As I interpret it, MSDN's definition of numeric_limits::is_exactis almost always false:

[all] calculations done on [this] type are free of rounding errors.

And IBM's definition is almost always true: (Or a circular definition, depending on how you read it)

a type that has exact representations for all its values

What I'm certain of is that I could store a 2 in both a double and a long and they would both be represented exactly.

I could then divide them both by 10 and neither would hold the mathematical result exactly.

Given any numeric data type T, what is the correct way to define std::numeric_limits<T>::is_exact?

Edit: I've posted what I think is an accurate answer to this question from details supplied in many answers. This answer is not a contender for the bounty.

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    2 / 10 is stored exactly (for long) because the result of integer division is an integer. – GManNickG Jan 7 '13 at 20:42
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    @GManNickG Yah, and 2.0 / 10.0 is also stored exactly (for a double) because the result of double division is a double. 2/10 is not 0, except by special rules. – James Kanze Jan 7 '13 at 21:03
  • I would consider exact a numeric type for which x + y != x && x + y != y when x != 0 && y != 0 – K-ballo Jan 7 '13 at 22:25
  • It should have been ::is_exact_as_long_as_it_does_not_overflow_otherwise_could_trigger_undefined_behavior but the name was a bit too long – aka.nice Jan 7 '13 at 22:27
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    @aka.nice: No, unsigned types don't ever overflow, they wrap around. Their modulo arithmetic is mandated by the standard. – K-ballo Jan 7 '13 at 22:38

The definition in the standard (see NPE's answer) isn't very exact, is it? Instead, it's circular and vague.

Given that the IEC floating point standard has a concept of "inexact" numbers (and an inexact exception when a computation yields an inexact number), I suspect that this is the origin of the name is_exact. Note that of the standard types, is_exact is false only for float, double, and long double.

The intent is to indicate whether the type exactly represents all of the numbers of the underlying mathematical type. For integral types, the underlying mathematical type is some finite subset of the integers. Since each integral types exactly represents each and every one of the members of the subset of the integers targeted by that type, is_exact is true for all of the integral types. For floating point types, the underlying mathematical type is some finite range subset of the real numbers. (An example of a finite range subset is "all real numbers between 0 and 1".) There's no way to represent even a finite range subset of the reals exactly; almost all are uncomputable. The IEC/IEEE format makes matters even worse. With that format, computers can't even represent a finite range subset of the rational numbers exactly (let alone a finite range subset of the computable numbers).

I suspect that the origin of the term is_exact is the long-standing concept of "inexact" numbers in various floating point representation models. Perhaps a better name would have been is_complete.

The numeric types defined by the language aren't the be-all and end-all of representations of "numbers". A fixed point representation is essentially the integers, so they too would be exact (no holes in the representation). Representing the rationals as a pair of standard integral types (e.g., int/int) would not be exact, but a class that represented the rationals as a Bignum pair would, at least theoretically, be "exact".

What about the reals? There's no way to represent the reals exactly because almost all of the reals are not computable. The best we could possibly do with computers is the computable numbers. That would require representing a number as some algorithm. While this might be useful theoretically, from a practical standpoint, it's not that useful at all.

Second Addendum
The place to start is with the standard. Both C++03 and C++11 define is_exact as being

True if the type uses an exact representation.

That is both vague and circular. It's meaningless. Not quite so meaningless is that integer types (char, short, int, long, etc.) are "exact" by fiat:

All integer types are exact, ...

What about other arithmetic types? The first thing to note is that the only other arithmetic types are the floating point types float, double, and long double (3.9.1/8):

There are three floating point types: float, double, and long double. ... The value representation of floating-point types is implementation-defined. Integral and floating types are collectively called arithmetic types.

The meaning of the floating point types in C++ is markedly murky. Compare with Fortran:

A real datum is a processor approximation to the value of a real number.

Compare with ISO/IEC 10967-1, Language independent arithmetic (which the C++ standards reference in footnotes, but never as a normative reference):

A floating point type F shall be a finite subset of ℝ.

