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Arithmetic types

(See also type for type system overview and the list of type-related utilities that are provided by the C library).

Boolean type

_Bool (also accessible as the macro bool) - type, capable of holding one of the two values: 1 and 0 (also accessible as the macros true and false).

Note that conversion to _Bool does not work the same as conversion to other integer types: (bool)0.5 evaluates to 1, whereas (int)0.5 evaluates to 0.

(since C99)

Character types

signed char - type for signed character representation.
unsigned char - type for unsigned character representation. Also used to inspect object representations (raw memory).
char - type for character representation. Equivalent to either signed char or unsigned char (which one is implementation-defined and may be controlled by a compiler commandline switch), but char is a distinct type, different from both signed char and unsigned char

Note that the standard library also defines typedef names wchar_t , char16_t, and char32_t (since C11) to represent wide characters.

Integer types

short int (also accessible as short, may use the keyword signed)
unsigned short int (also accessible as unsigned short)
int (also accessible as signed int)
unsigned int (also accessible as unsigned), the unsigned counterpart of int, implementing modulo arithmetic. Suitable for bit manipulations.
long int (also accessible as long)
unsigned long int (also accessible as unsigned long)

This is the most optimal integer type for the platform, and is guaranteed to be at least 16 bits. Most current systems use 32 bits (see Data models below).

long long int (also accessible as long long)
unsigned long long int (also accessible as unsigned long long)

(since C99)

Note: as with all type specifiers, any order is permitted: unsigned long long int and long int unsigned long name the same type.

The following table summarizes all available integer types and their properties:

Type specifier	Equivalent type	Width in bits by data model
Type specifier	Equivalent type	C standard	LP32	ILP32	LLP64	LP64
`short`	`short int`	at least 16	16	16	16	16
`short int`
`signed short`
`signed short int`
`unsigned short`	`unsigned short int`
`unsigned short int`	`unsigned short int`
`int`	`int`	at least 16	16	32	32	32
`signed`
`signed int`
`unsigned`	`unsigned int`
`unsigned int`	`unsigned int`
`long`	`long int`	at least 32	32	32	32	64
`long int`
`signed long`
`signed long int`
`unsigned long`	`unsigned long int`
`unsigned long int`	`unsigned long int`
`long long`	`long long int` (C99)	at least 64	64	64	64	64
`long long int`
`signed long long`
`signed long long int`
`unsigned long long`	`unsigned long long int` (C99)
`unsigned long long int`	`unsigned long long int` (C99)

Besides the minimal bit counts, the C Standard guarantees that 1 == sizeof(char) <= sizeof(short) <= sizeof(int) <= sizeof(long) <= sizeof(long long).

Note: this allows the extreme case in which bytes are sized 64 bits, all types (including char) are 64 bits wide, and sizeof returns 1 for every type.

Note: integer arithmetic is defined differently for the signed and unsigned integer types. See arithmetic operators, in particular integer overflows.

Data models

The choices made by each implementation about the sizes of the fundamental types are collectively known as data model. Four data models found wide acceptance:

32 bit systems:

LP32 or 2/4/4 (int is 16-bit, long and pointer are 32-bit)

Win16 API

ILP32 or 4/4/4 (int, long, and pointer are 32-bit);

Win32 API
Unix and Unix-like systems (Linux, Mac OS X)

64 bit systems:

LLP64 or 4/4/8 (int and long are 32-bit, pointer is 64-bit)

Win64 API

LP64 or 4/8/8 (int is 32-bit, long and pointer are 64-bit)

Unix and Unix-like systems (Linux, Mac OS X)

Other models are very rare. For example, ILP64 (8/8/8: int, long, and pointer are 64-bit) only appeared in some early 64-bit Unix systems (e.g. Unicos on Cray).

Note that exact-width integer types are available in <stdint.h> since C99.

