# C# isPowerOf function

I have the next function:

``````static bool isPowerOf(int num, int power)
{
double b = 1.0 / power;
double a = Math.Pow(num, b);
Console.WriteLine(a);
return a == (int)a;
}
``````

I inserted the print function for analysis.

If I call the function:

``````isPowerOf(25, 2)
``````

It return true since `5^2` equals 25. But, if I call 16807, which is `7^5`, the next way:

``````isPowerOf(16807, 5)
``````

In this case, it prints '7' but `a == (int)a` return false.

Can you help? Thanks!

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– AakashM Jul 6 '12 at 9:47
Everyone's going to suggest better floating point comparisons, but IMO the root of the problem is the algorithm here. – harold Jul 6 '12 at 9:48

Try using a small epsilon for rounding errors:

``````return Math.Abs(a - (int)a) < 0.0001;
``````

As harold suggested, it will be better to round in case `a` happens to be slightly smaller than the integer value, like 3.99999:

``````return Math.Abs(a - Math.Round(a)) < 0.0001;
``````
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It works now, but how come that 7 != (int)7 ? – Novak Jul 6 '12 at 9:45
@GuyDavid: Its because of rounding errors, the number you got isn't 7, but it is 7.000000001 or something like that – Dani Jul 6 '12 at 9:46
@Guy David try : Console.WriteLine((int)a); – Nahuel Fouilleul Jul 6 '12 at 9:50
Isn't 0.0001 a magic number? – Danny Chen Jul 6 '12 at 10:08
What if the result of math.pow is off by more than 0.0001? – harold Jul 6 '12 at 10:11

Comparisons that fix the issue have been suggested, but what's actually the problem here is that floating point should not be involved at all. You want an exact answer to a question involving integers, not an approximation of calculations done on inherently inaccurate measurements.

So how else can this be done?

The first thing that comes to mind is a cheat:

``````double guess = Math.Pow(num, 1.0 / power);
return num == exponentiateBySquaring((int)guess, power) ||
num == exponentiateBySquaring((int)Math.Ceil(guess), power);
// do NOT replace exponentiateBySquaring with Math.Pow
``````

It'll work as long as the `guess` is less than 1 off. But I can't guarantee that it will always work for your inputs, because that condition is not always met.

So here's the next thing that comes to mind: a binary search (the variant where you search for the upper boundary first) for the `base` in `exponentiateBySquaring(base, power)` for which the result is closest to `num`. If and only if the closest answer is equal to `num` (and they are both integers, so this comparison is clean), then `num` is a `power`-th power. Unless there is overflow (there shouldn't be), that should always work.

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Yes indeedy, there are good reasons why integers and floating-point numbers are separate types. – High Performance Mark Jul 6 '12 at 11:03

`Math.Pow` operates on `double`s, so rounding errors come into play when taking roots. If you want to check that you've found an exact power:

• perform the `Math.Pow` as currently, to extract the root
• round the result to the nearest integer
• raise this integer to the supplied power, and check you get the supplied target. `Math.Pow` will be exact for numbers in the range of `int` when raising to integer powers
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If you debug the code and then you can see that in first comparison:

``````isPowerOf(25, 2)
``````

a is holding `5.0` Here 5.0 == 5 => that is why you get true

and in 2nd `isPowerOf(16807, 5)`

a is holding `7.0000000000000009`

and since `7.0000000000000009 != 7` => you are getting false. and Console.WriteLine(a) is truncating/rounding the double and only show 7

That is why you need to compare the nearest value like in Dani's solution

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