How dangerous is it to compare floating point values?

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I know UIKit uses CGFloat because of the resolution independent coordinate system.

But every time I want to check if for example `frame.origin.x` is `0` it makes me feel sick:

``````if (theView.frame.origin.x == 0) {
// do important operation
}
``````

Isn't CGFloat vulnerable to false positives when comparing with `==`, `<=`, `>=`, `<`, `>`? It is a floating point and they have unprecision problems: `0.0000000000041` for example.

Is Objective-C handling this internally when comparing or can it happen that a `origin.x` which reads as zero does not compare to `0` as true?

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Depends on the problem domain, no? – Kris Krause Apr 26 '12 at 13:53
Problem domain simple: If theView.frame.origin.x == 0 is FALSE while theView.frame.origin.x is supposed to be 0 but is 0.0000000031, then big problem. boom. – Proud Member Apr 26 '12 at 14:42
@MikhaloIvanokov Good news then! If `theView.frame.origin.x` is a binary floating-point number, its value will never be 0.0000000031. – Pascal Cuoq Apr 26 '12 at 15:06
What do you mean by binary floating point number? – Proud Member Apr 27 '12 at 11:02
He means to nitpick. More info at en.wikipedia.org/wiki/IEEE_754-2008 – Johnny May 14 '12 at 14:12

First of all, floating point values are not "random" in their behavior. Exact comparison can and does make sense in plenty of real-world usages. But if you're going to use floating point you need to be aware of how it works. Erring on the side of assuming floating point works like real numbers will get you code that quickly breaks. Erring on the side of assuming floating point results have large random fuzz associated with them (like most of the answers here suggest) will get you code that appears to work at first but ends up having large-magnitude errors and broken corner cases.

First of all, if you want to program with floating point, you should read this:

What Every Computer Scientist Should Know About Floating-Point Arithmetic

Yes, read all of it. If that's too much of a burden, you should use integers/fixed point for your calculations until you have time to read it. :-)

Now, with that said, the biggest issues with exact floating point comparisons come down to:

1. The fact that lots of values you may write in the source, or read in with `scanf` or `strtod`, do not exist as floating point values and get silently converted to the nearest approximation. This is what demon9733's answer was talking about.

2. The fact that many results get rounded due to not having enough precision to represent the actual result. An easy example where you can see this is adding `x = 0x1fffffe` and `y = 1` as floats. Here, `x` has 24 bits of precision in the mantissa (ok) and `y` has just 1 bit, but when you add them, their bits are not in overlapping places, and the result would need 25 bits of precision. Instead, it gets rounded (to 0x2000000` in the default rounding mode).

3. The fact that many results get rounded due to needing infinitely many places for the correct value. This includes both rational results like 1/3 (which you're familiar with from decimal where it takes infinitely many places) but also 1/10 (which also takes infinitely many places in binary, since 5 is not a power of 2), as well as irrational results like the square root of anything that's not a perfect square.

4. Double rounding. On some systems (particularly x86), floating point expressions are evaluated in higher precision than their nominal types. This means that when one of the above types of rounding happens, you'll get two rounding steps, first a rounding of the result to the higher-precision type, then a rounding to the final type. As an example, consider what happens in decimal if you round 1.49 to an integer (1), versus what happens if you first round it to one decimal place (1.5) then round that result to an integer (2). This is actually one of the nastiest areas to deal with in floating point, since the behavior of the compiler (especially for buggy, non-conformant compilers like GCC) is unpredictable.

5. Transcendental functions (trig, exp, log, etc.) are not specified to have correctly rounded results; the result is just specified to be correct within one unit in the last place of precision (usually referred to as 1ulp).

When you're writing floating point code, you need to keep in mind what you're doing with the numbers that could cause the results to be inexact, and make comparisons accordingly. Often times it will make sense to compare with an "epsilon", but that epsilon should be based on the magnitude of the numbers you are comparing, not an absolute constant. (In cases where an absolute constant epsilon would work, that's strongly indicative that fixed point, not floating point, is the right tool for the job!)

Edit: In particular, a magnitude-relative epsilon check should look something like:

``````if (fabs(x-y) < K * FLT_EPSILON * fabs(x+y))
``````

Where `FLT_EPSILON` is the constant from `float.h` (replace it with `DBL_EPSILON` for doubles or `LDBL_EPSILON` for long doubles) and `K` is a constant you choose such that the accumulated error of your computations is definitely bounded by `K` units in the last place (and if you're not sure you got the error bound calculation right, make `K` a few times bigger than what your calculations say it should be).