Real floating types

C has three or six (since C23) types for representing real floating-point values:

float - single precision floating point type. Matches IEEE-754 binary32 format if supported.
double - double precision floating point type. Matches IEEE-754 binary64 format if supported.
long double - extended precision floating point type. Matches IEEE-754 binary128 format if supported, otherwise matches IEEE-754 binary64-extended format if supported, otherwise matches some non-IEEE-754 extended floating-point format as long as its precision is better than binary64 and range is at least as good as binary64, otherwise matches IEEE-754 binary64 format.
- binary128 format is used by some HP-UX, SPARC, MIPS, ARM64, and z/OS implementations.
- The most well known IEEE-754 binary64-extended format is 80-bit x87 extended precision format. It is used by many x86 and x86-64 implementations (a notable exception is MSVC, which implements long double in the same format as double, i.e. binary64).

If the implementation predefines the macro constant __STDC_IEC_60559_DFP__, the following decimal floating-point types are also supported.

_Decimal32 - Represents IEEE-754 decimal32 format.
_Decimal64 - Represents IEEE-754 decimal64 format.
_Decimal128 - Represents IEEE-754 decimal128 format.

Otherwise, these decimal floating-point types are not supported.

(since C23)

Floating-point types may support special values:

infinity (positive and negative), see INFINITY
the negative zero, -0.0. It compares equal to the positive zero, but is meaningful in some arithmetic operations, e.g. 1.0/0.0 == INFINITY, but 1.0/-0.0 == -INFINITY)
not-a-number (NaN), which does not compare equal with anything (including itself). Multiple bit patterns represent NaNs, see nan, NAN. Note that C takes no special notice of signaling NaNs (specified by IEEE-754), and treats all NaNs as quiet.

Real floating-point numbers may be used with arithmetic operators + - / * and various mathematical functions from <math.h>. Both built-in operators and library functions may raise floating-point exceptions and set errno as described in math_errhandling.

Floating-point expressions may have greater range and precision than indicated by their types, see FLT_EVAL_METHOD. Assignment, return, and cast force the range and precision to the one associated with the declared type.

Floating-point expressions may also be contracted, that is, calculated as if all intermediate values have infinite range and precision, see #pragma STDC FP_CONTRACT.

Some operations on floating-point numbers are affected by and modify the state of the floating-point environment (most notably, the rounding direction).

Implicit conversions are defined between real floating types and integer, complex, and imaginary types.

See Limits of floating point types and the math.h library for additional details, limits, and properties of the floating-point types.

Complex floating types

Complex floating types model the mathematical complex numbers, that is the numbers that can be written as a sum of a real number and a real number multiplied by the imaginary unit: a + bi.

The three complex types are.

float _Complex (also available as float complex if <complex.h> is included)
double _Complex (also available as double complex if <complex.h> is included)
long double _Complex (also available as long double complex if <complex.h> is included)

Note: as with all type specifiers, any order is permitted: long double complex, complex long double, and even double complex long name the same type.

#include <complex.h>
#include <stdio.h>
int main(void)
{
    double complex z = 1 + 2*I;
    z = 1/z;
    printf("1/(1.0+2.0i) = %.1f%+.1fi\n", creal(z), cimag(z));
}

Output:

1/(1.0+2.0i) = 0.2-0.4i

If the macro constant __STDC_NO_COMPLEX__ is defined by the implementation, the complex types (as well as the library header <complex.h>) are not provided.

(since C11)

Each complex type has the same object representation and alignment requirements as an array of two elements of the corresponding real type (float for float complex, double for double complex, long double for long double complex). The first element of the array holds the real part, and the second element of the array holds the imaginary component.

float a[4] = {1, 2, 3, 4};
float complex z1, z2;
memcpy(&z1, a, sizeof z1); // z1 becomes 1.0 + 2.0i
memcpy(&z2, a+2, sizeof z2); // z2 becomes 3.0 + 4.0i

Complex numbers may be used with arithmetic operators + - * and /, possibly mixed with imaginary and real numbers. There are many mathematical functions defined for complex numbers in <complex.h>. Both built-in operators and library functions may raise floating-point exceptions and set errno as described in math_errhandling.

Increment and decrement are not defined for complex types.

Relational operators are not defined for complex types (there is no notion of "less than") Implicit conversions are defined between complex types and other arithmetic types.