C++ on the other hand is moot with regard to what the floating point types are supposed to represent. As far as I can tell, an implementation could get away with making float a synonym for int, double a synonym for long, and long double a synonym for long long.

Once more from the standards on is_exact:

... but not all exact types are integer. For example, rational and fixed-exponent representations are exact but not integer.

This obviously doesn't apply to user-developed extensions for the simple reason that users are not allowed to define std::whatever<MyType>. Do that and you're invoking undefined behavior. This final clause can only pertain to implementations that

  • Define float, double, and long double in some peculiar way, or
  • Provide some non-standard rational or fixed point type as an arithmetic type and decide to provide a std::numeric_limits<non_standard_type> for these non-standard extensions.
  • Interesting. And possibly dead-on. Could you comment on rational and fixed-exponent being exact? Are int/int and int*2^k reasonable forms for an underlying mathematical type, while int*2^int is not? There seems to be an element of human interpretation in the definition, as if isnt_intimidating could have been just as appropriate. – Drew Dormann Jan 7 '13 at 22:57
  • The problem is: if you consider the underlying type of floating point reals, then you don't understand machine floating point. And of course, rationals suffer from the same problems as floating point, even if you consider the underlying type rational, and not real. – James Kanze Jan 7 '13 at 23:46
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    @DrewDormann - It depends on how one represents the rationals. A representation that uses pair of fixed length integers (e.g., a pair of int numbers) will suffer the same problems as do float and double. On the other hand, a representation that uses a pair of arbitrary length integers won't suffer those problems, at least not theoretically. (In practice it will. Memory is finite.) – David Hammen Jan 16 '13 at 21:19
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    Re “The intent is to indicate whether the type exactly represents all of the numbers of the underlying mathematical type.” If this were the meaning, is_exact would always be true. Per IEEE-754 and ISO/IEC 10967-1, a floating-point value is a single number. It does not represent an interval or any sort of fuzziness. What is_exact could indicate is whether operations always return exact results. On the face of it, this must always be false, since integer 7/3 returns result rounded down to the nearest integer. So is_exsct can have meaning only with some more complicated definition. – Eric Postpischil Jan 12 '18 at 14:13
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    I suspect the committee did not deliberate adequately over is_exact and has not given it a well defined meaning. To declare the integers to be exact, you have to define the / operator to be trunc(x / y) rather than the mathematical division x / y. But, if you allow that for the integers, then floating-point operations can be defined similarly: floating-point x/y is defined as the mathematical x / y rounded to the nearest representable value. So floating-point x/y is exact the same way integer x/y is exact. – Eric Postpischil Jan 12 '18 at 14:17

I suggest that is_exact is true iff all literals of that type have their exact value. So is_exact is false for the floating types because the value of literal 0.1 is not exactly 0.1.

Per Christian Rau's comment, we can instead define is_exact to be true when the results of the four arithmetic operations between any two values of the type are either out of range or can be represented exactly, using the definitions of the operations for that type (i.e., truncating integer division, unsigned wraparound). With this definition you can cavil that floating-point operations are defined to produce the nearest representable value. Don't :-)

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    But then again this is a mere result of the differences in bases between us humans and the computer. So a decimal floating point type would be exact because we don't specify floating point literals in binary format? – Christian Rau Jan 8 '13 at 16:22
  • I think I understand. So is_exact doesn't describe any aspect of the number format itself, it describes C++'s own decisions on how to type literals in that format. Because C++ describes doubles in base 10 instead of, e.g. m13e-6, doubles are not exact. Is that your meaning? – Drew Dormann Jan 8 '13 at 18:21
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    @Christian Rau - Well, maybe :-) Alternatively we can define is_exact as true for those types where the results of the four arithmetic operations between any pair of values of the type is either out of range or can be represented exactly (with the proviso that integer division is defined as giving integer result and unsigned arithmetic wraps). That's probably a better definition. – Hyman Rosen Jan 8 '13 at 20:53

The problem of exactnes is not restricted to C, so lets look further.