Finally, note that if you use this, some special care may be needed near zero, since `FLT_EPSILON` does not make sense for denormals. A quick fix would be to make it:

``````if (fabs(x-y) < K * FLT_EPSILON * fabs(x+y) || fabs(x-y) < FLT_MIN)
``````

and likewise substitute `DBL_MIN` if using doubles.

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`fabs(x+y)` is problematic if `x` and `y` (can) have different sign. Still, a good answer against the tide of cargo-cult comparisons. – Daniel Fischer Apr 26 '12 at 15:20
If `x` and `y` have different sign, it's no problem. The righthand side will be "too small", but since `x` and `y` have different sign, they should not compare equal anyway. (Unless they are so small as to be denormal, but then the second case catches it) – R.. Apr 26 '12 at 15:41
@yms: Maybe it was a little too harsh, but to borrow Daniel's choice of words, there's a huge amount of cargo-culting going on in the answers to this question as is usual among floating point questions. I don't think it's helpful to answer questions about a topic you don't understand with cargo-cult answers, and in fact most of the answers here are probably deserving of downvotes for that very reason, but I specifically stated that I'm not doing it lest I be accused of being one of the downvoters if/when they get downvoted. – R.. Apr 26 '12 at 15:44
-1: please downvote my answer and explain what's wrong.. or else we'll do the same errors over and over... – duedl0r Apr 26 '12 at 19:24
I just discovered gcc beginning somewhere in the 4.5 or 4.6 series has an option `-fexcess-precision=standard`, enabled by default with `-std=c99` or `-std=c11`, that behaves like `-ffloat-store` but also handles casts, and disables the incorrect `sqrt` optimization. With these fixes, GCC's floating point on x86 seems very close to being IEEE conformant now. By default it's still badly broken, but hopefully good programs will use `-std=c99`. (Also note `-std=gnu99` does not fix it.) – R.. Apr 27 '12 at 12:09

Since 0 is exactly representable as an IEEE754 floating-point number (or using any other implementation of f-p numbers I've ever worked with) comparison with 0 is probably safe. You might get bitten, however, if your program computes a value (such as `theView.frame.origin.x`) which you have reason to believe ought to be 0 but which your computation cannot guarantee to be 0.

To clarify a little, a computation such as :

``````areal = 0.0
``````

will (unless your language or system is broken) create a value such that (areal==0.0) returns true but another computation such as

``````areal = 1.30 - 2*(0.65)
``````

may not.

If you can assure yourself that your computations produce values which are 0 (and not just that they produce values which ought to be 0) then you can go ahead and compare f-p values with 0. If you can't assure yourself to the required degree, best stick to the usual approach of 'toleranced equality'.

In the worst cases the careless comparison of f-p values can be extremely dangerous: think avionics, weapons-guidance, power-plant operations, vehicle navigation, almost any application in which computation meets the real world.

For Angry Birds, not so dangerous.

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Re: Angry Birds: Financially, a bug the stops 10 million gamers from squishing the Pigs could have repurcussions. – Almo Apr 26 '12 at 14:12

I don't think a library/language can do that automatically. You should always compare it with a certain epsilon `ɛ`. For example `|theView.frame.origin.x| < eps` or `|x0 - x1| < eps` if you want to check whether `x0 == x1`.

Since epsilon depends on your application, a library/language can't guess a "correct" value.

Maybe objective-c does something very clever, I don't know, I don't use it.. [apparently it doesn't (@JustSid)]

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Not only that, but it would be Just Plain Wrong for a language or library to do that, because then '0' would no longer mean '0'. – mickeyf Apr 26 '12 at 13:50
To answer the last bit: No, Objective-C does nothing clever to solve this. – JustSid Apr 26 '12 at 13:52
@mickeyf: Yes you're absolutely right. Maybe if you have a better precision (only for internal use) and an eps which is very small but 0 for external use, you might can argue about 0 being 0 :) – duedl0r Apr 26 '12 at 13:57
I won't downvote, but see Romain's comment on GoZoner's answer. Fixed epsilons independent of some other scale factor are almost always a mistake. And if your numbers are all on a particular scale factor, you should probably either use fixed point instead of floating point, or bias them by a large number that fixes the precision, so that you don't have more precision in parts of your space than in others... – R.. Apr 27 '12 at 0:32
By the way, a great example of precision varying with the part of the space you're working in - I used to work on the MPlayer project, and we were using `float` for timestamps. This worked fine until somebody decided to load a video file whose duration was measured in days or weeks, and representing 1/30 of a second was no longer possible... I think it was eventually changed to use `double`. – R.. Apr 27 '12 at 0:34

Comparing to zero can be a safe operation, as long as the zero wasn't a calculated value (as noted in an above answer). The reason for this is that zero is a perfectly representable number in floating point.