In order to support the one-infinity model of complex number arithmetic, C regards any complex value with at least one infinite part as an infinity even if its other part is a NaN, guarantees that all operators and functions honor basic properties of inifinities and provides cproj to map all infinities to the canonical one (see arithmetic operators for the exact rules).

#include <stdio.h>
#include <complex.h>
#include <math.h>
int main(void)
{
   double complex z = (1 + 0*I) * (INFINITY + I*INFINITY);
// textbook formula would give
// (1+i0)(∞+i∞) ⇒ (1×∞ – 0×∞) + i(0×∞+1×∞) ⇒ NaN + I*NaN
// but C gives a complex infinity
   printf("%f + i*%f\n", creal(z), cimag(z));
 
// textbook formula would give
// cexp(∞+iNaN) ⇒ exp(∞)×(cis(NaN)) ⇒ NaN + I*NaN
// but C gives  ±∞+i*nan
   double complex y = cexp(INFINITY + I*NAN);
   printf("%f + i*%f\n", creal(y), cimag(y));
 
}

Possible output:

inf + i*inf 
inf + i*nan

C also treats multiple infinities so as to preserve directional information where possible, despite the inherent limitations of the Cartesian representation:

multiplying the imaginary unit by real infinity gives the correctly-signed imaginary infinity: i × ∞ = i∞. Also, i × (∞ – i∞) = ∞ + i∞ indicates the reasonable quadrant.

Imaginary floating types

Imaginary floating types model the mathematical imaginary numbers, that is numbers that can be written as a real number multiplied by the imaginary unit: bi The three imaginary types are.

float _Imaginary (also available as float imaginary if <complex.h> is included)
double _Imaginary (also available as double imaginary if <complex.h> is included)
long double _Imaginary (also available as long double imaginary if <complex.h> is included)

Note: as with all type specifiers, any order is permitted: long double imaginary, imaginary long double, and even double imaginary long name the same type.

#include <complex.h>
#include <stdio.h>
int main(void)
{
    double imaginary z = 3*I;
    z = 1/z;
    printf("1/(3.0i) = %+.1fi\n", cimag(z));
}

Output:

1/(3.0i) = -0.3i

An implementation that defines `__STDC_IEC_559_COMPLEX__` is recommended, but not required to support imaginary numbers. POSIX recommends checking if the macro `_Imaginary_I` is defined to identify imaginary number support.	(until C11)
Imaginary numbers are supported if `__STDC_IEC_559_COMPLEX__` (until C23)`__STDC_IEC_60559_COMPLEX__` (since C23) is defined.	(since C11)

Each of the three imaginary types has the same object representation and alignment requirement as its corresponding real type (float for float imaginary, double for double imaginary, long double for long double imaginary).

Note: despite that, imaginary types are distinct and not compatible with their corresponding real types, which prohibits aliasing.

Imaginary numbers may be used with arithmetic operators + - * and /, possibly mixed with complex and real numbers. There are many mathematical functions defined for imaginary numbers in <complex.h>. Both built-in operators and library functions may raise floating-point exceptions and set errno as described in math_errhandling.

Increment and decrement are not defined for imaginary types Implicit conversions are defined between imaginary types and other arithmetic types.

The imaginary numbers make it possible to express all complex numbers using the natural notation x + I*y (where I is defined as _Imaginary_I). Without imaginary types, certain special complex values cannot be created naturally. For example, if I is defined as _Complex_I, then writing 0.0 + I*INFINITY gives NaN as the real part, and CMPLX(0.0, INFINITY) must be used instead. Same goes for the numbers with the negative zero imaginary component, which are meaningful when working with the library functions with branch cuts, such as csqrt: 1.0 - 0.0*I results in the positive zero imaginary component if I is defined as _Complex_I and the negative zero imaginary part requires the use of CMPLX or conj.

Imaginary types also simplify implementations; multiplication of an imaginary by a complex can be implemented straightforwardly with two multiplications if the imaginary types are supported, instead of four multiplications and two additions.

(since C99)

Keywords

char, int, short, long, signed, unsigned, float, double. _Bool, _Complex, _Imaginary, _Decimal32, _Decimal64, _Decimal128.

