# Towers of Hanoi

I am working on an exercise in a book which asks us to solve the Towers of Hanoi problem using recursive methods. I have come to a solution, but from what I gather after browsing the Internet when done is that my solution may not be correct. Does anyone know a better/different way to solve the problem? And does anyone have nay suggestions for improvements. (Btw, the out put is correct. It is only supposed to tell from which tower to another pegs are moving, not specifically which pegs)

Here is the code:

``````#include <iostream>
#include <cmath>

using namespace std;

static int counter = 0;

void ToH(int dskToMv, int cLocation, int tmpLocation, int fLocation)
{
if (dskToMv == 0);
else
{
if (dskToMv%2!=0)
{
cout << cLocation << "->" << tmpLocation << endl;
cout << cLocation << "->" << fLocation << endl;
cout << tmpLocation << "->" << fLocation << endl;
ToH(dskToMv-1, cLocation, fLocation, tmpLocation);
}
else if (dskToMv%2==0)
{
counter++;
if (counter%2==0)
cout << fLocation << "->" << cLocation << endl;
else
cout << cLocation << "->" << fLocation << endl;
ToH(dskToMv-1, tmpLocation, cLocation, fLocation);
}
}
}

int main()
{
int x, j;
cout << "Enter number of disks: ";
cin >> x;
j = pow(2.0, x-1)-1;
if (x%2==0)
ToH(j, 1, 2, 3);
else
ToH(j, 1, 3, 2);
return 0;
}
``````

Is this method qualified as recursion?

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For variants of the hanoi tower puzzle check the book: Concrete Mathematics - A Foundation for Computer Science. –  Karoly Horvath Jul 18 '11 at 21:18

To answer your question: yes, that is qualified as recursion. Any time a function calls itself, it is recursion.

With that being said, your code can be trimmed down substantially:

``````#include <iostream>

using namespace std;

void ToH(int dskToMv, int cLocation, int tmpLocation, int fLocation)
{
if( dskToMv != 0 )
{
ToH( dskToMv-1, cLocation, fLocation, tmpLocation );
cout << cLocation << "->" << fLocation << endl;
ToH( dskToMv-1, tmpLocation, cLocation, fLocation );
}
}

int main()
{
int x;
cout << "Enter number of disks: ";
cin >> x;
ToH(x, 1, 2, 3);
return 0;
}
``````
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oh. Thanks! I figured that my code was kinda clumsy, but I did not know that it could be trimmed that much! :D –  E.O. Jul 18 '11 at 21:11
sidenote: from this, you can also quickly get the number of steps needed: `H(n) = 2*H(n-1) + 1`. now if you add both side 1, you get the nice `H(n) + 1 = 2(H(n-1) + 1)` recursive equation and since `H(1) = 1` you get `H(n) = 2^n - 1` –  Karoly Horvath Jul 18 '11 at 21:15
@Emile Okada, this is actually a fundamental problem of computer science. I HIGHLY encourage you to study why this solution works, as it will help you understand the true nature of recursion. –  Stargazer712 Jul 18 '11 at 21:15
@Stargazer Working on it! It seems quite obvious now that you posted the answer. Thanks again! –  E.O. Jul 18 '11 at 21:19
Just to be picky, more than just a function calling itself, recursion has to have a defined end case. In this code it is: `if( dskToMv != 0 )`. Either way, it the code is still recursive. –  Robert Gowland Jul 19 '11 at 13:00

It's recursion when it calls itself. The ToH function has the potential to call itself on 2 separate lines, so therefor it is recursion.

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Yep, recursion just refers to when you call a function from itself.

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It's easiest if you look at the problem recursively:

To move N discs from A to B (using C):

1. if (N > 1) move N-1 discs from A to C (using B)
2. move one disc from A to B
3. if (N > 1) move N-1 discs from C to B (using A)

For any given call, whichever peg is not the source or the destination is the ancillary.

To answer your actual question: yes, your solution appears to be recursive, though a bit more complex than really necessary.

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