I was trying to solve the Towers of Hanoi problem using stacks. Here is my code:

Init_stack = [0,1,2,3]
Buffer_stack = []
Final_stack = []
n = len(Init_stack)
def move_disks(Init_stack, Buffer_stack, Final_stack, n):
    if n == 0:
    elif n == 1:
    elif n == 2:
        move_disks(Init_stack, Final_stack, Buffer_stack, n-1)
        move_disks(Buffer_stack, Init_stack, Final_stack,n-1)

This works perfectly fine when the size of Init_stack is small, say < 10. But when I ran this code on a size 100 Init_stack, the program took a very long time to complete. Can you tell me why it takes so long?

  • 1
    Using 100 disks means you have to do 2^100 - 1 = 1.27e30 moves. That may perhaps be too much for Python? – Delgan Jul 18 '15 at 21:38
  • 1
    The tower of hanoi problem has exponential time complexit O(2^n) Specifically it takes 2^n - 1 moves. This is possibly a duplicate of stackoverflow.com/questions/12383044/… – Timothy Murphy Jul 18 '15 at 21:39

Towers of Hanoi requires (2^n)-1 moves where n is the number of rings. Even extremely efficient solutions take a long time to go through that many operations in Python.

(2^10)-1 is equal to 1023(as every computer scientist knows), but (2^100)-1 is a 31 digit decimal number.


You can also solve using recursion

It takes time because the problem complexity is of exponential type which requires huge time to solve.

Click here for recursive code

  • 2
    This sample isn't that long, please include it to your answer. – ppasler Jan 8 '17 at 18:33

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