glibc/manual/arith.texi
Florian Weimer 010fe23177 manual: Use @code{errno} instead of @var{errno} [BZ #24063]
@var is intended for placeholders (such as function parameters).
Actual variables need to use @code because @var causes upper-case
output, resulting in a different C identifier.
2019-01-07 11:42:04 +01:00

3171 lines
133 KiB
Plaintext

@node Arithmetic, Date and Time, Mathematics, Top
@c %MENU% Low level arithmetic functions
@chapter Arithmetic Functions
This chapter contains information about functions for doing basic
arithmetic operations, such as splitting a float into its integer and
fractional parts or retrieving the imaginary part of a complex value.
These functions are declared in the header files @file{math.h} and
@file{complex.h}.
@menu
* Integers:: Basic integer types and concepts
* Integer Division:: Integer division with guaranteed rounding.
* Floating Point Numbers:: Basic concepts. IEEE 754.
* Floating Point Classes:: The five kinds of floating-point number.
* Floating Point Errors:: When something goes wrong in a calculation.
* Rounding:: Controlling how results are rounded.
* Control Functions:: Saving and restoring the FPU's state.
* Arithmetic Functions:: Fundamental operations provided by the library.
* Complex Numbers:: The types. Writing complex constants.
* Operations on Complex:: Projection, conjugation, decomposition.
* Parsing of Numbers:: Converting strings to numbers.
* Printing of Floats:: Converting floating-point numbers to strings.
* System V Number Conversion:: An archaic way to convert numbers to strings.
@end menu
@node Integers
@section Integers
@cindex integer
The C language defines several integer data types: integer, short integer,
long integer, and character, all in both signed and unsigned varieties.
The GNU C compiler extends the language to contain long long integers
as well.
@cindex signedness
The C integer types were intended to allow code to be portable among
machines with different inherent data sizes (word sizes), so each type
may have different ranges on different machines. The problem with
this is that a program often needs to be written for a particular range
of integers, and sometimes must be written for a particular size of
storage, regardless of what machine the program runs on.
To address this problem, @theglibc{} contains C type definitions
you can use to declare integers that meet your exact needs. Because the
@glibcadj{} header files are customized to a specific machine, your
program source code doesn't have to be.
These @code{typedef}s are in @file{stdint.h}.
@pindex stdint.h
If you require that an integer be represented in exactly N bits, use one
of the following types, with the obvious mapping to bit size and signedness:
@itemize @bullet
@item int8_t
@item int16_t
@item int32_t
@item int64_t
@item uint8_t
@item uint16_t
@item uint32_t
@item uint64_t
@end itemize
If your C compiler and target machine do not allow integers of a certain
size, the corresponding above type does not exist.
If you don't need a specific storage size, but want the smallest data
structure with @emph{at least} N bits, use one of these:
@itemize @bullet
@item int_least8_t
@item int_least16_t
@item int_least32_t
@item int_least64_t
@item uint_least8_t
@item uint_least16_t
@item uint_least32_t
@item uint_least64_t
@end itemize
If you don't need a specific storage size, but want the data structure
that allows the fastest access while having at least N bits (and
among data structures with the same access speed, the smallest one), use
one of these:
@itemize @bullet
@item int_fast8_t
@item int_fast16_t
@item int_fast32_t
@item int_fast64_t
@item uint_fast8_t
@item uint_fast16_t
@item uint_fast32_t
@item uint_fast64_t
@end itemize
If you want an integer with the widest range possible on the platform on
which it is being used, use one of the following. If you use these,
you should write code that takes into account the variable size and range
of the integer.
@itemize @bullet
@item intmax_t
@item uintmax_t
@end itemize
@Theglibc{} also provides macros that tell you the maximum and
minimum possible values for each integer data type. The macro names
follow these examples: @code{INT32_MAX}, @code{UINT8_MAX},
@code{INT_FAST32_MIN}, @code{INT_LEAST64_MIN}, @code{UINTMAX_MAX},
@code{INTMAX_MAX}, @code{INTMAX_MIN}. Note that there are no macros for
unsigned integer minima. These are always zero. Similiarly, there
are macros such as @code{INTMAX_WIDTH} for the width of these types.
Those macros for integer type widths come from TS 18661-1:2014.
@cindex maximum possible integer
@cindex minimum possible integer
There are similar macros for use with C's built in integer types which
should come with your C compiler. These are described in @ref{Data Type
Measurements}.
Don't forget you can use the C @code{sizeof} function with any of these
data types to get the number of bytes of storage each uses.
@node Integer Division
@section Integer Division
@cindex integer division functions
This section describes functions for performing integer division. These
functions are redundant when GNU CC is used, because in GNU C the
@samp{/} operator always rounds towards zero. But in other C
implementations, @samp{/} may round differently with negative arguments.
@code{div} and @code{ldiv} are useful because they specify how to round
the quotient: towards zero. The remainder has the same sign as the
numerator.
These functions are specified to return a result @var{r} such that the value
@code{@var{r}.quot*@var{denominator} + @var{r}.rem} equals
@var{numerator}.
@pindex stdlib.h
To use these facilities, you should include the header file
@file{stdlib.h} in your program.
@deftp {Data Type} div_t
@standards{ISO, stdlib.h}
This is a structure type used to hold the result returned by the @code{div}
function. It has the following members:
@table @code
@item int quot
The quotient from the division.
@item int rem
The remainder from the division.
@end table
@end deftp
@deftypefun div_t div (int @var{numerator}, int @var{denominator})
@standards{ISO, stdlib.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
@c Functions in this section are pure, and thus safe.
The function @code{div} computes the quotient and remainder from
the division of @var{numerator} by @var{denominator}, returning the
result in a structure of type @code{div_t}.
If the result cannot be represented (as in a division by zero), the
behavior is undefined.
Here is an example, albeit not a very useful one.
@smallexample
div_t result;
result = div (20, -6);
@end smallexample
@noindent
Now @code{result.quot} is @code{-3} and @code{result.rem} is @code{2}.
@end deftypefun
@deftp {Data Type} ldiv_t
@standards{ISO, stdlib.h}
This is a structure type used to hold the result returned by the @code{ldiv}
function. It has the following members:
@table @code
@item long int quot
The quotient from the division.
@item long int rem
The remainder from the division.
@end table
(This is identical to @code{div_t} except that the components are of
type @code{long int} rather than @code{int}.)
@end deftp
@deftypefun ldiv_t ldiv (long int @var{numerator}, long int @var{denominator})
@standards{ISO, stdlib.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
The @code{ldiv} function is similar to @code{div}, except that the
arguments are of type @code{long int} and the result is returned as a
structure of type @code{ldiv_t}.
@end deftypefun
@deftp {Data Type} lldiv_t
@standards{ISO, stdlib.h}
This is a structure type used to hold the result returned by the @code{lldiv}
function. It has the following members:
@table @code
@item long long int quot
The quotient from the division.
@item long long int rem
The remainder from the division.
@end table
(This is identical to @code{div_t} except that the components are of
type @code{long long int} rather than @code{int}.)
@end deftp
@deftypefun lldiv_t lldiv (long long int @var{numerator}, long long int @var{denominator})
@standards{ISO, stdlib.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
The @code{lldiv} function is like the @code{div} function, but the
arguments are of type @code{long long int} and the result is returned as
a structure of type @code{lldiv_t}.
The @code{lldiv} function was added in @w{ISO C99}.
@end deftypefun
@deftp {Data Type} imaxdiv_t
@standards{ISO, inttypes.h}
This is a structure type used to hold the result returned by the @code{imaxdiv}
function. It has the following members:
@table @code
@item intmax_t quot
The quotient from the division.
@item intmax_t rem
The remainder from the division.
@end table
(This is identical to @code{div_t} except that the components are of
type @code{intmax_t} rather than @code{int}.)
See @ref{Integers} for a description of the @code{intmax_t} type.
@end deftp
@deftypefun imaxdiv_t imaxdiv (intmax_t @var{numerator}, intmax_t @var{denominator})
@standards{ISO, inttypes.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
The @code{imaxdiv} function is like the @code{div} function, but the
arguments are of type @code{intmax_t} and the result is returned as
a structure of type @code{imaxdiv_t}.
See @ref{Integers} for a description of the @code{intmax_t} type.
The @code{imaxdiv} function was added in @w{ISO C99}.
