By my reading of the C++ Standard, I have always understood that the sizes of the integral fundamental types in C++ were as follows:

sizeof(char) <= sizeof(short int) <= sizeof(int) <= sizeof(long int)

I deduced this from 3.9.1/2:

  1. There are four signed integer types: “signed char”, “short int”, “int”, and “long int.” In this list, each type provides at least as much storage as those preceding it in the list. Plain ints have the natural size suggested by the architecture of the execution environment

Further, the size of char is described by 3.9.1/ as being:

  1. [...] large enough to store any member of the implementation’s basic character set.

1.7/1 defines this in more concrete terms:

  1. The fundamental storage unit in the C + + memory model is the byte. A byte is at least large enough to contain any member of the basic execution character set and is composed of a contiguous sequence of bits, the number of which is implementation-defined.

This leads me to the following conclusion:

1 == sizeof(char) <= sizeof(short int) <= sizeof(int) <= sizeof(long int)

where sizeof tells us how many bytes the type is. Furthermore, it is implementation-defined how many bits are in a byte. Most of us are probably used to dealing with 8-bit bytes, but the Standard says there are n bits in a byte.

In this post, Alf P. Steinbach says:

long is guaranteed (at least) 32 bits.

This flies in the face of everything I understand the size of the fundamental types to be in C++ according to the Standard. Normally I would just discount this statement as a beginner being wrong, but since this was Alf I decided it was worth investigating further.

So, what say you? Is a long guaranteed by the standard to be at least 32 bits? If so, please be specific as to how this guarantee is made. I just don't see it.

  1. The C++ Standard specifically says that in order to know C++ you must know C (1.2/1) 1

  2. The C++ Standard implicitly defines the minimum limit on the values a long can accommodate to be LONG_MIN-LONG_MAX 2

So no matter how big a long is, it has to be big enough to hold LONG_MIN to LONG_MAX.

But Alf and others are specific that a long must be at least 32 bits. This is what I'm trying to establish. The C++ Standard is explicit that the number of bits in a byte are not specified (it could be 4, 8, 16, 42) So how is the connection made from being able to accommodate the numbers LONG_MIN-LONG_MAX to being at least 32 bits?

(1) 1.2/1: The following referenced documents are indispensable for the application of this document. For dated references, only the edition cited applies. For undated references, the latest edition of the referenced document (including any amendments) applies.

  • ISO/IEC 2382 (all parts), Information technology – Vocabulary
  • ISO/IEC 9899:1999, Programming languages – C
  • ISO/IEC 10646-1:2000, Information technology – Universal Multiple-Octet Coded Character Set (UCS) – Part 1: Architecture and Basic Multilingual Plane

(2) Defined in <climits> as:

LONG_MIN -2147483647 // -(2^31 - 1)
LONG_MAX +2147483647 //   2^31 - 1
  • 3
    @Mark: There are definitely machines that can address and work only with quantities greater than 8 bits, e.g. 32 bit words, there it's common to use char == int == long == 32 bit. Dec 1, 2010 at 22:36
  • 4
    @Mark Storer: Bytes that aren't 8 bits are rare nowadays, but there used to be a greater variety of systems around. A computer with 36-bit words would have a 9-bit byte. The old CDC Cyber systems with 60-bit words would have to have a 60-bit byte (which would cause problems) if they ever got a C compiler, but normally characters took 6 bits (there was a 6/12-bit scheme if you really wanted lowercase). Dec 1, 2010 at 22:36
  • 4
    @Mark Storer: Texas Instruments has a series of DSPs with C++ compilers and 16-bit byte. Or they used to have, a few years back. There's also an anachronistic beast with 9-bit byte, with ancestry going back to middle ages. "Unisys"? Not sure. I could look it up if you're really interested. Cheers, Dec 1, 2010 at 23:10
  • 2
    Well, I guess if someone invents some way to store (2^32)-1 distinct values in fewer than 32 bits, then there might not be 32 bits in a long. However, on any binary platform, as long as mathematics is valid, you will have 32 bits.
    – Anon.
    Dec 1, 2010 at 23:28
  • 2
    @Alf: Succinct, definitely. Correct, yes, as has been shown in this post. I would suggest however that you did leave a lot of steps out, and were rather curt in the "says so in the C std" responses. I didn't see the connection either, so I can understand his confusion. Dec 2, 2010 at 0:05

5 Answers 5


C++ uses the limits defined in the C standard (C++: 18.3.2 (c.limits), C:

LONG_MIN -2147483647 // -(2^31 - 1)
LONG_MAX +2147483647 //   2^31 - 1

So you are guaranteed that a long is at least 32 bits.

