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3

What's a way to see if a number is a perfect square?

bool IsPerfectSquare(long input)
{
   // TODO
}

I'm using C# but this is language agnostic.

Bonus points for clarity and simplicity (this isn't meant to be code-golf).

Edit: This got much more complex than I expected! It turns out the problems with double precision manifest themselves a couple ways. First, Math.Sqrt takes a double which can't precisely hold a long (thanks Jon).

Second, a double's precision will lose small values ( .000...00001) when you have a huge, near perfect square. e.g., my implementation failed this test for Math.Pow(10,18)+1 (mine reported true).

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Per community request, this question has been deemed a duplicate of: stackoverflow.com/questions/295579 Thanks for the help folks! – Michael Haren Dec 5 '08 at 14:22
You could also google for the 'lsqrt' method used for integer square root. – leppie Dec 5 '08 at 14:27
Michael, Bill the Lizard made a good point that it is just a similar question, not the exact duplicate. I don't think the question needs to be closed. Besides the problem of perfect square is much more complex in practical terms than it might seem and the answers here make some great contribution. – Totophil Dec 5 '08 at 14:37

closed as exact duplicate by Michael Haren Dec 5 '08 at 14:14

5 Answers

vote up 18 vote down check 
bool IsPerfectSquare(long input)
{
    long closestRoot = (long) Math.Sqrt(input);
    return input == closestRoot * closestRoot;
}

This may get away from some of the problems of just checking "is the square root an integer" but possibly not all. You potentially need to get a little bit funkier:

bool IsPerfectSquare(long input)
{
    double root = Math.Sqrt(input);

    long rootBits = BitConverter.DoubleToInt64Bits(root);
    long lowerBound = (long) BitConverter.Int64BitsToDouble(rootBits-1);
    long upperBound = (long) BitConverter.Int64BitsToDouble(rootBits+1);

    for (long candidate = lowerBound; candidate <= upperBound; candidate++)
    {
         if (candidate * candidate == input)
         {
             return true;
         }
    }
    return false;
}

Icky, and unnecessary for anything other than really large values, but I think it should work...

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Looks as if you were faster than me ;-) Oops - your solution is also better, because 'closestRoot' is a far mor accurate name. – Treb Dec 5 '08 at 13:44
+1 for beating me to it. :) – Bill the Lizard Dec 5 '08 at 13:44
Love the number of upvotes I got before correcting it to a more bulletproof solution ;) – Jon Skeet Dec 5 '08 at 13:46
dude, you're jon skeet. – Epaga Dec 5 '08 at 13:48
1  
I assumed accuracy was important. Otherwise I'd have gone for the "guaranteed to be random" kind of response :) – Jon Skeet Dec 5 '08 at 13:58
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vote up 5 vote down

There was a very similar question. Please refer to http://stackoverflow.com/questions/295579/fastest-way-to-determine-if-an-integers-square-root-is-an-integer for an excellent answer.

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That question was looking for the fastest way. This questions is looking for the clearest code. I think that qualifies to make them different enough. – Bill the Lizard Dec 5 '08 at 13:47
Bill the Lizard, you've got a strong point here. – Totophil Dec 5 '08 at 13:54
If this gets a couple more upvotes I'll close my own question! I hadn't seen that one. – Michael Haren Dec 5 '08 at 13:54
vote up 3 vote down

In Common Lisp, I use the following:

(defun perfect-square-p (n)
  (= (square (isqrt n))
     n))
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vote up 2 vote down

To the solution you choose, don't forget to prepend a quick check for negativeness.

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Yes, I had that in there but removed it for brevity. Thanks for pointing it out though – Michael Haren Dec 5 '08 at 13:53
vote up 0 vote down 
bool IsPerfectSquare(long input)
{
    long SquareRoot = (long) Math.Sqrt(input);
    return ((SquareRoot * SquareRoot) == input);
}
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