The recursive algorithm is:

To move n discs from peg A to peg C:

1. move n−1 discs from A to B. This leaves disc n alone on peg A

2. move disc n from A to C

3. move n−1 discs from B to C so they sit on disc n

(From http://en.wikipedia.org/wiki/Tower_of_Hanoi#Recursive_solution)

Since the meaning of A, B and C (your `from`

, `aux`

and `to`

) are relative to the current iteration and keep changing, it's easier not to pass the state of the game around and trying to understand what it means, but to simply generate solving instructions.

To implement the algorithm above in this way, you need the following inside your `(when (>= height 1)`

:

1. Recursive call with n-1, swapping B and C. You got this one right already.

2. Print info about the move, for instance `(format t "~%Move ~a to ~a" from to)`

.

3. Recursive call with n-1, swapping A and B. You got this one right too.

Then change your `(solve-hanoi)`

so that it takes the number of disks on the first rod as argument, and calls (hanoi) with this number and whatever names you want for the rods, for instance `(hanoi 4 'A 'B 'C)`

or `(hanoi 4 1 2 3)`

for 4 disks.