# How should I do floating point comparison?

I'm currently writing some code where I have something along the lines of:

``````double a = SomeCalculation1();
double b = SomeCalculation2();

if (a < b)
DoSomething2();
else if (a > b)
DoSomething3();
``````

And then in other places I may need to do equality:

``````double a = SomeCalculation3();
double b = SomeCalculation4();

if (a == 0.0)
DoSomethingUseful(1 / a);
if (b == 0.0)
return 0; // or something else here
``````

In short, I have lots of floating point math going on and I need to do various comparisons for conditions. I can't convert it to integer math because such a thing is meaningless in this context.

I've read before that floating point comparisons can be unreliable, since you can have things like this going on:

``````double a = 1.0 / 3.0;
double b = a + a + a;
if ((3 * a) != b)
Console.WriteLine("Oh no!");
``````

In short, I'd like to know: How can I reliably compare floating point numbers (less than, greater than, equality)?

The number range I am using is roughly from 10E-14 to 10E6, so I do need to work with small numbers as well as large.

I've tagged this as language agnostic because I'm interested in how I can accomplish this no matter what language I'm using.

• There is no way to do this reliably when using floating point numbers. There will always be numbers that for the computer are equal though in reality are not (say 1E+100, 1E+100+1), and you will also usually have calculation results that to the computer are not equal though in reality are (see one of the comments to nelhage's answer). You will have to choose which of the two you desire less. – toochin Feb 6 '11 at 20:21
• On the other hand, if you, say, only deal with rational numbers, you might implement some rational number arithmetic based on integer numbers and then two numbers are considered equal if one of the two numbers can be cancelled down to the other one. – toochin Feb 6 '11 at 20:24
• Well, currently I'm working a simulation. The place I'm usually doing these comparisons is related to variable time steps (for solving some ode). There's a few instances where I need to check if the given time step for one object is equal to, less than, or greater than another object's time step. – Mike Bailey Feb 6 '11 at 20:27
• Why don't using arrays? stackoverflow.com/questions/28318610/… – Adrian P. Jun 13 '16 at 17:14

Comparing for greater/smaller is not really a problem unless you're working right at the edge of the float/double precision limit.

For a "fuzzy equals" comparison, this (Java code, should be easy to adapt) is what I came up with for The Floating-Point Guide after a lot of work and taking into account lots of criticism:

``````public static boolean nearlyEqual(float a, float b, float epsilon) {
final float absA = Math.abs(a);
final float absB = Math.abs(b);
final float diff = Math.abs(a - b);

if (a == b) { // shortcut, handles infinities
return true;
} else if (a == 0 || b == 0 || diff < Float.MIN_NORMAL) {
// a or b is zero or both are extremely close to it
// relative error is less meaningful here
return diff < (epsilon * Float.MIN_NORMAL);
} else { // use relative error
return diff / (absA + absB) < epsilon;
}
}
``````

It comes with a test suite. You should immediately dismiss any solution that doesn't, because it is virtually guaranteed to fail in some edge cases like having one value 0, two very small values opposite of zero, or infinities.

An alternative (see link above for more details) is to convert the floats' bit patterns to integer and accept everything within a fixed integer distance.

In any case, there probably isn't any solution that is perfect for all applications. Ideally, you'd develop/adapt your own with a test suite covering your actual use cases.

• @toochin: depends on how large a margin of error you want to allow for, but it becomes most obviously a problem when you consider the denormalized number closest to zero, positive and negative - apart from zero, these are closer together than any other two values, yet many naive implementations based on relative error will consider them to be too far apart. – Michael Borgwardt Feb 6 '11 at 20:53
• Hmm. You have a test `else if (a * b == 0)`, but then your comment on the same line is `a or b or both are zero`. But aren't these two different things? E.g., if `a == 1e-162` and `b == 2e-162` then the condition `a * b == 0` will be true. – Mark Dickinson Feb 7 '11 at 7:53
• @toochin: mainly because the code is supposed to be easily portable to other languages which may not have that functionality (it was added to Java only in 1.5 as well). – Michael Borgwardt Feb 8 '11 at 8:56
• If that function is used very much (every frame of a video game for example) I'd rewrite it in assembly with epic optimizations. – user142019 Nov 9 '11 at 9:47
• Great guide and great answer, especially considering the `abs(a-b)<eps` answers here. Two questions: (1) Wouldn't it be better to change all `<`s to `<=`s, thus allowing "zero-eps" comparisons, equivalent to exact comparisons? (2) Wouldn't it be better to use `diff < epsilon * (absA + absB);` instead of `diff / (absA + absB) < epsilon;` (last line) -- ? – Franz D. Mar 5 '15 at 0:45

