, n6 is shown with 3 different paths. n9 has all it's answers pointing to n10, as n11 only points to n7. –  callisto Jul 27 '09 at 12:34

This may be what you are looking for:

Testing whether a graph is acyclic

Your END node is what the leaf node is in that page's terminology.

1. If graph has no nodes, it is acyclic.
2. If graph has no leaf, it is cyclic.
3. Choose any leaf, remove leaf and all transitions to it, goto step 1.

To check that there are no dead ends: Simply make sure there is only a single leaf node before using the above algorithm.

-