# Towers of Providence problem

The Towers of Providence is a variation of the classical Towers of Hanoi problem. There are four pegs, denoted A, B, C, and D, and N disks of different sizes. Originally, all the disks are on peg A, stacked in decreasing size from bottom to top. Our goal is to transfer all the disks to peg D, and the rules are that we can only move one disk at a time, and no disk can be moved onto a smaller one. We can solve this problem with a recursive method: If N = 1, move this disk directly to peg D, and we are done. Otherwise (N > 1), perform the following steps:

(a) transfer the top N-2 disks on peg A to peg B applying the method recursively;
(b) move the second largest disk from peg A to peg C;
(c) move the largest disk from peg A to peg D;
(d) move the second largest disk from peg C to peg D;
(e) fill in this step

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So what is your question? –  Joachim Sauer Feb 25 '11 at 8:00
He is looking for the step e. –  Krishna Feb 25 '11 at 8:07
Have you tried writing out the steps to move the disks (perhaps only a stack of 2 or 3) by hand, and then seeing if there is a pattern to what will happen in step e? –  Jeremiah Willcock Feb 25 '11 at 8:30
You may want to check out: stackoverflow.com/questions/1834143/… –  amccormack Feb 25 '11 at 10:21