@end deftypefun
@node Floating Point Numbers
@section Floating Point Numbers
@cindex floating point
@cindex IEEE 754
@cindex IEEE floating point
Most computer hardware has support for two different kinds of numbers:
integers (@math{@dots{}-3, -2, -1, 0, 1, 2, 3@dots{}}) and
floating-point numbers. Floating-point numbers have three parts: the
@dfn{mantissa}, the @dfn{exponent}, and the @dfn{sign bit}. The real
number represented by a floating-point value is given by
@tex
$(s \mathrel? -1 \mathrel: 1) \cdot 2^e \cdot M$
@end tex
@ifnottex
@math{(s ? -1 : 1) @mul{} 2^e @mul{} M}
@end ifnottex
where @math{s} is the sign bit, @math{e} the exponent, and @math{M}
the mantissa. @xref{Floating Point Concepts}, for details. (It is
possible to have a different @dfn{base} for the exponent, but all modern
hardware uses @math{2}.)
Floating-point numbers can represent a finite subset of the real
numbers. While this subset is large enough for most purposes, it is
important to remember that the only reals that can be represented
exactly are rational numbers that have a terminating binary expansion
shorter than the width of the mantissa. Even simple fractions such as
@math{1/5} can only be approximated by floating point.
Mathematical operations and functions frequently need to produce values
that are not representable. Often these values can be approximated
closely enough for practical purposes, but sometimes they can't.
Historically there was no way to tell when the results of a calculation
were inaccurate. Modern computers implement the @w{IEEE 754} standard
for numerical computations, which defines a framework for indicating to
the program when the results of calculation are not trustworthy. This
framework consists of a set of @dfn{exceptions} that indicate why a
result could not be represented, and the special values @dfn{infinity}
and @dfn{not a number} (NaN).
@node Floating Point Classes
@section Floating-Point Number Classification Functions
@cindex floating-point classes
@cindex classes, floating-point
@pindex math.h
@w{ISO C99} defines macros that let you determine what sort of
floating-point number a variable holds.
@deftypefn {Macro} int fpclassify (@emph{float-type} @var{x})
@standards{ISO, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
This is a generic macro which works on all floating-point types and
which returns a value of type @code{int}. The possible values are:
@vtable @code
@item FP_NAN
@standards{C99, math.h}
The floating-point number @var{x} is ``Not a Number'' (@pxref{Infinity
and NaN})
@item FP_INFINITE
@standards{C99, math.h}
The value of @var{x} is either plus or minus infinity (@pxref{Infinity
and NaN})
@item FP_ZERO
@standards{C99, math.h}
The value of @var{x} is zero. In floating-point formats like @w{IEEE
754}, where zero can be signed, this value is also returned if
@var{x} is negative zero.
@item FP_SUBNORMAL
@standards{C99, math.h}
Numbers whose absolute value is too small to be represented in the
normal format are represented in an alternate, @dfn{denormalized} format
(@pxref{Floating Point Concepts}). This format is less precise but can
represent values closer to zero. @code{fpclassify} returns this value
for values of @var{x} in this alternate format.
@item FP_NORMAL
@standards{C99, math.h}
This value is returned for all other values of @var{x}. It indicates
that there is nothing special about the number.
@end vtable
@end deftypefn
@code{fpclassify} is most useful if more than one property of a number
must be tested. There are more specific macros which only test one
property at a time. Generally these macros execute faster than
@code{fpclassify}, since there is special hardware support for them.
You should therefore use the specific macros whenever possible.
@deftypefn {Macro} int iscanonical (@emph{float-type} @var{x})
@standards{ISO, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
In some floating-point formats, some values have canonical (preferred)
and noncanonical encodings (for IEEE interchange binary formats, all
encodings are canonical). This macro returns a nonzero value if
@var{x} has a canonical encoding. It is from TS 18661-1:2014.
Note that some formats have multiple encodings of a value which are
all equally canonical; @code{iscanonical} returns a nonzero value for
all such encodings. Also, formats may have encodings that do not
correspond to any valid value of the type. In ISO C terms these are
@dfn{trap representations}; in @theglibc{}, @code{iscanonical} returns
zero for such encodings.
@end deftypefn
@deftypefn {Macro} int isfinite (@emph{float-type} @var{x})
@standards{ISO, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
This macro returns a nonzero value if @var{x} is finite: not plus or
minus infinity, and not NaN. It is equivalent to
@smallexample
(fpclassify (x) != FP_NAN && fpclassify (x) != FP_INFINITE)
@end smallexample
@code{isfinite} is implemented as a macro which accepts any
floating-point type.
@end deftypefn
@deftypefn {Macro} int isnormal (@emph{float-type} @var{x})
@standards{ISO, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
This macro returns a nonzero value if @var{x} is finite and normalized.
It is equivalent to
@smallexample
(fpclassify (x) == FP_NORMAL)
@end smallexample
@end deftypefn
@deftypefn {Macro} int isnan (@emph{float-type} @var{x})
@standards{ISO, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
This macro returns a nonzero value if @var{x} is NaN. It is equivalent
to
@smallexample
(fpclassify (x) == FP_NAN)
@end smallexample
@end deftypefn
@deftypefn {Macro} int issignaling (@emph{float-type} @var{x})
@standards{ISO, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
This macro returns a nonzero value if @var{x} is a signaling NaN
(sNaN). It is from TS 18661-1:2014.
@end deftypefn
@deftypefn {Macro} int issubnormal (@emph{float-type} @var{x})
@standards{ISO, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
This macro returns a nonzero value if @var{x} is subnormal. It is
from TS 18661-1:2014.
@end deftypefn
@deftypefn {Macro} int iszero (@emph{float-type} @var{x})
@standards{ISO, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
This macro returns a nonzero value if @var{x} is zero. It is from TS
18661-1:2014.
@end deftypefn
Another set of floating-point classification functions was provided by
BSD. @Theglibc{} also supports these functions; however, we
recommend that you use the ISO C99 macros in new code. Those are standard
and will be available more widely. Also, since they are macros, you do
not have to worry about the type of their argument.
@deftypefun int isinf (double @var{x})
@deftypefunx int isinff (float @var{x})
@deftypefunx int isinfl (long double @var{x})
@standards{BSD, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
This function returns @code{-1} if @var{x} represents negative infinity,
@code{1} if @var{x} represents positive infinity, and @code{0} otherwise.
@end deftypefun
@deftypefun int isnan (double @var{x})
@deftypefunx int isnanf (float @var{x})
@deftypefunx int isnanl (long double @var{x})
@standards{BSD, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
This function returns a nonzero value if @var{x} is a ``not a number''
value, and zero otherwise.
@strong{NB:} The @code{isnan} macro defined by @w{ISO C99} overrides
the BSD function. This is normally not a problem, because the two
routines behave identically. However, if you really need to get the BSD
function for some reason, you can write
@smallexample
(isnan) (x)
@end smallexample
@end deftypefun
@deftypefun int finite (double @var{x})
@deftypefunx int finitef (float @var{x})
@deftypefunx int finitel (long double @var{x})
@standards{BSD, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
This function returns a nonzero value if @var{x} is neither infinite nor
a ``not a number'' value, and zero otherwise.
@end deftypefun
@strong{Portability Note:} The functions listed in this section are BSD
extensions.
@node Floating Point Errors
@section Errors in Floating-Point Calculations
@menu
* FP Exceptions:: IEEE 754 math exceptions and how to detect them.
* Infinity and NaN:: Special values returned by calculations.
* Status bit operations:: Checking for exceptions after the fact.
* Math Error Reporting:: How the math functions report errors.
@end menu
@node FP Exceptions
@subsection FP Exceptions
@cindex exception
@cindex signal
@cindex zero divide
@cindex division by zero
@cindex inexact exception
@cindex invalid exception
@cindex overflow exception
@cindex underflow exception
The @w{IEEE 754} standard defines five @dfn{exceptions} that can occur
during a calculation. Each corresponds to a particular sort of error,
such as overflow.
When exceptions occur (when exceptions are @dfn{raised}, in the language
of the standard), one of two things can happen. By default the
exception is simply noted in the floating-point @dfn{status word}, and
the program continues as if nothing had happened. The operation
produces a default value, which depends on the exception (see the table
below). Your program can check the status word to find out which
exceptions happened.
Alternatively, you can enable @dfn{traps} for exceptions. In that case,
when an exception is raised, your program will receive the @code{SIGFPE}
signal. The default action for this signal is to terminate the
program. @xref{Signal Handling}, for how you can change the effect of
the signal.
