C mathematical functions

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Lua error in package.lua at line 80: module 'strict' not found. C mathematical operations are a group of functions in the standard library of the C programming language implementing basic mathematical functions.[1][2] All functions use floating point numbers in one manner or another. Different C standards provide different, albeit backwards-compatible, sets of functions. Most of these functions are also available in the C++ standard library, though in different headers (the C headers are included as well, but only as a deprecated compatibility feature).

Overview of functions

Most of the mathematical functions are defined in math.h (cmath header in C++). The functions that operate on integers, such as abs, labs, div, and ldiv, are instead defined in the stdlib.h header (cstdlib header in C++).

Any functions that operate on angles use radians as the unit of angle.[1]

Not all of these functions are available in the C89 version of the standard. For those that are, the functions accept only type double for the floating-point arguments, leading to expensive type conversions in code that otherwise used single-precision float values. In C99, this shortcoming was fixed by introducing new sets of functions that work on float and long double arguments. Those functions are identified by f and l suffixes respectively.[3]

Function Description
abs
labs
llabs
computes absolute value of an integer value
fabs computes absolute value of a floating point value
div
ldiv
lldiv
computes the quotient and remainder of integer division
fmod remainder of the floating point division operation
remainder signed remainder of the division operation
remquo signed remainder as well as the three last bits of the division operation
fma fused multiply-add operation
fmax larger of two floating point values
fmin smaller of two floating point values
fdim positive difference of two floating point values
nan
nanf
nanl
returns a not-a-number (NaN)
Exponential
functions
exp returns e raised to the given power
exp2 returns 2 raised to the given power
expm1 returns e raised to the given power, minus one
log computes natural logarithm (to base e)
log2 computes binary logarithm (to base 2)
log10 computes common logarithm (to base 10)
log1p computes natural logarithm (to base e) of 1 plus the given number
ilogb extracts exponent of the number
logb extracts exponent of the number
Power
functions
sqrt computes square root
cbrt computes cubic root
hypot computes square root of the sum of the squares of two given numbers
pow raises a number to the given power
Trigonometric
functions
sin computes sine
cos computes cosine
tan computes tangent
asin computes arc sine
acos computes arc cosine
atan computes arc tangent
atan2 computes arc tangent, using signs to determine quadrants
Hyperbolic
functions
sinh computes hyperbolic sine
cosh computes hyperbolic cosine
tanh computes hyperbolic tangent
asinh computes hyperbolic arc sine
acosh computes hyperbolic arc cosine
atanh computes hyperbolic arc tangent
Error and
gamma
functions
erf computes error function
erfc computes complementary error function
lgamma computes natural logarithm of the gamma function
tgamma computes gamma function
Nearest
integer
floating
point
operations
ceil returns the nearest integer not less than the given value
floor returns the nearest integer not greater than the given value
trunc returns the nearest integer not greater in magnitude than the given value
round
lround
llround
returns the nearest integer, rounding away from zero in halfway cases
nearbyint returns the nearest integer using current rounding mode
rint
lrint
llrint
returns the nearest integer using current rounding mode with exception if the result differs
Floating
point
manipulation
functions
frexp decomposes a number into significand and a power of 2
ldexp multiplies a number by 2 raised to a power
modf decomposes a number into integer and fractional parts
scalbn
scalbln
multiplies a number by FLT_RADIX raised to a power
nextafter
nexttoward
returns next representable floating point value towards the given value
copysign copies the sign of a floating point value
Classification fpclassify categorizes the given floating point value
isfinite checks if the given number has finite value
isinf checks if the given number is infinite
isnan checks if the given number is NaN
isnormal checks if the given number is normal
signbit checks if the given number is negative

Floating point environment

C99 adds several functions and types for fine-grained control of floating point environment.[3] These functions can be used to control a variety of settings that affect floating-point computations, for example, the rounding mode, on what conditions exceptions occur, when numbers are flushed to zero, etc. The floating point environment functions and types are defined in fenv.h header (cfenv in C++).