I had the problem of Comparing floating point numbers `A < B` and `A > B` Here is what seems to work:

``````if(A - B < Epsilon) && (fabs(A-B) > Epsilon)
{
printf("A is less than B");
}

if (A - B > Epsilon) && (fabs(A-B) > Epsilon)
{
printf("A is greater than B");
}
``````

The fabs--absolute value-- takes care of if they are essentially equal.

# TL;DR

• Use the following function instead of the currently accepted solution to avoid some undesirable results in certain limit cases, while being potentially more efficient.
• Know the expected imprecision you have on your numbers and feed them accordingly in the comparison function.
``````bool nearly_equal(
float a, float b,
float epsilon = 128 * FLT_EPSILON, float relth = FLT_MIN)
// those defaults are arbitrary and could be removed
{
assert(std::numeric_limits<float>::epsilon() <= epsilon);
assert(epsilon < 1.f);

if (a == b) return true;

auto diff = std::abs(a-b);
auto norm = std::min((std::abs(a) + std::abs(b)), std::numeric_limits<float>::max());
return diff < std::max(relth, epsilon * norm);
}
``````

When comparing floating point numbers, there are two "modes".

The first one is the relative mode, where the difference between `x` and `y` is considered relatively to their amplitude `|x| + |y|`. When plot in 2D, it gives the following profile, where green means equality of `x` and `y`. (I took an `epsilon` of 0.5 for illustration purposes). The relative mode is what is used for "normal" or "large enough" floating points values. (More on that later).

The second one is an absolute mode, when we simply compare their difference to a fixed number. It gives the following profile (again with an `epsilon` of 0.5 and a `relth` of 1 for illustration). This absolute mode of comparison is what is used for "tiny" floating point values.

Now the question is, how do we stitch together those two response patterns.

In Michael Borgwardt's answer, the switch is based on the value of `diff`, which should be below `relth` (`Float.MIN_NORMAL` in his answer). This switch zone is shown as hatched in the graph below. Because `relth * epsilon` is smaller that `relth`, the green patches do not stick together, which in turn gives the solution a bad property: we can find triplets of numbers such that `x < y_1 < y_2` and yet `x == y2` but `x != y1`. Take this striking example:

``````x  = 4.9303807e-32
y1 = 4.930381e-32
y2 = 4.9309825e-32
``````

We have `x < y1 < y2`, and in fact `y2 - x` is more than 2000 times larger than `y1 - x`. And yet with the current solution,

``````nearlyEqual(x, y1, 1e-4) == False
nearlyEqual(x, y2, 1e-4) == True
``````

By contrast, in the solution proposed above, the switch zone is based on the value of `|x| + |y|`, which is represented by the hatched square below. It ensures that both zones connects gracefully. Also, the code above does not have branching, which could be more efficient. Consider that operations such as `max` and `abs`, which a priori needs branching, often have dedicated assembly instructions. For this reason, I think this approach is superior to another solution that would be to fix Michael's `nearlyEqual` by changing the switch from `diff < relth` to `diff < eps * relth`, which would then produce essentially the same response pattern.

## Where to switch between relative and absolute comparison?

The switch between those modes is made around `relth`, which is taken as `FLT_MIN` in the accepted answer. This choice means that the representation of `float32` is what limits the precision of our floating point numbers.

This does not always make sense. For example, if the numbers you compare are the results of a subtraction, perhaps something in the range of `FLT_EPSILON` makes more sense. If they are squared roots of subtracted numbers, the numerical imprecision could be even higher.