@noindent
The exceptions defined in @w{IEEE 754} are:
@table @samp
@item Invalid Operation
This exception is raised if the given operands are invalid for the
operation to be performed. Examples are
(see @w{IEEE 754}, @w{section 7}):
@enumerate
@item
Addition or subtraction: @math{@infinity{} - @infinity{}}. (But
@math{@infinity{} + @infinity{} = @infinity{}}).
@item
Multiplication: @math{0 @mul{} @infinity{}}.
@item
Division: @math{0/0} or @math{@infinity{}/@infinity{}}.
@item
Remainder: @math{x} REM @math{y}, where @math{y} is zero or @math{x} is
infinite.
@item
Square root if the operand is less than zero. More generally, any
mathematical function evaluated outside its domain produces this
exception.
@item
Conversion of a floating-point number to an integer or decimal
string, when the number cannot be represented in the target format (due
to overflow, infinity, or NaN).
@item
Conversion of an unrecognizable input string.
@item
Comparison via predicates involving @math{<} or @math{>}, when one or
other of the operands is NaN. You can prevent this exception by using
the unordered comparison functions instead; see @ref{FP Comparison Functions}.
@end enumerate
If the exception does not trap, the result of the operation is NaN.
@item Division by Zero
This exception is raised when a finite nonzero number is divided
by zero. If no trap occurs the result is either @math{+@infinity{}} or
@math{-@infinity{}}, depending on the signs of the operands.
@item Overflow
This exception is raised whenever the result cannot be represented
as a finite value in the precision format of the destination. If no trap
occurs the result depends on the sign of the intermediate result and the
current rounding mode (@w{IEEE 754}, @w{section 7.3}):
@enumerate
@item
Round to nearest carries all overflows to @math{@infinity{}}
with the sign of the intermediate result.
@item
Round toward @math{0} carries all overflows to the largest representable
finite number with the sign of the intermediate result.
@item
Round toward @math{-@infinity{}} carries positive overflows to the
largest representable finite number and negative overflows to
@math{-@infinity{}}.
@item
Round toward @math{@infinity{}} carries negative overflows to the
most negative representable finite number and positive overflows
to @math{@infinity{}}.
@end enumerate
Whenever the overflow exception is raised, the inexact exception is also
raised.
@item Underflow
The underflow exception is raised when an intermediate result is too
small to be calculated accurately, or if the operation's result rounded
to the destination precision is too small to be normalized.
When no trap is installed for the underflow exception, underflow is
signaled (via the underflow flag) only when both tininess and loss of
accuracy have been detected. If no trap handler is installed the
operation continues with an imprecise small value, or zero if the
destination precision cannot hold the small exact result.
@item Inexact
This exception is signalled if a rounded result is not exact (such as
when calculating the square root of two) or a result overflows without
an overflow trap.
@end table
@node Infinity and NaN
@subsection Infinity and NaN
@cindex infinity
@cindex not a number
@cindex NaN
@w{IEEE 754} floating point numbers can represent positive or negative
infinity, and @dfn{NaN} (not a number). These three values arise from
calculations whose result is undefined or cannot be represented
accurately. You can also deliberately set a floating-point variable to
any of them, which is sometimes useful. Some examples of calculations
that produce infinity or NaN:
@ifnottex
@smallexample
@math{1/0 = @infinity{}}
@math{log (0) = -@infinity{}}
@math{sqrt (-1) = NaN}
@end smallexample
@end ifnottex
@tex
$${1\over0} = \infty$$
$$\log 0 = -\infty$$
$$\sqrt{-1} = \hbox{NaN}$$
@end tex
When a calculation produces any of these values, an exception also
occurs; see @ref{FP Exceptions}.
The basic operations and math functions all accept infinity and NaN and
produce sensible output. Infinities propagate through calculations as
one would expect: for example, @math{2 + @infinity{} = @infinity{}},
@math{4/@infinity{} = 0}, atan @math{(@infinity{}) = @pi{}/2}. NaN, on
the other hand, infects any calculation that involves it. Unless the
calculation would produce the same result no matter what real value
replaced NaN, the result is NaN.
In comparison operations, positive infinity is larger than all values
except itself and NaN, and negative infinity is smaller than all values
except itself and NaN. NaN is @dfn{unordered}: it is not equal to,
greater than, or less than anything, @emph{including itself}. @code{x ==
x} is false if the value of @code{x} is NaN. You can use this to test
whether a value is NaN or not, but the recommended way to test for NaN
is with the @code{isnan} function (@pxref{Floating Point Classes}). In
addition, @code{<}, @code{>}, @code{<=}, and @code{>=} will raise an
exception when applied to NaNs.
@file{math.h} defines macros that allow you to explicitly set a variable
to infinity or NaN.
@deftypevr Macro float INFINITY
@standards{ISO, math.h}
An expression representing positive infinity. It is equal to the value
produced by mathematical operations like @code{1.0 / 0.0}.
@code{-INFINITY} represents negative infinity.
You can test whether a floating-point value is infinite by comparing it
to this macro. However, this is not recommended; you should use the
@code{isfinite} macro instead. @xref{Floating Point Classes}.
This macro was introduced in the @w{ISO C99} standard.
@end deftypevr
@deftypevr Macro float NAN
@standards{GNU, math.h}
An expression representing a value which is ``not a number''. This
macro is a GNU extension, available only on machines that support the
``not a number'' value---that is to say, on all machines that support
IEEE floating point.
You can use @samp{#ifdef NAN} to test whether the machine supports
NaN. (Of course, you must arrange for GNU extensions to be visible,
such as by defining @code{_GNU_SOURCE}, and then you must include
@file{math.h}.)
@end deftypevr
@deftypevr Macro float SNANF
@deftypevrx Macro double SNAN
@deftypevrx Macro {long double} SNANL
@deftypevrx Macro _FloatN SNANFN
@deftypevrx Macro _FloatNx SNANFNx
@standards{TS 18661-1:2014, math.h}
@standardsx{SNANFN, TS 18661-3:2015, math.h}
@standardsx{SNANFNx, TS 18661-3:2015, math.h}
These macros, defined by TS 18661-1:2014 and TS 18661-3:2015, are
constant expressions for signaling NaNs.
@end deftypevr
@deftypevr Macro int FE_SNANS_ALWAYS_SIGNAL
@standards{ISO, fenv.h}
This macro, defined by TS 18661-1:2014, is defined to @code{1} in
@file{fenv.h} to indicate that functions and operations with signaling
NaN inputs and floating-point results always raise the invalid
exception and return a quiet NaN, even in cases (such as @code{fmax},
@code{hypot} and @code{pow}) where a quiet NaN input can produce a
non-NaN result. Because some compiler optimizations may not handle
signaling NaNs correctly, this macro is only defined if compiler
support for signaling NaNs is enabled. That support can be enabled
with the GCC option @option{-fsignaling-nans}.
@end deftypevr
@w{IEEE 754} also allows for another unusual value: negative zero. This
value is produced when you divide a positive number by negative
infinity, or when a negative result is smaller than the limits of
representation.
@node Status bit operations
@subsection Examining the FPU status word
@w{ISO C99} defines functions to query and manipulate the
floating-point status word. You can use these functions to check for
untrapped exceptions when it's convenient, rather than worrying about
them in the middle of a calculation.
These constants represent the various @w{IEEE 754} exceptions. Not all
FPUs report all the different exceptions. Each constant is defined if
and only if the FPU you are compiling for supports that exception, so
you can test for FPU support with @samp{#ifdef}. They are defined in
@file{fenv.h}.
@vtable @code
@item FE_INEXACT
@standards{ISO, fenv.h}
The inexact exception.
@item FE_DIVBYZERO
@standards{ISO, fenv.h}
The divide by zero exception.
@item FE_UNDERFLOW
@standards{ISO, fenv.h}
The underflow exception.
@item FE_OVERFLOW
@standards{ISO, fenv.h}
The overflow exception.
@item FE_INVALID
@standards{ISO, fenv.h}
The invalid exception.
@end vtable
The macro @code{FE_ALL_EXCEPT} is the bitwise OR of all exception macros
which are supported by the FP implementation.
These functions allow you to clear exception flags, test for exceptions,
and save and restore the set of exceptions flagged.
@deftypefun int feclearexcept (int @var{excepts})
@standards{ISO, fenv.h}
@safety{@prelim{}@mtsafe{}@assafe{@assposix{}}@acsafe{@acsposix{}}}
@c The other functions in this section that modify FP status register
@c mostly do so with non-atomic load-modify-store sequences, but since
@c the register is thread-specific, this should be fine, and safe for
@c cancellation. As long as the FP environment is restored before the
@c signal handler returns control to the interrupted thread (like any
@c kernel should do), the functions are also safe for use in signal
@c handlers.
