# How to determine whether a double variable has integer value?

I'm trying to find possible integer roots of a quadratic equation with Java.

Here is a snippet from my code:

``````double sqrtDiscriminant = Math.sqrt(b * b - 4 * a * c);

double  root1 = ((-1.0 * b) - sqrtDiscriminant) / (2.0 * a);
double  root2 = ((-1.0 * b) + sqrtDiscriminant) / (2.0 * a);
``````

For `a = 2`, `b = -1` and `c = -40755`, one of the roots is `143.0` (`143.0` is printed to console when I echo it so I'm only interested in such double values, not `143.00001`) My question is, how can I make sure that any root has an integer value? If `root1 = 143.0` then e.g. `root1 == 143` should return true.

I tried `root1 == Math.floor(root1)` but it didn't work.

-
maybe root1*1000==Math.floor(root1) * 1000 ? –  Kubi Dec 17 '12 at 15:03
I think it would be better to check that `Double.intValue(root1)` when passed to the equation really satisfies it. –  Andrew Logvinov Dec 17 '12 at 15:05
You'll never solve this at the numerical level. A finite computing machine is unable to model the full complexity of real numbers. –  Marko Topolnik Dec 17 '12 at 15:05
See [How to test if a double is an integer][1] [1]: stackoverflow.com/questions/9898512/… –  Amos N. Dec 17 '12 at 15:08
You should make clear whether `a, b, c` are actually of some integer data type. If they are, exact verification is possible, otherwise you are in the domain of numeric imprecision and have to deal with it. –  MvG Jan 31 at 17:05

If I would be you, I will simply take the `int/long` value of the roots and re-verify the equation to make sure that `int/long` value of the root is OK or not e.g.

``````// using round because an equivalent int/long may be represented by a near binary fraction
// as floating point calculations aren't exact
// e.g. 3.999999.. for 4
long longRoot = Math.round(root1);
if(a*longRoot*longRoot +  b*longRoot + c==0){
//its valid int root
}else{
//ignore it
}
``````
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hi yogendra, thanks for the tip. actually using int wouldn't work for some cases in my problem (e.g. large valued roots), but using long definitely helped. –  Juvanis Dec 18 '12 at 9:37

You should never use equality checks when working with double-values. Define an accuracy value like

``````double epsilon = 0.0000001;
``````

Then check whether the difference is nearly equal to `epsilon`:

``````if(Math.abs(Math.floor(value)-value) <= epsilon) { }
``````
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You should use round as the rounding error might be slightly less tha the number desired. –  Peter Lawrey Dec 17 '12 at 15:08
This tests the wrong thing, it tests whether or not the supposed root is close to an integer; what is needed is a test to determine whether the closest integer to the supposed root is a root of the original equation. –  High Performance Mark Dec 17 '12 at 15:09
Basically you're right. But choosing enough accuracy will lead to the same result. –  Simon Dec 17 '12 at 15:15

You can test the integer value if it's a solution also:

``````x = Math.floor(root1);
if(a*x*x+b*x+c == 0)
...
``````
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This answer deals with the ambiguity between two cases: an equation with a root that is almost exactly an integer, and an equation with an integer root that is only approximated by the original solution. However, I think it would be better to use Math.rint to deal with the case of an approximation to an integer solution that is slightly less than the solution. –  Patricia Shanahan Dec 17 '12 at 15:09
You can't have `²` in an identifier name. –  Peter Lawrey Dec 17 '12 at 15:11
I wrote it in peudo-code. –  manji Dec 17 '12 at 15:13

You can try as

``````Math.rint(d) == d
``````
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``````if ((variable == Math.floor(variable)) && !Double.isInfinite(variable)) {
// int
}
``````

If variable is equal to the Math.floor then its Integer. The infinite check is because its will not work for it.

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If you want an integer result use round as your error might mean the number is slightly too large or slightly too small.

``````long l = Math.round(value);
``````

To round to a fixed number of decimal places you can use

``````double d = Math.round(value * 1e6) / 1e6; // six decimal places.
``````
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the best way will be check whether `(Math.floor(root1)-root1)<=0.0000001` It will give you the correct output.