It is rather obvious when you consider comparing a floating point with `0`. Here, any relative comparison will fail, because `|x - 0| / (|x| + 0) = 1`. So the comparison needs to switch to absolute mode when `x` is on the order of the imprecision of your computation -- and rarely is it as low as `FLT_MIN`.

This is the reason for the introduction of the `relth` parameter above.

Also, by not multiplying `relth` with `epsilon`, the interpretation of this parameter is simple and correspond to the level of numerical precision that we expect on those numbers.

# Mathematical rumbling

(kept here mostly for my own pleasure)

More generally I assume that a well-behaved floating point comparison operator `=~` should have some basic properties.

The following are rather obvious:

• self-equality: `a =~ a`
• symmetry: `a =~ b` implies `b =~ a`
• invariance by opposition: `a =~ b` implies `-a =~ -b`

(We don't have `a =~ b` and `b =~ c` implies `a =~ c`, `=~` is not an equivalence relationship).

I would add the following properties that are more specific to floating point comparisons

• if `a < b < c`, then `a =~ c` implies `a =~ b` (closer values should also be equal)
• if `a, b, m >= 0` then `a =~ b` implies `a + m =~ b + m` (larger values with the same difference should also be equal)
• if `0 <= λ < 1` then `a =~ b` implies `λa =~ λb` (perhaps less obvious to argument for).

Those properties already give strong constrains on possible near-equality functions. The function proposed above verifies them. Perhaps one or several otherwise obvious properties are missing.

When one think of `=~` as a family of equality relationship `=~[Ɛ,t]` parameterized by `Ɛ` and `relth`, one could also add

• if `Ɛ1 < Ɛ2` then `a =~[Ɛ1,t] b` implies `a =~[Ɛ2,t] b` (equality for a given tolerance implies equality at a higher tolerance)
• if `t1 < t2` then `a =~[Ɛ,t1] b` implies `a =~[Ɛ,t2] b` (equality for a given imprecision implies equality at a higher imprecision)

The proposed solution also verifies these.

We have to choose a tolerance level to compare float numbers. For example,

``````final float TOLERANCE = 0.00001;
if (Math.abs(f1 - f2) < TOLERANCE)
Console.WriteLine("Oh yes!");
``````

One note. Your example is rather funny.

``````double a = 1.0 / 3.0;
double b = a + a + a;
if (a != b)
Console.WriteLine("Oh no!");
``````

Some maths here

``````a = 1/3
b = 1/3 + 1/3 + 1/3 = 1.

1/3 != 1
``````

Oh, yes..

Do you mean

``````if (b != 1)
Console.WriteLine("Oh no!")
``````

Idea I had for floating point comparison in swift

``````infix operator ~= {}

func ~= (a: Float, b: Float) -> Bool {
return fabsf(a - b) < Float(FLT_EPSILON)
}

func ~= (a: CGFloat, b: CGFloat) -> Bool {
return fabs(a - b) < CGFloat(FLT_EPSILON)
}

func ~= (a: Double, b: Double) -> Bool {
return fabs(a - b) < Double(FLT_EPSILON)
}
``````

``````class Comparison
{
const MIN_NORMAL = 1.17549435E-38;  //from Java Specs

// from http://floating-point-gui.de/errors/comparison/
public function nearlyEqual(\$a, \$b, \$epsilon = 0.000001)
{
\$absA = abs(\$a);
\$absB = abs(\$b);
\$diff = abs(\$a - \$b);

if (\$a == \$b) {
return true;
} else {
if (\$a == 0 || \$b == 0 || \$diff < self::MIN_NORMAL) {
return \$diff < (\$epsilon * self::MIN_NORMAL);
} else {
return \$diff / (\$absA + \$absB) < \$epsilon;
}
}
}
}
``````

I tried writing an equality function with the above comments in mind. Here's what I came up with:

Edit: Change from Math.Max(a, b) to Math.Max(Math.Abs(a), Math.Abs(b))

``````static bool fpEqual(double a, double b)
{
double diff = Math.Abs(a - b);
double epsilon = Math.Max(Math.Abs(a), Math.Abs(b)) * Double.Epsilon;
return (diff < epsilon);
}
``````

Thoughts? I still need to work out a greater than, and a less than as well.