And if you want to follow the long circuitous route to whether LONG_MIN/LONG_MAX are representable by a long, you have to look at (numeric.limits.members) in the C++ standard:

static constexpr T min() throw(); // Equivalent to CHAR_MIN, SHRT_MIN, FLT_MIN, DBL_MIN, etc.
static constexpr T max() throw(); // Equivalent to CHAR_MAX, SHRT_MAX, FLT_MAX, DBL_MAX, etc.

I moved the footnotes into the comment, so it's not exactly what appears in the standard. But it basically implies that std::numeric_limits<long>::min()==LONG_MIN==(long)LONG_MIN and std::numeric_limits<long>::max()==LONG_MAX==(long)LONG_MAX.

So, even though the C++ standard does not specify the bitwise representation of (signed) negative numbers, it has to either be twos-complement and require 32-bits of storage in total, or it has an explicit sign bit which means that it has 32-bits of storage also.

  • 3
    This is roughly what you get if you follow the incredibly long comment chain in that post through all the ad-hominem attacks. Nice to see it can be explained succinctly and without calling anybody names.
    – T.E.D.
    Dec 1, 2010 at 22:33
  • 1
    Where in the C++ standard does it say that a long must accomodate the values [LONG_MIN, LONG_MAX]? I can't find any such reference. Dec 1, 2010 at 22:35
  • 1
    @pst: Note that the limits are allowed to be larger than those values. A conforming implementation could allow -2^31, or it could allow +2^31.
    – Anon.
    Dec 1, 2010 at 22:40
  • 3
    @John Dibling, there's a lot of bouncing around between C and C++ standards. The sizes of integer types section is from the C standard. Even in the C++ standard, there are references back to the ISO C standard demonostrated by "SEE ALSO: ISO C subclass xxx"
    – wkl
    Dec 1, 2010 at 22:41
  • 1
    @John, I edited my comment, but the C++ standard makes many references back to the ISO C standard. Annex C of C++03 discusses compatibility/incompatibilities between C and C++ standards, and they do not mention any differences between the two in type widths. This combined with what the standard says about <climits> having the same contents as <limits.h> (S 18.2.2) indicates to me that the type widths declared in the C standard also apply to C++.
    – wkl
    Dec 1, 2010 at 22:46

The answer is definitively YES. Read my OP and all the comments to understand why exactly, but here's the short version. If you doubt or question any of this, I encourage you to read the entire thread and all of the comments. Otherwise accept this as true:

  1. The C++ standard includes parts of the C standard, including the definitions for LONG_MIN and LONG_MAX
  2. LONG_MIN is defined as no greater than -2147483647
  3. LONG_MAX is defined as no less than +2147483647
  4. In C++ integral types are stored in binary in the underlying representation
  5. In order to represent -2147483647 and +2147483647 in binary, you need 32 bits.
  6. A C++ long is guaranteed to be able to represent the minimum range LONG_MIN through LONG_MAX

Therefore a long must be at least 32 bits1.


LONG_MIN and LONG_MAX have values with magnitudes dictated by the C standard (ISO/IEC 9899:TC3) in section §

[...] Their implementation-defined values shall be equal or greater in magnitude [...] (absolute value) to those shown, with the same sign [...]

— minimum value for an object of type long int
LONG_MIN -2147483647 // -(2 ^ 31 - 1)
— maximum value for an object of type long int
LONG_MAX +2147483647 // 2 ^ 31 - 1

1 32 bits: This does not mean that sizeof (long) >= 4, because a byte is not necessarily 8 bits. According to the Standard, a byte is some unspecified (platform-defined) number of bits. While most readers will find this odd, there is real hardware on which CHAR_BIT is 16 or 32.

  • 1
    I was asked to make this an answer on its own, hence i will accept this when time elapses Dec 2, 2010 at 16:51
  • The C standard includes guarantees on the minimum magnitude of those values. LONG_MAX must be at least +2147483647, and LONG_MIN must be at most -2147483647. Google for e.g. C standard minimum value of LONG_MAX if you don't believe me. Dec 2, 2010 at 17:14
  • 1
    There are two technicalities that you should mention. First, the signed ranges are symmetric (-2147483647 ... +2147483647 instead of -214748364‌‌ 8 ... +2147483647) to allow for the possibility that signed integers might not use two's complement. The very latest C and C++ standards still consider this a realistic possibility, even though the last commercial non-two's-complement machine went out of production sometime in the 1970s (one of the UNIVAC series, not sure exactly which). (cont'd)
    – zwol
    Sep 16, 2013 at 17:23
  • 1
    Second, and rather more importantly, a long being at least 32 bits does not mean that sizeof(long) >= 4. There are real machines for which CHAR_BIT is 16 or 32, and therefore sizeof(long) might be as small as 2 or 1. Unlike the one's complement mainframes and the 9-bit minis, these are still in production AFAIK. (Mostly they are unusual microcontrollers. Yes, working with them is kind of a pain.)
    – zwol
    Sep 16, 2013 at 17:26
  • @Zack: To your second point, I do say in the OP that, "Furthermore, it is implementation-defined how many bits are in a byte. Most of us are probably used to dealing with 8-bit bytes, but the Standard says there are n bits in a byte." However I guess that's a bit buried and it would be useful to mention it more explicitly in the answer. Sep 16, 2013 at 17:43

The C++ standard notes that the contents of <climits> are the same as the C header <limits.h> (18.2.2 in ISO C++03 doc).