This function clears all of the supported exception flags indicated by
@var{excepts}.
The function returns zero in case the operation was successful, a
non-zero value otherwise.
@end deftypefun
@deftypefun int feraiseexcept (int @var{excepts})
@standards{ISO, fenv.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
This function raises the supported exceptions indicated by
@var{excepts}. If more than one exception bit in @var{excepts} is set
the order in which the exceptions are raised is undefined except that
overflow (@code{FE_OVERFLOW}) or underflow (@code{FE_UNDERFLOW}) are
raised before inexact (@code{FE_INEXACT}). Whether for overflow or
underflow the inexact exception is also raised is also implementation
dependent.
The function returns zero in case the operation was successful, a
non-zero value otherwise.
@end deftypefun
@deftypefun int fesetexcept (int @var{excepts})
@standards{ISO, fenv.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
This function sets the supported exception flags indicated by
@var{excepts}, like @code{feraiseexcept}, but without causing enabled
traps to be taken. @code{fesetexcept} is from TS 18661-1:2014.
The function returns zero in case the operation was successful, a
non-zero value otherwise.
@end deftypefun
@deftypefun int fetestexcept (int @var{excepts})
@standards{ISO, fenv.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
Test whether the exception flags indicated by the parameter @var{except}
are currently set. If any of them are, a nonzero value is returned
which specifies which exceptions are set. Otherwise the result is zero.
@end deftypefun
To understand these functions, imagine that the status word is an
integer variable named @var{status}. @code{feclearexcept} is then
equivalent to @samp{status &= ~excepts} and @code{fetestexcept} is
equivalent to @samp{(status & excepts)}. The actual implementation may
be very different, of course.
Exception flags are only cleared when the program explicitly requests it,
by calling @code{feclearexcept}. If you want to check for exceptions
from a set of calculations, you should clear all the flags first. Here
is a simple example of the way to use @code{fetestexcept}:
@smallexample
@{
double f;
int raised;
feclearexcept (FE_ALL_EXCEPT);
f = compute ();
raised = fetestexcept (FE_OVERFLOW | FE_INVALID);
if (raised & FE_OVERFLOW) @{ /* @dots{} */ @}
if (raised & FE_INVALID) @{ /* @dots{} */ @}
/* @dots{} */
@}
@end smallexample
You cannot explicitly set bits in the status word. You can, however,
save the entire status word and restore it later. This is done with the
following functions:
@deftypefun int fegetexceptflag (fexcept_t *@var{flagp}, int @var{excepts})
@standards{ISO, fenv.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
This function stores in the variable pointed to by @var{flagp} an
implementation-defined value representing the current setting of the
exception flags indicated by @var{excepts}.
The function returns zero in case the operation was successful, a
non-zero value otherwise.
@end deftypefun
@deftypefun int fesetexceptflag (const fexcept_t *@var{flagp}, int @var{excepts})
@standards{ISO, fenv.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
This function restores the flags for the exceptions indicated by
@var{excepts} to the values stored in the variable pointed to by
@var{flagp}.
The function returns zero in case the operation was successful, a
non-zero value otherwise.
@end deftypefun
Note that the value stored in @code{fexcept_t} bears no resemblance to
the bit mask returned by @code{fetestexcept}. The type may not even be
an integer. Do not attempt to modify an @code{fexcept_t} variable.
@deftypefun int fetestexceptflag (const fexcept_t *@var{flagp}, int @var{excepts})
@standards{ISO, fenv.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
Test whether the exception flags indicated by the parameter
@var{excepts} are set in the variable pointed to by @var{flagp}. If
any of them are, a nonzero value is returned which specifies which
exceptions are set. Otherwise the result is zero.
@code{fetestexceptflag} is from TS 18661-1:2014.
@end deftypefun
@node Math Error Reporting
@subsection Error Reporting by Mathematical Functions
@cindex errors, mathematical
@cindex domain error
@cindex range error
Many of the math functions are defined only over a subset of the real or
complex numbers. Even if they are mathematically defined, their result
may be larger or smaller than the range representable by their return
type without loss of accuracy. These are known as @dfn{domain errors},
@dfn{overflows}, and
@dfn{underflows}, respectively. Math functions do several things when
one of these errors occurs. In this manual we will refer to the
complete response as @dfn{signalling} a domain error, overflow, or
underflow.
When a math function suffers a domain error, it raises the invalid
exception and returns NaN. It also sets @code{errno} to @code{EDOM};
this is for compatibility with old systems that do not support @w{IEEE
754} exception handling. Likewise, when overflow occurs, math
functions raise the overflow exception and, in the default rounding
mode, return @math{@infinity{}} or @math{-@infinity{}} as appropriate
(in other rounding modes, the largest finite value of the appropriate
sign is returned when appropriate for that rounding mode). They also
set @code{errno} to @code{ERANGE} if returning @math{@infinity{}} or
@math{-@infinity{}}; @code{errno} may or may not be set to
@code{ERANGE} when a finite value is returned on overflow. When
underflow occurs, the underflow exception is raised, and zero
(appropriately signed) or a subnormal value, as appropriate for the
mathematical result of the function and the rounding mode, is
returned. @code{errno} may be set to @code{ERANGE}, but this is not
guaranteed; it is intended that @theglibc{} should set it when the
underflow is to an appropriately signed zero, but not necessarily for
other underflows.
When a math function has an argument that is a signaling NaN,
@theglibc{} does not consider this a domain error, so @code{errno} is
unchanged, but the invalid exception is still raised (except for a few
functions that are specified to handle signaling NaNs differently).
Some of the math functions are defined mathematically to result in a
complex value over parts of their domains. The most familiar example of
this is taking the square root of a negative number. The complex math
functions, such as @code{csqrt}, will return the appropriate complex value
in this case. The real-valued functions, such as @code{sqrt}, will
signal a domain error.
Some older hardware does not support infinities. On that hardware,
overflows instead return a particular very large number (usually the
largest representable number). @file{math.h} defines macros you can use
to test for overflow on both old and new hardware.
@deftypevr Macro double HUGE_VAL
@deftypevrx Macro float HUGE_VALF
@deftypevrx Macro {long double} HUGE_VALL
@deftypevrx Macro _FloatN HUGE_VAL_FN
@deftypevrx Macro _FloatNx HUGE_VAL_FNx
@standards{ISO, math.h}
@standardsx{HUGE_VAL_FN, TS 18661-3:2015, math.h}
@standardsx{HUGE_VAL_FNx, TS 18661-3:2015, math.h}
An expression representing a particular very large number. On machines
that use @w{IEEE 754} floating point format, @code{HUGE_VAL} is infinity.
On other machines, it's typically the largest positive number that can
be represented.
Mathematical functions return the appropriately typed version of
@code{HUGE_VAL} or @code{@minus{}HUGE_VAL} when the result is too large
to be represented.
@end deftypevr
@node Rounding
@section Rounding Modes
Floating-point calculations are carried out internally with extra
precision, and then rounded to fit into the destination type. This
ensures that results are as precise as the input data. @w{IEEE 754}
defines four possible rounding modes:
@table @asis
@item Round to nearest.
This is the default mode. It should be used unless there is a specific
need for one of the others. In this mode results are rounded to the
nearest representable value. If the result is midway between two
representable values, the even representable is chosen. @dfn{Even} here
means the lowest-order bit is zero. This rounding mode prevents
statistical bias and guarantees numeric stability: round-off errors in a
lengthy calculation will remain smaller than half of @code{FLT_EPSILON}.
@c @item Round toward @math{+@infinity{}}
@item Round toward plus Infinity.
All results are rounded to the smallest representable value
which is greater than the result.
@c @item Round toward @math{-@infinity{}}
@item Round toward minus Infinity.
All results are rounded to the largest representable value which is less
than the result.
@item Round toward zero.
All results are rounded to the largest representable value whose
magnitude is less than that of the result. In other words, if the
result is negative it is rounded up; if it is positive, it is rounded
down.
@end table
@noindent
@file{fenv.h} defines constants which you can use to refer to the
various rounding modes. Each one will be defined if and only if the FPU
supports the corresponding rounding mode.
@vtable @code
@item FE_TONEAREST
@standards{ISO, fenv.h}
Round to nearest.
@item FE_UPWARD
@standards{ISO, fenv.h}
Round toward @math{+@infinity{}}.
@item FE_DOWNWARD
@standards{ISO, fenv.h}
Round toward @math{-@infinity{}}.