Function Description
feclearexcept clears exceptions (C99)
fegetenv stores current floating-point environment (C99)
fegetexceptflag stores current status flags (C99)
fegetround retrieves current rounding direction (C99)
feholdexcept saves current floating-point environment and clears all exceptions (C99)
feraiseexcept raises a floating-point exception (C99)
fesetenv sets current floating-point environment (C99)
fesetexceptflag sets current status flags (C99)
fesetround sets current rounding direction (C99)
fetestexcept tests whether certain exceptions have been raised (C99)
feupdateenv restores floating-point environment, but keeps current exceptions (C99)

Complex numbers

C99 adds a new _Complex keyword (and complex convenience macro) that provides support for complex numbers. Any floating point type can be modified with complex, and is then defined as a pair of floating point numbers. Note that C99 and C++ do not implement complex numbers in a code-compatible way - the latter instead provides the class std::complex.

All operations on complex numbers are defined in complex.h header. As with the real-valued functions, an f or l suffix denotes the float complex or long double complex variant of the function.

Function Description
Basic
operations
cabs computes absolute value (C99)
carg computes argument of a complex number (C99)
cimag computes imaginary part of a complex number (C99)
creal computes real part of a complex number (C99)
conj computes complex conjugate (C99)
cproj computes complex projection into the Riemann sphere (C99)
Exponentiation
operations
cexp computes complex exponential (C99)
clog computes complex logarithm (C99)
csqrt computes complex square root (C99)
cpow computes complex power (C99)
Trigonometric
operations
csin computes complex sine (C99)
ccos computes complex cosine (C99)
ctan computes complex tangent (C99)
casin computes complex arc sine (C99)
cacos computes complex arc cosine (C99)
catan computes complex arc tangent (C99)
Hyperbolic
operations
csinh computes complex hyperbolic sine (C99)
ccosh computes complex hyperbolic cosine (C99)
ctanh computes complex hyperbolic tangent (C99)
casinh computes complex hyperbolic arc sine (C99)
cacosh computes complex hyperbolic arc cosine (C99)
catanh computes complex hyperbolic arc tangent (C99)

A few more complex functions are "reserved for future use in C99".[4] Implementations are provided by open-source projects that are not part of the standard library.

Function Description
Error functions cerf computes the complex error function (C99)
cerfc computes the complex complementary error function (C99)

Type-generic functions

The header tgmath.h defines a type-generic macro for each mathematical function defined in math.h and complex.h. This adds a limited support for function overloading of the mathematical functions: the same function name can be used with different types of parameters; the actual function will be selected at compile-time according to the types of the parameters.

Each type-generic macro that corresponds to a function that is defined for both real and complex numbers encapsulates a total of 6 different functions: float, double and long double, and their complex variants. The type-generic macros that correspond to a function that is defined for only real numbers encapsulates a total of 3 different functions: float, double and long double variants of the function.

The C++ language includes native support for function overloading and thus does not provide the tgmath.h header even as a compatibility feature.

Random number generation

The header stdlib.h (cstdlib in C++) defines several functions that can be used for statistically random number generation.[5]

Function Description
rand generates a pseudo-random number
srand initializes a pseudo-random number generator

libm

Under Linux and FreeBSD, the mathematical functions (as declared in math.h) are bundled separately in the mathematical library libm. Therefore, if any of those functions are used, the linker must be given the directive -lm.

There are various libm implementations, including:

See also

References

  1. 1.0 1.1 Lua error in package.lua at line 80: module 'strict' not found.
  2. Lua error in package.lua at line 80: module 'strict' not found.
  3. 3.0 3.1 Lua error in package.lua at line 80: module 'strict' not found.
  4. man cerf(3), man cerfc(3), see e.g. http://linux.die.net/man/3/cerf.
  5. Lua error in package.lua at line 80: module 'strict' not found.

External links