Range of values

The following table provides a reference for the limits of common numeric representations.

Prior to C23, the C Standard allowed any signed integer representation, and the minimum guaranteed range of N-bit signed integers was from \(\scriptsize -(2^{N-1}-1)\)-(2N-1
-1) to \(\scriptsize +2^{N-1}-1\)+2N-1
-1 (e.g. -127 to 127 for a signed 8-bit type), which corresponds to the limits of one's complement or sign-and-magnitude.

However, all popular data models (including all of ILP32, LP32, LP64, LLP64) and almost all C compilers use two's complement representation (the only known exceptions are some compliers for UNISYS), and as of C23, it is the only representation allowed by the standard, with the guaranteed range from \(\scriptsize -2^{N-1}\)-2N-1
to \(\scriptsize +2^{N-1}-1\)+2N-1
-1 (e.g. -128 to 127 for a signed 8-bit type).

Type	Size in bits	Format	Value range
Type	Size in bits	Format	Approximate	Exact
character	8	signed		-128 to 127
	8	unsigned		0 to 255
	16	UTF-16		0 to 65535
	32	UTF-32		0 to 1114111 (0x10ffff)
integer	16	signed	± 3.27 · 10⁴	-32768 to 32767
	16	unsigned	0 to 6.55 · 10⁴	0 to 65535
	32	signed	± 2.14 · 10⁹	-2,147,483,648 to 2,147,483,647
	32	unsigned	0 to 4.29 · 10⁹	0 to 4,294,967,295
	64	signed	± 9.22 · 10¹⁸	-9,223,372,036,854,775,808 to 9,223,372,036,854,775,807
	64	unsigned	0 to 1.84 · 10¹⁹	0 to 18,446,744,073,709,551,615
binary floating point	32	IEEE-754	min subnormal: ± 1.401,298,4 · 10^-45 min normal: ± 1.175,494,3 · 10^-38 max: ± 3.402,823,4 · 10³⁸	min subnormal: ±0x1p-149 min normal: ±0x1p-126 max: ±0x1.fffffep+127
	64	IEEE-754	min subnormal: ± 4.940,656,458,412 · 10^-324 min normal: ± 2.225,073,858,507,201,4 · 10^-308 max: ± 1.797,693,134,862,315,7 · 10³⁰⁸	min subnormal: ±0x1p-1074 min normal: ±0x1p-1022 max: ±0x1.fffffffffffffp+1023
	80^{[note 1]}	x86	min subnormal: ± 3.645,199,531,882,474,602,528 · 10^-4951 min normal: ± 3.362,103,143,112,093,506,263 · 10^-4932 max: ± 1.189,731,495,357,231,765,021 · 10⁴⁹³²	min subnormal: ±0x1p-16446 min normal: ±0x1p-16382 max: ±0x1.fffffffffffffffep+16383
	128	IEEE-754	min subnormal: ± 6.475,175,119,438,025,110,924, 438,958,227,646,552,5 · 10^-4966 min normal: ± 3.362,103,143,112,093,506,262, 677,817,321,752,602,6 · 10^-4932 max: ± 1.189,731,495,357,231,765,085, 759,326,628,007,016,2 · 10⁴⁹³²	min subnormal: ±0x1p-16494 min normal: ±0x1p-16382 max: ±0x1.ffffffffffffffffffffffffffff p+16383
decimal floating point	32	IEEE-754		min subnormal: ± 1 · 10^-101 min normal: ± 1 · 10^-95 max: ± 9.999'999 · 10⁹⁶
	64	IEEE-754		min subnormal: ± 1 · 10^-398 min normal: ± 1 · 10^-383 max: ± 9.999'999'999'999'999 · 10³⁸⁴
	128	IEEE-754		min subnormal: ± 1 · 10^-6176 min normal: ± 1 · 10^-6143 max: ± 9.999'999'999'999'999'999' 999'999'999'999'999 · 10⁶¹⁴⁴

The object representation usually occupies 96/128 bits on 32/64-bit platforms respectively.

Note: actual (as opposed to guaranteed minimal) ranges are available in the library headers <limits.h> and <float.h>.