@item FE_TOWARDZERO
@standards{ISO, fenv.h}
Round toward zero.
@end vtable
Underflow is an unusual case. Normally, @w{IEEE 754} floating point
numbers are always normalized (@pxref{Floating Point Concepts}).
Numbers smaller than @math{2^r} (where @math{r} is the minimum exponent,
@code{FLT_MIN_RADIX-1} for @var{float}) cannot be represented as
normalized numbers. Rounding all such numbers to zero or @math{2^r}
would cause some algorithms to fail at 0. Therefore, they are left in
denormalized form. That produces loss of precision, since some bits of
the mantissa are stolen to indicate the decimal point.
If a result is too small to be represented as a denormalized number, it
is rounded to zero. However, the sign of the result is preserved; if
the calculation was negative, the result is @dfn{negative zero}.
Negative zero can also result from some operations on infinity, such as
@math{4/-@infinity{}}.
At any time, one of the above four rounding modes is selected. You can
find out which one with this function:
@deftypefun int fegetround (void)
@standards{ISO, fenv.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
Returns the currently selected rounding mode, represented by one of the
values of the defined rounding mode macros.
@end deftypefun
@noindent
To change the rounding mode, use this function:
@deftypefun int fesetround (int @var{round})
@standards{ISO, fenv.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
Changes the currently selected rounding mode to @var{round}. If
@var{round} does not correspond to one of the supported rounding modes
nothing is changed. @code{fesetround} returns zero if it changed the
rounding mode, or a nonzero value if the mode is not supported.
@end deftypefun
You should avoid changing the rounding mode if possible. It can be an
expensive operation; also, some hardware requires you to compile your
program differently for it to work. The resulting code may run slower.
See your compiler documentation for details.
@c This section used to claim that functions existed to round one number
@c in a specific fashion. I can't find any functions in the library
@c that do that. -zw
@node Control Functions
@section Floating-Point Control Functions
@w{IEEE 754} floating-point implementations allow the programmer to
decide whether traps will occur for each of the exceptions, by setting
bits in the @dfn{control word}. In C, traps result in the program
receiving the @code{SIGFPE} signal; see @ref{Signal Handling}.
@strong{NB:} @w{IEEE 754} says that trap handlers are given details of
the exceptional situation, and can set the result value. C signals do
not provide any mechanism to pass this information back and forth.
Trapping exceptions in C is therefore not very useful.
It is sometimes necessary to save the state of the floating-point unit
while you perform some calculation. The library provides functions
which save and restore the exception flags, the set of exceptions that
generate traps, and the rounding mode. This information is known as the
@dfn{floating-point environment}.
The functions to save and restore the floating-point environment all use
a variable of type @code{fenv_t} to store information. This type is
defined in @file{fenv.h}. Its size and contents are
implementation-defined. You should not attempt to manipulate a variable
of this type directly.
To save the state of the FPU, use one of these functions:
@deftypefun int fegetenv (fenv_t *@var{envp})
@standards{ISO, fenv.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
Store the floating-point environment in the variable pointed to by
@var{envp}.
The function returns zero in case the operation was successful, a
non-zero value otherwise.
@end deftypefun
@deftypefun int feholdexcept (fenv_t *@var{envp})
@standards{ISO, fenv.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
Store the current floating-point environment in the object pointed to by
@var{envp}. Then clear all exception flags, and set the FPU to trap no
exceptions. Not all FPUs support trapping no exceptions; if
@code{feholdexcept} cannot set this mode, it returns nonzero value. If it
succeeds, it returns zero.
@end deftypefun
The functions which restore the floating-point environment can take these
kinds of arguments:
@itemize @bullet
@item
Pointers to @code{fenv_t} objects, which were initialized previously by a
call to @code{fegetenv} or @code{feholdexcept}.
@item
@vindex FE_DFL_ENV
The special macro @code{FE_DFL_ENV} which represents the floating-point
environment as it was available at program start.
@item
Implementation defined macros with names starting with @code{FE_} and
having type @code{fenv_t *}.
@vindex FE_NOMASK_ENV
If possible, @theglibc{} defines a macro @code{FE_NOMASK_ENV}
which represents an environment where every exception raised causes a
trap to occur. You can test for this macro using @code{#ifdef}. It is
only defined if @code{_GNU_SOURCE} is defined.
Some platforms might define other predefined environments.
@end itemize
@noindent
To set the floating-point environment, you can use either of these
functions:
@deftypefun int fesetenv (const fenv_t *@var{envp})
@standards{ISO, fenv.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
Set the floating-point environment to that described by @var{envp}.
The function returns zero in case the operation was successful, a
non-zero value otherwise.
@end deftypefun
@deftypefun int feupdateenv (const fenv_t *@var{envp})
@standards{ISO, fenv.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
Like @code{fesetenv}, this function sets the floating-point environment
to that described by @var{envp}. However, if any exceptions were
flagged in the status word before @code{feupdateenv} was called, they
remain flagged after the call. In other words, after @code{feupdateenv}
is called, the status word is the bitwise OR of the previous status word
and the one saved in @var{envp}.
The function returns zero in case the operation was successful, a
non-zero value otherwise.
@end deftypefun
@noindent
TS 18661-1:2014 defines additional functions to save and restore
floating-point control modes (such as the rounding mode and whether
traps are enabled) while leaving other status (such as raised flags)
unchanged.
@vindex FE_DFL_MODE
The special macro @code{FE_DFL_MODE} may be passed to
@code{fesetmode}. It represents the floating-point control modes at
program start.
@deftypefun int fegetmode (femode_t *@var{modep})
@standards{ISO, fenv.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
Store the floating-point control modes in the variable pointed to by
@var{modep}.
The function returns zero in case the operation was successful, a
non-zero value otherwise.
@end deftypefun
@deftypefun int fesetmode (const femode_t *@var{modep})
@standards{ISO, fenv.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
Set the floating-point control modes to those described by
@var{modep}.
The function returns zero in case the operation was successful, a
non-zero value otherwise.
@end deftypefun
@noindent
To control for individual exceptions if raising them causes a trap to
occur, you can use the following two functions.
@strong{Portability Note:} These functions are all GNU extensions.
@deftypefun int feenableexcept (int @var{excepts})
@standards{GNU, fenv.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
This function enables traps for each of the exceptions as indicated by
the parameter @var{excepts}. The individual exceptions are described in
@ref{Status bit operations}. Only the specified exceptions are
enabled, the status of the other exceptions is not changed.
The function returns the previous enabled exceptions in case the
operation was successful, @code{-1} otherwise.
@end deftypefun
@deftypefun int fedisableexcept (int @var{excepts})
@standards{GNU, fenv.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
This function disables traps for each of the exceptions as indicated by
the parameter @var{excepts}. The individual exceptions are described in
@ref{Status bit operations}. Only the specified exceptions are
disabled, the status of the other exceptions is not changed.
The function returns the previous enabled exceptions in case the
operation was successful, @code{-1} otherwise.
@end deftypefun
@deftypefun int fegetexcept (void)
@standards{GNU, fenv.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
The function returns a bitmask of all currently enabled exceptions. It
returns @code{-1} in case of failure.
@end deftypefun
@node Arithmetic Functions
@section Arithmetic Functions
The C library provides functions to do basic operations on
floating-point numbers. These include absolute value, maximum and minimum,
normalization, bit twiddling, rounding, and a few others.
@menu
* Absolute Value:: Absolute values of integers and floats.
* Normalization Functions:: Extracting exponents and putting them back.
* Rounding Functions:: Rounding floats to integers.
* Remainder Functions:: Remainders on division, precisely defined.
* FP Bit Twiddling:: Sign bit adjustment. Adding epsilon.
* FP Comparison Functions:: Comparisons without risk of exceptions.
* Misc FP Arithmetic:: Max, min, positive difference, multiply-add.
@end menu
@node Absolute Value
@subsection Absolute Value
@cindex absolute value functions
These functions are provided for obtaining the @dfn{absolute value} (or
@dfn{magnitude}) of a number. The absolute value of a real number
@var{x} is @var{x} if @var{x} is positive, @minus{}@var{x} if @var{x} is
negative. For a complex number @var{z}, whose real part is @var{x} and
whose imaginary part is @var{y}, the absolute value is @w{@code{sqrt
(@var{x}*@var{x} + @var{y}*@var{y})}}.