Talking perfectly representable values, you get 24 bits of range in a power-of-two notion (single precision). So 1, 2, 4 are perfectly representable, as are .5, .25, and .125. As long as all your important bits are in 24-bits, you are golden. So 10.625 can be repsented precisely.

This is great, but will quickly fall apart under pressure. Two scenarios spring to mind: 1) When a calculation is involved. Don't trust that sqrt(3)*sqrt(3) == 3. It just won't be that way. And it probably won't be within an epsilon, as some of the other answers suggest. 2) When any non-power-of-2 (NPOT) is involved. So it may sound odd, but 0.1 is an infinite series in binary and therefore any calculation involving a number like this will be imprecise from the start.

(Oh and the original question mentioned comparisons to zero. Don't forget that -0.0 is also a perfectly valid floating-point value.)

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I want to give a bit of a different answer than the others. They are great for answering your question as stated but probably not for what you need to know or what your real problem is.

Floating point in graphics is fine! But there is almost no need to ever compare floats directly. Why would you need to do that? Graphics uses floats to define intervals. And comparing if a float is within an interval also defined by floats is always well defined and merely needs to be consistent, not accurate or precise! As long as a pixel (which is also an interval!) can be assigned that's all graphics needs.

So if you want to test if your point is outside a [0..width[ range this is just fine. Just make sure you define inclusion consistently. For example always define inside is (x>=0 && x < width). The same goes for intersection or hit tests.

However, if you are abusing a graphics coordinate as some kind of flag, like for example to see if a window is docked or not, you should not do this. Use a boolean flag that is separate from the graphics presentation layer instead.

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There'll be lots of examples in this answer, here's mine:

``````#define float_epsilon 0.00001;
#define float_equal(a,b) (fabs((a) - (b)) < float_epsilon)
``````

Here's some more.

The short answer, relevant to your usage, is there's 0, -0, and +0 in a float, plus rounding errors and non-linear stepping. Just to make things more confusing there are only two encodings for zero in some bit-saving standards.

Explaining decimal coding isn't straight forward, but I can try. Unlike an unsigned integer, a float conceptually comprises of a `whole number`, `radix point` and `decimal component`. The actual values of these are derived from a function that partions the bits of a float into two: an `exponent` and `significand`.

If the only thing you take away from this is the need for decimals to encode for 'quite a lot' - including something heading to infinity. For example, a float might encode for the entire range 0.0 to almost 1.0, and for a high precision (ie: 0.30000004), yet there are only so many bits available to the `exponent` and `significand`.

The trade off is to have a limited range and fixed precision. The math which picks apart the whole number and decimal introduces errors. I suggest you read what every computer scientist should know about floating point arithmetic. - although it's a bit spicy, so there's always this answer.

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I used to think this, but I've been corrected by other answers to this question. Imagine a simple floating point system which stores three significant decimal figures, and then try to use the macro in this answer with epsilon = 0.1. With rounding errors in the last significant figure, we have `float_equal(1.23, 1.24)`, 0.01 < 0.1, so they are roughly equal, which is good. But if the floating point moves, then `float_equal(123, 124)`, gives 1 < 0.1, which is false. So, a fixed point epsilon can't account for rounding errors in a floating point number. See a fix for this in R..'s answer. – Douglas May 13 '12 at 23:48
Worse, look at what happens when trying to compare small numbers: `float_equal(0.000222, 0.000333)`, which gives `0.000111 < 0.1`. All numbers smaller than a fixed epsilon compare equal, regardless of how many significant figures are stored in the floating point number. – Douglas May 13 '12 at 23:55

There's a series of posts from Bruce Dawson posted on AltDevBlogADay explaining a lot of issues using floating point numbers. Very useful information, there's some valuable tips there which can help one using or trying to understand better how floating numbers works.