• `epsilon` should be `Math.abs(Math.Max(a, b)) * Double.Epsilon;`, or it will always be smaller than `diff` for negative `a` and `b`. And I think your `epsilon` is too small, the function might not return anything different from the `==` operator. Greater than is `a < b && !fpEqual(a,b)`. – toochin Feb 6 '11 at 20:30
• Fails when both values are exactly zero, fails for Double.Epsilon and -Double.Epsilon, fails for infinities. – Michael Borgwardt Feb 6 '11 at 20:38
• The case of infinities isn't a concern in my particular application, but is duely noted. – Mike Bailey Feb 6 '11 at 21:18

You should ask yourself why you are comparing the numbers. If you know the purpose of the comparison then you should also know the required accuracy of your numbers. That is different in each situation and each application context. But in pretty much all practical cases there is a required absolute accuracy. It is only very seldom that a relative accuracy is applicable.

To give an example: if your goal is to draw a graph on the screen, then you likely want floating point values to compare equal if they map to the same pixel on the screen. If the size of your screen is 1000 pixels, and your numbers are in the 1e6 range, then you likely will want 100 to compare equal to 200.

Given the required absolute accuracy, then the algorithm becomes:

``````public static ComparisonResult compare(float a, float b, float accuracy)
{
if (isnan(a) || isnan(b))   // if NaN needs to be supported
return UNORDERED;
if (a == b)                 // short-cut and takes care of infinities
return EQUAL;
if (abs(a-b) < accuracy)    // comparison wrt. the accuracy
return EQUAL;
if (a < b)                  // larger / smaller
return SMALLER;
else
return LARGER;
}
``````

You need to take into account that the truncation error is a relative one. Two numbers are about equal if their difference is about as large as their ulp (Unit in the last place).

However, if you do floating point calculations, your error potential goes up with every operation (esp. careful with subtractions!), so your error tolerance needs to increase accordingly.

The standard advice is to use some small "epsilon" value (chosen depending on your application, probably), and consider floats that are within epsilon of each other to be equal. e.g. something like

``````#define EPSILON 0.00000001

if ((a - b) < EPSILON && (b - a) < EPSILON) {
printf("a and b are about equal\n");
}
``````

A more complete answer is complicated, because floating point error is extremely subtle and confusing to reason about. If you really care about equality in any precise sense, you're probably seeking a solution that doesn't involve floating point.

• What if he is working with really small floating point numbers, like 2.3E-15 ? – toochin Feb 6 '11 at 19:30
• I'm working with a range of roughly [10E-14, 10E6], not quite machine epsilon but very close to it. – Mike Bailey Feb 6 '11 at 19:40
• Working with small numbers is not a problem if you keep in mind that you have to work with relative errors. If you don't care about relatively large error tolerances, the above would be OK if you'd replace it the condition with something like `if ((a - b) < EPSILON/a && (b - a) < EPSILON/a)` – toochin Feb 6 '11 at 19:46
• The code given above is also problematic when you deal with very large numbers `c`, because once your number is large enough, the EPSILON will be smaller than the machine precision of `c`. E.g. suppose `c = 1E+22; d=c/3; e=d+d+d;`. Then `e-c` may well be considerably greater than 1. – toochin Feb 6 '11 at 19:54
• For examples, try `double a = pow(8,20); double b = a/7; double c = b+b+b+b+b+b+b; std::cout<<std::scientific<<a-c;` (a and c not equal according to pnt and nelhage), or `double a = pow(10,-14); double b = a/2; std::cout<<std::scientific<<a-b;` (a and b equal according to pnt and nelhage) – toochin Feb 6 '11 at 20:15

The best way to compare doubles for equality/inequality is by taking the absolute value of their difference and comparing it to a small enough (depending on your context) value.

``````double eps = 0.000000001; //for instance

double a = someCalc1();
double b = someCalc2();

double diff = Math.abs(a - b);
if (diff < eps) {
//equal
}
``````