@pindex math.h
@pindex stdlib.h
Prototypes for @code{abs}, @code{labs} and @code{llabs} are in @file{stdlib.h};
@code{imaxabs} is declared in @file{inttypes.h};
the @code{fabs} functions are declared in @file{math.h};
the @code{cabs} functions are declared in @file{complex.h}.
@deftypefun int abs (int @var{number})
@deftypefunx {long int} labs (long int @var{number})
@deftypefunx {long long int} llabs (long long int @var{number})
@deftypefunx intmax_t imaxabs (intmax_t @var{number})
@standards{ISO, stdlib.h}
@standardsx{imaxabs, ISO, inttypes.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
These functions return the absolute value of @var{number}.
Most computers use a two's complement integer representation, in which
the absolute value of @code{INT_MIN} (the smallest possible @code{int})
cannot be represented; thus, @w{@code{abs (INT_MIN)}} is not defined.
@code{llabs} and @code{imaxdiv} are new to @w{ISO C99}.
See @ref{Integers} for a description of the @code{intmax_t} type.
@end deftypefun
@deftypefun double fabs (double @var{number})
@deftypefunx float fabsf (float @var{number})
@deftypefunx {long double} fabsl (long double @var{number})
@deftypefunx _FloatN fabsfN (_Float@var{N} @var{number})
@deftypefunx _FloatNx fabsfNx (_Float@var{N}x @var{number})
@standards{ISO, math.h}
@standardsx{fabsfN, TS 18661-3:2015, math.h}
@standardsx{fabsfNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
This function returns the absolute value of the floating-point number
@var{number}.
@end deftypefun
@deftypefun double cabs (complex double @var{z})
@deftypefunx float cabsf (complex float @var{z})
@deftypefunx {long double} cabsl (complex long double @var{z})
@deftypefunx _FloatN cabsfN (complex _Float@var{N} @var{z})
@deftypefunx _FloatNx cabsfNx (complex _Float@var{N}x @var{z})
@standards{ISO, complex.h}
@standardsx{cabsfN, TS 18661-3:2015, complex.h}
@standardsx{cabsfNx, TS 18661-3:2015, complex.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
These functions return the absolute value of the complex number @var{z}
(@pxref{Complex Numbers}). The absolute value of a complex number is:
@smallexample
sqrt (creal (@var{z}) * creal (@var{z}) + cimag (@var{z}) * cimag (@var{z}))
@end smallexample
This function should always be used instead of the direct formula
because it takes special care to avoid losing precision. It may also
take advantage of hardware support for this operation. See @code{hypot}
in @ref{Exponents and Logarithms}.
@end deftypefun
@node Normalization Functions
@subsection Normalization Functions
@cindex normalization functions (floating-point)
The functions described in this section are primarily provided as a way
to efficiently perform certain low-level manipulations on floating point
numbers that are represented internally using a binary radix;
see @ref{Floating Point Concepts}. These functions are required to
have equivalent behavior even if the representation does not use a radix
of 2, but of course they are unlikely to be particularly efficient in
those cases.
@pindex math.h
All these functions are declared in @file{math.h}.
@deftypefun double frexp (double @var{value}, int *@var{exponent})
@deftypefunx float frexpf (float @var{value}, int *@var{exponent})
@deftypefunx {long double} frexpl (long double @var{value}, int *@var{exponent})
@deftypefunx _FloatN frexpfN (_Float@var{N} @var{value}, int *@var{exponent})
@deftypefunx _FloatNx frexpfNx (_Float@var{N}x @var{value}, int *@var{exponent})
@standards{ISO, math.h}
@standardsx{frexpfN, TS 18661-3:2015, math.h}
@standardsx{frexpfNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
These functions are used to split the number @var{value}
into a normalized fraction and an exponent.
If the argument @var{value} is not zero, the return value is @var{value}
times a power of two, and its magnitude is always in the range 1/2
(inclusive) to 1 (exclusive). The corresponding exponent is stored in
@code{*@var{exponent}}; the return value multiplied by 2 raised to this
exponent equals the original number @var{value}.
For example, @code{frexp (12.8, &exponent)} returns @code{0.8} and
stores @code{4} in @code{exponent}.
If @var{value} is zero, then the return value is zero and
zero is stored in @code{*@var{exponent}}.
@end deftypefun
@deftypefun double ldexp (double @var{value}, int @var{exponent})
@deftypefunx float ldexpf (float @var{value}, int @var{exponent})
@deftypefunx {long double} ldexpl (long double @var{value}, int @var{exponent})
@deftypefunx _FloatN ldexpfN (_Float@var{N} @var{value}, int @var{exponent})
@deftypefunx _FloatNx ldexpfNx (_Float@var{N}x @var{value}, int @var{exponent})
@standards{ISO, math.h}
@standardsx{ldexpfN, TS 18661-3:2015, math.h}
@standardsx{ldexpfNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
These functions return the result of multiplying the floating-point
number @var{value} by 2 raised to the power @var{exponent}. (It can
be used to reassemble floating-point numbers that were taken apart
by @code{frexp}.)
For example, @code{ldexp (0.8, 4)} returns @code{12.8}.
@end deftypefun
The following functions, which come from BSD, provide facilities
equivalent to those of @code{ldexp} and @code{frexp}. See also the
@w{ISO C} function @code{logb} which originally also appeared in BSD.
The @code{_Float@var{N}} and @code{_Float@var{N}} variants of the
following functions come from TS 18661-3:2015.
@deftypefun double scalb (double @var{value}, double @var{exponent})
@deftypefunx float scalbf (float @var{value}, float @var{exponent})
@deftypefunx {long double} scalbl (long double @var{value}, long double @var{exponent})
@standards{BSD, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
The @code{scalb} function is the BSD name for @code{ldexp}.
@end deftypefun
@deftypefun double scalbn (double @var{x}, int @var{n})
@deftypefunx float scalbnf (float @var{x}, int @var{n})
@deftypefunx {long double} scalbnl (long double @var{x}, int @var{n})
@deftypefunx _FloatN scalbnfN (_Float@var{N} @var{x}, int @var{n})
@deftypefunx _FloatNx scalbnfNx (_Float@var{N}x @var{x}, int @var{n})
@standards{BSD, math.h}
@standardsx{scalbnfN, TS 18661-3:2015, math.h}
@standardsx{scalbnfNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
@code{scalbn} is identical to @code{scalb}, except that the exponent
@var{n} is an @code{int} instead of a floating-point number.
@end deftypefun
@deftypefun double scalbln (double @var{x}, long int @var{n})
@deftypefunx float scalblnf (float @var{x}, long int @var{n})
@deftypefunx {long double} scalblnl (long double @var{x}, long int @var{n})
@deftypefunx _FloatN scalblnfN (_Float@var{N} @var{x}, long int @var{n})
@deftypefunx _FloatNx scalblnfNx (_Float@var{N}x @var{x}, long int @var{n})
@standards{BSD, math.h}
@standardsx{scalblnfN, TS 18661-3:2015, math.h}
@standardsx{scalblnfNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
@code{scalbln} is identical to @code{scalb}, except that the exponent
@var{n} is a @code{long int} instead of a floating-point number.
@end deftypefun
@deftypefun double significand (double @var{x})
@deftypefunx float significandf (float @var{x})
@deftypefunx {long double} significandl (long double @var{x})
@standards{BSD, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
@code{significand} returns the mantissa of @var{x} scaled to the range
@math{[1, 2)}.
It is equivalent to @w{@code{scalb (@var{x}, (double) -ilogb (@var{x}))}}.
This function exists mainly for use in certain standardized tests
of @w{IEEE 754} conformance.
@end deftypefun
@node Rounding Functions
@subsection Rounding Functions
@cindex converting floats to integers
@pindex math.h
The functions listed here perform operations such as rounding and
truncation of floating-point values. Some of these functions convert
floating point numbers to integer values. They are all declared in
@file{math.h}.
You can also convert floating-point numbers to integers simply by
casting them to @code{int}. This discards the fractional part,
effectively rounding towards zero. However, this only works if the
result can actually be represented as an @code{int}---for very large
numbers, this is impossible. The functions listed here return the
result as a @code{double} instead to get around this problem.
The @code{fromfp} functions use the following macros, from TS
18661-1:2014, to specify the direction of rounding. These correspond
to the rounding directions defined in IEEE 754-2008.
@vtable @code
@item FP_INT_UPWARD
@standards{ISO, math.h}
Round toward @math{+@infinity{}}.
@item FP_INT_DOWNWARD
@standards{ISO, math.h}
Round toward @math{-@infinity{}}.
@item FP_INT_TOWARDZERO
@standards{ISO, math.h}
Round toward zero.