Germane dicussion about redaction of standards apart, inexact has to apply to mathematical operations that require rounding for representing the result with the same type. For example, Scheme has such kind of definition of exactness/inexactness by mean of exact operations and exact literal constants see R5RS §6. standard procedures from http://www.schemers.org/Documents/Standards/R5RS/HTML

For case of double x=0.1 we either consider that 0.1 is a well defined double literal, or as in Scheme, that the literal is an inexact constant formed by an inexact compile time operation (rounding to the nearest double the result of operation 1/10 which is well defined in Q). So we always end up on operations.

Let's concentrate on +, the others can be defined mathematically by mean of + and group property.

A possible definition of inexactness could then be:

If there exists any pair of values (a,b) of a type such that a+b-a-b != 0,
then this type is inexact (in the sense that + operation is inexact).

For every floating point representation we know of (trivial case of nan and inf apart) there obviously exist such pair, so we can tell that float (operations) are inexact.

For well defined unsigned arithmetic model, + is exact.

For signed int, we have the problem of UB in case of overflow, so no warranty of exactness... Unless we refine the rule to cope with this broken arithmetic model:

If there exists any pair (a,b) such that (a+b) is well defined
and a+b-a-b != 0,
then the + operation is inexact.

Above well definedness could help us extend to other operations as well, but it's not really necessary.
We would then have to consider the case of / as false polymorphism rather than inexactness
(/ being defined as the quotient of Euclidean division for int).

Of course, this is not an official rule, validity of this answer is limited to the effort of rational thinking


The definition given in the C++ standard seems fairly unambiguous:

static constexpr bool is_exact;

True if the type uses an exact representation. All integer types are exact, but not all exact types are integer. For example, rational and fixed-exponent representations are exact but not integer.

Meaningful for all specializations.

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    But what does an "exact representation" mean. All floating point values are an exact representation of the value they represent. And rational and fixed-exponent representations (not to mention integers) do not have an exact representation of pi. – James Kanze Jan 7 '13 at 21:05
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    @JamesKanze - All floating point values are an exact representation of the value they represent. No, they're not. Each floating point value represents an interval on the real number line, not a specific number. One point in that interval will have an exact representation. All of the others won't, and getting one of those inexact values will raise the IEEE inexact exception if that exception is enabled. – David Hammen Jan 7 '13 at 21:26
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    @JamesKanze - I understand machine floating point quite well. Your concept is one way to look at it, but it isn't the only way. Looking at the IEEE/IEC standard as representing intervals is essentially how Microsoft Excel looks at the things, hence their rounding. See stackoverflow.com/questions/6930786/… . – David Hammen Jan 8 '13 at 0:31
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    @Yakk The float types are not representations of R. One can also argue about whether int is a representation of Z, but as long as there is no overflow and no division, they are. Division is a problem, because Z isn't closed with regards to division: 1/3 is either 0.3333... or a domain error. But in no case 0; 0 can only be considered a rounding error. – James Kanze Jan 8 '13 at 8:40
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    @DavidHammen I would hardly take Excel as a reference (but I seriously doubt that it does interval arithmetic). An IEEE float value is an exact value; operations on it obey exact rules, and also result in an exact value (which isn't necessarily the same as it would be in arithmetic over R). Interval arithmetic is something completely different. – James Kanze Jan 8 '13 at 8:43

In C++ the int type is used to represent a mathematical integer type (i.e. one of the set of {..., -1, 0, 1, ...}). Due to the practical limitation of implementation, the language defines the minimum range of values that should be held by that type, and all valid values in that range must be represented without ambiguity on all known architectures.

The standard also defines types that are used to hold floating point numbers, each with their own range of valid values. What you won't find is the list of valid floating point numbers. Again, due to practical limitations the standard allows for approximations of these types. Many people try to say that only numbers that can be represented by the IEEE floating point standard are exact values for those types, but that's not part of the standard. Though it is true that the implementation of the language on binary computers has a standard for how double and float are represented, there is nothing in the language that says it has to be implemented on a binary computer. In other words float isn't defined by the IEEE standard, the IEEE standard is just an acceptable implementation. As such, if there were an implementation that could hold any value in the range of values that define double and float without rounding rules or estimation, you could say that is_exact is true for that platform.