Unfortunately, I do not have a copy of the C standard that existed pre-C++98 (i.e. C90), but in C99 (section, <limits.h> has to have at least this minimum values. I don't think this changed from C90, other than C99 adding the long long types.

— minimum value for an object of type long int

LONG_MIN -2147483647 // −(2^31 − 1)

— maximum value for an object of type long int

LONG_MAX +2147483647 // 2^31 − 1

— maximum value for an object of type unsigned long int

ULONG_MAX 4294967295 // 2^32 − 1

— minimum value for an object of type long long int

LLONG_MIN -9223372036854775807 // −(2^63− 1)
  • I don't have the C standard either, (I'm a C++ guy). But let's assume that what you've posted here is what applies to C++. I'm trying to connect the dots between the C standard and the C++ standard and figure out ultimately the chain of references that say in no uncertain terms that a long has to be at least 32 bits. Let's just simplify that and say that a long has to accomodate at least the range LONG_MIN-LONG_MAX. Dec 1, 2010 at 22:50
  • @John - I think this discussion is going to continue in MSN's answer more than in mine, so I think all the good answers will be in there.
    – wkl
    Dec 1, 2010 at 22:53

Yes, the C++ standard is explicit that the number of bits in a byte is not specified. The number of bits in a long isn't specified, either.

Setting a lower bound on a number is not specifying it.

The C++ standard says, in one place:

1 == sizeof(char) <= sizeof(short) <= sizeof(int) <= sizeof(long).

It says, in effect, in another place, via inclusion of the C standard:

CHAR_BITS >= 8; SHORT_BITS >= 16; INT_BITS >= 16; LONG_BITS >= 32

(except that AFAIK, the identifiers SHORT_BITS, INT_BITS and LONG_BITS don't exist, and that these limits are inferred by the requirements for minimum values on the types.)

This follows from the fact that a certain number of bits are required, mathematically, to encode all of the values in the (e.g. for longs) LONG_MIN..LONG_MAX range.

Finally, shorts, ints and longs must all be made up of an integral number of chars; sizeof() always reports an integral value. Also, iterating through memory char by char must access every bit, which places some practical limitations.

These requirements are not inconsistent in any way. Any sizes that satisfy the requirements are OK.

There were machines long ago with a native word size of 36 bits. If you were to port a C++ compiler to them, you could legally decide to have 9 bits in a char, 18 in both short and int, and 36 in long. You could also legally decide to have 36 bits in each of those types, for the same reason that you can have 32 bits in an int on a typical 32-bit system today. There are real-world implementations that use 64-bit chars.

See also sections 26.1-6 and 29.5 of the C++ FAQ Lite.

  • True, but my question was does a long have to be at least 32 bits, not exactly 32 bits Dec 2, 2010 at 16:54
  • And the answer is "yes, 'at least'". All over my answer, values are specified in terms of lower bounds, not exact quantities (except for sizeof(char), because as far as C++ is concerned, char s are bytes, but bytes are not necessarily octets). Because that's how the Standard specifies them. Dec 2, 2010 at 17:09

But Alf and others are specific that a long must be at least 32 bits. This is what I'm trying to establish. The C++ Standard is explicit that the number of bits in a byte are not specified. Could be 4, 8, 16, 42... So how is the connection made from being able to accomodate the numbers LONG_MIN-LONG_MAX to being at least 32 bits?

You need 32 bits in the value representation in order to get at least that many bitpatterns. And since C++ requires a binary representation of integers (explicit language to that effect in the standard, §3.9.1/7), Q.E.D.

  • And why do you say that is that many bit patterns is required? There's a LOT of steps you have to add before you can write "Q.E.D." Jul 17, 2013 at 17:28
  • @MooingDuck: no, with common arithmetic there are no intermediate steps. the question is "how is the connection made", and it goes like this: 2^n = M gives directly n = log2(M). see, no intermediate step. well, except if you want to calculate it on a calculator with no log2 button. then log2(M) = ln(M)/ln(2). :-) Jul 19, 2013 at 0:55

Your Answer

By clicking “Post Your Answer”, you agree to our terms of service and acknowledge that you have read and understand our privacy policy and code of conduct.

Not the answer you're looking for? Browse other questions tagged or ask your own question.