@item FP_INT_TONEARESTFROMZERO
@standards{ISO, math.h}
Round to nearest, ties round away from zero.
@item FP_INT_TONEAREST
@standards{ISO, math.h}
Round to nearest, ties round to even.
@end vtable
@deftypefun double ceil (double @var{x})
@deftypefunx float ceilf (float @var{x})
@deftypefunx {long double} ceill (long double @var{x})
@deftypefunx _FloatN ceilfN (_Float@var{N} @var{x})
@deftypefunx _FloatNx ceilfNx (_Float@var{N}x @var{x})
@standards{ISO, math.h}
@standardsx{ceilfN, TS 18661-3:2015, math.h}
@standardsx{ceilfNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
These functions round @var{x} upwards to the nearest integer,
returning that value as a @code{double}. Thus, @code{ceil (1.5)}
is @code{2.0}.
@end deftypefun
@deftypefun double floor (double @var{x})
@deftypefunx float floorf (float @var{x})
@deftypefunx {long double} floorl (long double @var{x})
@deftypefunx _FloatN floorfN (_Float@var{N} @var{x})
@deftypefunx _FloatNx floorfNx (_Float@var{N}x @var{x})
@standards{ISO, math.h}
@standardsx{floorfN, TS 18661-3:2015, math.h}
@standardsx{floorfNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
These functions round @var{x} downwards to the nearest
integer, returning that value as a @code{double}. Thus, @code{floor
(1.5)} is @code{1.0} and @code{floor (-1.5)} is @code{-2.0}.
@end deftypefun
@deftypefun double trunc (double @var{x})
@deftypefunx float truncf (float @var{x})
@deftypefunx {long double} truncl (long double @var{x})
@deftypefunx _FloatN truncfN (_Float@var{N} @var{x})
@deftypefunx _FloatNx truncfNx (_Float@var{N}x @var{x})
@standards{ISO, math.h}
@standardsx{truncfN, TS 18661-3:2015, math.h}
@standardsx{truncfNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
The @code{trunc} functions round @var{x} towards zero to the nearest
integer (returned in floating-point format). Thus, @code{trunc (1.5)}
is @code{1.0} and @code{trunc (-1.5)} is @code{-1.0}.
@end deftypefun
@deftypefun double rint (double @var{x})
@deftypefunx float rintf (float @var{x})
@deftypefunx {long double} rintl (long double @var{x})
@deftypefunx _FloatN rintfN (_Float@var{N} @var{x})
@deftypefunx _FloatNx rintfNx (_Float@var{N}x @var{x})
@standards{ISO, math.h}
@standardsx{rintfN, TS 18661-3:2015, math.h}
@standardsx{rintfNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
These functions round @var{x} to an integer value according to the
current rounding mode. @xref{Floating Point Parameters}, for
information about the various rounding modes. The default
rounding mode is to round to the nearest integer; some machines
support other modes, but round-to-nearest is always used unless
you explicitly select another.
If @var{x} was not initially an integer, these functions raise the
inexact exception.
@end deftypefun
@deftypefun double nearbyint (double @var{x})
@deftypefunx float nearbyintf (float @var{x})
@deftypefunx {long double} nearbyintl (long double @var{x})
@deftypefunx _FloatN nearbyintfN (_Float@var{N} @var{x})
@deftypefunx _FloatNx nearbyintfNx (_Float@var{N}x @var{x})
@standards{ISO, math.h}
@standardsx{nearbyintfN, TS 18661-3:2015, math.h}
@standardsx{nearbyintfNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
These functions return the same value as the @code{rint} functions, but
do not raise the inexact exception if @var{x} is not an integer.
@end deftypefun
@deftypefun double round (double @var{x})
@deftypefunx float roundf (float @var{x})
@deftypefunx {long double} roundl (long double @var{x})
@deftypefunx _FloatN roundfN (_Float@var{N} @var{x})
@deftypefunx _FloatNx roundfNx (_Float@var{N}x @var{x})
@standards{ISO, math.h}
@standardsx{roundfN, TS 18661-3:2015, math.h}
@standardsx{roundfNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
These functions are similar to @code{rint}, but they round halfway
cases away from zero instead of to the nearest integer (or other
current rounding mode).
@end deftypefun
@deftypefun double roundeven (double @var{x})
@deftypefunx float roundevenf (float @var{x})
@deftypefunx {long double} roundevenl (long double @var{x})
@deftypefunx _FloatN roundevenfN (_Float@var{N} @var{x})
@deftypefunx _FloatNx roundevenfNx (_Float@var{N}x @var{x})
@standards{ISO, math.h}
@standardsx{roundevenfN, TS 18661-3:2015, math.h}
@standardsx{roundevenfNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
These functions, from TS 18661-1:2014 and TS 18661-3:2015, are similar
to @code{round}, but they round halfway cases to even instead of away
from zero.
@end deftypefun
@deftypefun {long int} lrint (double @var{x})
@deftypefunx {long int} lrintf (float @var{x})
@deftypefunx {long int} lrintl (long double @var{x})
@deftypefunx {long int} lrintfN (_Float@var{N} @var{x})
@deftypefunx {long int} lrintfNx (_Float@var{N}x @var{x})
@standards{ISO, math.h}
@standardsx{lrintfN, TS 18661-3:2015, math.h}
@standardsx{lrintfNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
These functions are just like @code{rint}, but they return a
@code{long int} instead of a floating-point number.
@end deftypefun
@deftypefun {long long int} llrint (double @var{x})
@deftypefunx {long long int} llrintf (float @var{x})
@deftypefunx {long long int} llrintl (long double @var{x})
@deftypefunx {long long int} llrintfN (_Float@var{N} @var{x})
@deftypefunx {long long int} llrintfNx (_Float@var{N}x @var{x})
@standards{ISO, math.h}
@standardsx{llrintfN, TS 18661-3:2015, math.h}
@standardsx{llrintfNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
These functions are just like @code{rint}, but they return a
@code{long long int} instead of a floating-point number.
@end deftypefun
@deftypefun {long int} lround (double @var{x})
@deftypefunx {long int} lroundf (float @var{x})
@deftypefunx {long int} lroundl (long double @var{x})
@deftypefunx {long int} lroundfN (_Float@var{N} @var{x})
@deftypefunx {long int} lroundfNx (_Float@var{N}x @var{x})
@standards{ISO, math.h}
@standardsx{lroundfN, TS 18661-3:2015, math.h}
@standardsx{lroundfNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
These functions are just like @code{round}, but they return a
@code{long int} instead of a floating-point number.
@end deftypefun
@deftypefun {long long int} llround (double @var{x})
@deftypefunx {long long int} llroundf (float @var{x})
@deftypefunx {long long int} llroundl (long double @var{x})
@deftypefunx {long long int} llroundfN (_Float@var{N} @var{x})
@deftypefunx {long long int} llroundfNx (_Float@var{N}x @var{x})
@standards{ISO, math.h}
@standardsx{llroundfN, TS 18661-3:2015, math.h}
@standardsx{llroundfNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
These functions are just like @code{round}, but they return a
@code{long long int} instead of a floating-point number.