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The last time I checked the C standard, there was no requirement for floating point operations on doubles (64 bits total, 53 bit mantissa) to be accurate to more than that precision. However, some hardware might do the operations in registers of greater precision, and the requirement was interpreted to mean no requirement to clear lower order bits (beyond the precision of the numbers being loaded into the registers). So you could get unexpected results of comparisons like this depending on what was left over in the registers from whoever slept there last.

That said, and despite my efforts to expunge it whenever I see it, the outfit where I work has lots of C code that is compiled using gcc and run on linux, and we have not noticed any of these unexpected results in a very long time. I have no idea whether this is because gcc is clearing the low-order bits for us, the 80-bit registers are not used for these operations on modern computers, the standard has been changed, or what. I'd like to know if anyone can quote chapter and verse.

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The correct question: how does one compare points in Cocoa Touch?

A different question: Are two calculated values are the same?

The answer posted here: They are not.

How to check if they are close? If you want to check if they are close, then don't use CGPointEqualToPoint(). But, don't check to see if they are close. Do something that makes sense in the real world, like checking to see if a point is beyond a line or if a point is inside a sphere.

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Precisely because of round errors, you should not use comparison of 'exact' values for logical operations. In your specific case of a position on a visual display, it can't possibly matter if the position is 0.0 or 0.0000000003 - the difference is invisible to the eye. So your logic should be something like:

``````#define VISIBLE_SHIFT    0.0001        // for example
if (fabs(theView.frame.origin.x) < VISIBLE_SHIFT) { /* ... */ }
``````
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One aspect of resolution-independence is that you cannot tell for sure what a "visible shift" is at compile-time. What is invisible on a super-HD screen might very well be obvious on a tiny-ass screen. One should at least make it a function of screen size. Or name it something else. – Romain Apr 26 '12 at 13:53
should be fabs? – Matt Melton Apr 26 '12 at 14:13
In spite of the down votes, the up-voted comment and the fancy, wordy answer 'if (fabs(x-y) < K * FLT_EPSILON * fabs(x+y))', I still got it right. Note the '// for example' code comment when setting the 'VISIBLE_SHIFT' parameter. – GoZoner May 14 '12 at 15:14

I'd say the right thing is to declare each number as an object, and then define three things in that object: 1) an equality operator. 2) a setAcceptableDifference method. 3)the value itself. The equality operator returns true if the absolute difference of two values is less than the value set as acceptable.

You can subclass the object to suit the problem. For example, round bars of metal between 1 and 2 inches might be considered of equal diameter if their diameters differed by less than 0.0001 inches. So you'd call setAcceptableDifference with parameter 0.0001, and then use the equality operator with confidence.

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This is Not A Good Answer. First, the whole "object thing" does nothing whatsoever to solve your issue. And second, your actual implementation of "equality" isn't in fact the correct one. – Tom Swirly May 14 '12 at 18:53
Tom, maybe you'd think again about the "object thing". With real numbers, represented to high precision, equality rarely happens. But one's idea of equality may be tailored if it suits you. It would be nicer if there was an overridable 'approximately equal' operator, but there ain't. – John White Aug 16 '12 at 17:53

Here you can use the following functions to perform doubles comparison:

``````// check if double a is less than double b.
bool
isLessThan (const double a, const double b) {
return (b - a) > ((fabs (a) < fabs (b) ? fabs (b) : fabs (a)) *
std::numeric_limits<double>::epsilon ());
}

// check if double a is greater than double b.
bool
isGreaterThan (const double a, const double b) {
return (a - b) > ((fabs (a) < fabs (b) ? fabs (b) : fabs (a)) *
std::numeric_limits<double>::epsilon ());
}

// check if double a is approximately equal to double b.
bool
isApproximatelyEqual (const double a, const double b) {
return fabs (a - b) <= ((fabs (a) < fabs (b) ? fabs (b) : fabs (a)) *
std::numeric_limits<double>::epsilon ());
}

// check if double a is essentially equal to double b.
bool
isEssentiallyEqual(const double a, const double b) {
return fabs (a - b) <= ((fabs (a) > fabs (b) ? fabs (b) : fabs (a)) *
std::numeric_limits<double>::epsilon ());
}
``````
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Without those comments, who would know that "isGreaterThan(const double a, const double b)" would "check if double a is greater than double b"? – niXar May 14 '12 at 8:31
You can test it :) – Efstathios Chatzikyriakidis Mar 4 at 20:50

protected by MysticialMay 14 '12 at 5:39

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