Strictly speaking, T can't be your only argument to tell whether a type "is_exact", but we can infer some of the other arguments. Because you're probably using a binary computer with standard hardware and any publicly available C++ compiler, when you assign a double the value of .1 (which is in the acceptable range for the floating point types), that's not the number the computer will use in calculations with that variable. It uses the closest approximation as defined by the IEEE standard. Granted, if you compare a literal with itself your compiler should return true, because the IEEE standard is pretty explicit. We know that computers don't have infinite precision and therefore calculations that we expect to have a value of .1 won't necessarily end up with the same approximate representation that the literal value has. Enter the dreaded epsilon comparison.

To practically answer your question, I would say that for any type which requires an epsilon comparison to test for approximate equality, is_exact should return false. If strict comparison is sufficient for that type, it should return true.

  • Of course strict binary comparison can be sufficient for an "inexact" type, it all depends on the context. In the same way does an int also require epsilon comparison to test for approximate equality, which comes from the definition of approximate equality. If I want to compare if two ints are approximately equal up to a tolerance of 3, then, well, I have to use an epsilon comparision with an epsilon of 3. The fact that you don't regard 3 small enough to bear the name epsilon doesn't change its nature. – Christian Rau Jan 11 '13 at 9:08
  • Just because is_exact returns false doesn't mean that there are no exact values for that type. If your application can limit the values it holds to the values that are exact or doesn't perform any calculations with those values then feel free to use strict (bitwise) comparison, but I would consider that an optimization for your application. As for 3, I think you're conflating your application's epsilon with the type's epsilon – pelletjl Jan 11 '13 at 15:34
  • This is interesting. So unlike IEEE's well-defined standard, C++ defines double to encompass all real values in the allowed range. Even 0.1 is a valid double, by definition. And it's just my current hardware that happens to store that value inexactly. – Drew Dormann Jan 11 '13 at 17:04
  • @Drew: Actually, no floating-point format of finite size (such as double) can represent all real numbers in any range, for the set of all real numbers is infinitely large: even the set of all real numbers from 0 through 1 is infinitely large. That's because real numbers can include rational numbers with trillions of digits in the numerators and denominators, and irrational numbers such as pi, and the square root of two, that can only be approximated by rational numbers. – Peter O. Jan 11 '13 at 22:01
  • @PeterO. I don't think anyone disagrees with that. :-) – Drew Dormann Jan 12 '13 at 18:47

std::numeric_limits<T>::is_exact should be false if and only if T's definition allows values that may be unstorable.

C++ considers any floating point literal to be a valid value for its type. And implementations are allowed to decide which values have exact stored representation.

So for every real number in the allowed range (such as 2.0 or 0.2), C++ always promises that the number is a valid double and never promises that the value can be stored exactly.

This means that two assumptions made in the question - while true for the ubiquitous IEEE floating point standard - are incorrect for the C++ definition:

I'm certain that I could store a 2 in a double exactly.

I could then divide [it] by 10 and [the double would not] hold the mathematical result exactly.

  • Or, IBM's definition is viable if "representation" means "stored, not written" and "value" means "written, not stored". – Drew Dormann Jan 12 '13 at 20:21
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    Sounds like a good answer, if you could show me where "C++ considers any floating point literal to be a valid value for its type" (I'm sure this holds, but then again, I was also sure to know what is_exact means ;)) – Christian Rau Jan 16 '13 at 22:15
  • @ChristianRau I'll hunt down the standard blurb...It was statement by omission. The standard defined the types float, double, and long double (as "real"). It also defined the written notation. It then said very little about the storage. Since the types are defined and the storage is not, the types are not defined in terms of their storage. You could consider valid either all "real numbers" or what can be written. I took the conservative choice. – Drew Dormann Jan 17 '13 at 15:39

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