@end deftypefun
@deftypefun intmax_t fromfp (double @var{x}, int @var{round}, unsigned int @var{width})
@deftypefunx intmax_t fromfpf (float @var{x}, int @var{round}, unsigned int @var{width})
@deftypefunx intmax_t fromfpl (long double @var{x}, int @var{round}, unsigned int @var{width})
@deftypefunx intmax_t fromfpfN (_Float@var{N} @var{x}, int @var{round}, unsigned int @var{width})
@deftypefunx intmax_t fromfpfNx (_Float@var{N}x @var{x}, int @var{round}, unsigned int @var{width})
@deftypefunx uintmax_t ufromfp (double @var{x}, int @var{round}, unsigned int @var{width})
@deftypefunx uintmax_t ufromfpf (float @var{x}, int @var{round}, unsigned int @var{width})
@deftypefunx uintmax_t ufromfpl (long double @var{x}, int @var{round}, unsigned int @var{width})
@deftypefunx uintmax_t ufromfpfN (_Float@var{N} @var{x}, int @var{round}, unsigned int @var{width})
@deftypefunx uintmax_t ufromfpfNx (_Float@var{N}x @var{x}, int @var{round}, unsigned int @var{width})
@deftypefunx intmax_t fromfpx (double @var{x}, int @var{round}, unsigned int @var{width})
@deftypefunx intmax_t fromfpxf (float @var{x}, int @var{round}, unsigned int @var{width})
@deftypefunx intmax_t fromfpxl (long double @var{x}, int @var{round}, unsigned int @var{width})
@deftypefunx intmax_t fromfpxfN (_Float@var{N} @var{x}, int @var{round}, unsigned int @var{width})
@deftypefunx intmax_t fromfpxfNx (_Float@var{N}x @var{x}, int @var{round}, unsigned int @var{width})
@deftypefunx uintmax_t ufromfpx (double @var{x}, int @var{round}, unsigned int @var{width})
@deftypefunx uintmax_t ufromfpxf (float @var{x}, int @var{round}, unsigned int @var{width})
@deftypefunx uintmax_t ufromfpxl (long double @var{x}, int @var{round}, unsigned int @var{width})
@deftypefunx uintmax_t ufromfpxfN (_Float@var{N} @var{x}, int @var{round}, unsigned int @var{width})
@deftypefunx uintmax_t ufromfpxfNx (_Float@var{N}x @var{x}, int @var{round}, unsigned int @var{width})
@standards{ISO, math.h}
@standardsx{fromfpfN, TS 18661-3:2015, math.h}
@standardsx{fromfpfNx, TS 18661-3:2015, math.h}
@standardsx{ufromfpfN, TS 18661-3:2015, math.h}
@standardsx{ufromfpfNx, TS 18661-3:2015, math.h}
@standardsx{fromfpxfN, TS 18661-3:2015, math.h}
@standardsx{fromfpxfNx, TS 18661-3:2015, math.h}
@standardsx{ufromfpxfN, TS 18661-3:2015, math.h}
@standardsx{ufromfpxfNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
These functions, from TS 18661-1:2014 and TS 18661-3:2015, convert a
floating-point number to an integer according to the rounding direction
@var{round} (one of the @code{FP_INT_*} macros). If the integer is
outside the range of a signed or unsigned (depending on the return type
of the function) type of width @var{width} bits (or outside the range of
the return type, if @var{width} is larger), or if @var{x} is infinite or
NaN, or if @var{width} is zero, a domain error occurs and an unspecified
value is returned. The functions with an @samp{x} in their names raise
the inexact exception when a domain error does not occur and the
argument is not an integer; the other functions do not raise the inexact
exception.
@end deftypefun
@deftypefun double modf (double @var{value}, double *@var{integer-part})
@deftypefunx float modff (float @var{value}, float *@var{integer-part})
@deftypefunx {long double} modfl (long double @var{value}, long double *@var{integer-part})
@deftypefunx _FloatN modffN (_Float@var{N} @var{value}, _Float@var{N} *@var{integer-part})
@deftypefunx _FloatNx modffNx (_Float@var{N}x @var{value}, _Float@var{N}x *@var{integer-part})
@standards{ISO, math.h}
@standardsx{modffN, TS 18661-3:2015, math.h}
@standardsx{modffNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
These functions break the argument @var{value} into an integer part and a
fractional part (between @code{-1} and @code{1}, exclusive). Their sum
equals @var{value}. Each of the parts has the same sign as @var{value},
and the integer part is always rounded toward zero.
@code{modf} stores the integer part in @code{*@var{integer-part}}, and
returns the fractional part. For example, @code{modf (2.5, &intpart)}
returns @code{0.5} and stores @code{2.0} into @code{intpart}.
@end deftypefun
@node Remainder Functions
@subsection Remainder Functions
The functions in this section compute the remainder on division of two
floating-point numbers. Each is a little different; pick the one that
suits your problem.
@deftypefun double fmod (double @var{numerator}, double @var{denominator})
@deftypefunx float fmodf (float @var{numerator}, float @var{denominator})
@deftypefunx {long double} fmodl (long double @var{numerator}, long double @var{denominator})
@deftypefunx _FloatN fmodfN (_Float@var{N} @var{numerator}, _Float@var{N} @var{denominator})
@deftypefunx _FloatNx fmodfNx (_Float@var{N}x @var{numerator}, _Float@var{N}x @var{denominator})
@standards{ISO, math.h}
@standardsx{fmodfN, TS 18661-3:2015, math.h}
@standardsx{fmodfNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
These functions compute the remainder from the division of
@var{numerator} by @var{denominator}. Specifically, the return value is
@code{@var{numerator} - @w{@var{n} * @var{denominator}}}, where @var{n}
is the quotient of @var{numerator} divided by @var{denominator}, rounded
towards zero to an integer. Thus, @w{@code{fmod (6.5, 2.3)}} returns
@code{1.9}, which is @code{6.5} minus @code{4.6}.
The result has the same sign as the @var{numerator} and has magnitude
less than the magnitude of the @var{denominator}.
If @var{denominator} is zero, @code{fmod} signals a domain error.
@end deftypefun
@deftypefun double remainder (double @var{numerator}, double @var{denominator})
@deftypefunx float remainderf (float @var{numerator}, float @var{denominator})
@deftypefunx {long double} remainderl (long double @var{numerator}, long double @var{denominator})
@deftypefunx _FloatN remainderfN (_Float@var{N} @var{numerator}, _Float@var{N} @var{denominator})
@deftypefunx _FloatNx remainderfNx (_Float@var{N}x @var{numerator}, _Float@var{N}x @var{denominator})
@standards{ISO, math.h}
@standardsx{remainderfN, TS 18661-3:2015, math.h}
@standardsx{remainderfNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
These functions are like @code{fmod} except that they round the
internal quotient @var{n} to the nearest integer instead of towards zero
to an integer. For example, @code{remainder (6.5, 2.3)} returns
@code{-0.4}, which is @code{6.5} minus @code{6.9}.
The absolute value of the result is less than or equal to half the
absolute value of the @var{denominator}. The difference between
@code{fmod (@var{numerator}, @var{denominator})} and @code{remainder
(@var{numerator}, @var{denominator})} is always either
@var{denominator}, minus @var{denominator}, or zero.
If @var{denominator} is zero, @code{remainder} signals a domain error.
@end deftypefun
@deftypefun double drem (double @var{numerator}, double @var{denominator})
@deftypefunx float dremf (float @var{numerator}, float @var{denominator})
@deftypefunx {long double} dreml (long double @var{numerator}, long double @var{denominator})
@standards{BSD, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
This function is another name for @code{remainder}.
@end deftypefun
@node FP Bit Twiddling
@subsection Setting and modifying single bits of FP values
@cindex FP arithmetic
There are some operations that are too complicated or expensive to
perform by hand on floating-point numbers. @w{ISO C99} defines
functions to do these operations, which mostly involve changing single
bits.
@deftypefun double copysign (double @var{x}, double @var{y})
@deftypefunx float copysignf (float @var{x}, float @var{y})
@deftypefunx {long double} copysignl (long double @var{x}, long double @var{y})
@deftypefunx _FloatN copysignfN (_Float@var{N} @var{x}, _Float@var{N} @var{y})
@deftypefunx _FloatNx copysignfNx (_Float@var{N}x @var{x}, _Float@var{N}x @var{y})
@standards{ISO, math.h}
@standardsx{copysignfN, TS 18661-3:2015, math.h}
@standardsx{copysignfNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
These functions return @var{x} but with the sign of @var{y}. They work
even if @var{x} or @var{y} are NaN or zero. Both of these can carry a
sign (although not all implementations support it) and this is one of
the few operations that can tell the difference.
@code{copysign} never raises an exception.
@c except signalling NaNs
This function is defined in @w{IEC 559} (and the appendix with
recommended functions in @w{IEEE 754}/@w{IEEE 854}).
@end deftypefun
@deftypefun int signbit (@emph{float-type} @var{x})
@standards{ISO, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
@code{signbit} is a generic macro which can work on all floating-point
types. It returns a nonzero value if the value of @var{x} has its sign
bit set.
This is not the same as @code{x < 0.0}, because @w{IEEE 754} floating
point allows zero to be signed. The comparison @code{-0.0 < 0.0} is
false, but @code{signbit (-0.0)} will return a nonzero value.
@end deftypefun
@deftypefun double nextafter (double @var{x}, double @var{y})
@deftypefunx float nextafterf (float @var{x}, float @var{y})
@deftypefunx {long double} nextafterl (long double @var{x}, long double @var{y})
@deftypefunx _FloatN nextafterfN (_Float@var{N} @var{x}, _Float@var{N} @var{y})
@deftypefunx _FloatNx nextafterfNx (_Float@var{N}x @var{x}, _Float@var{N}x @var{y})
@standards{ISO, math.h}
@standardsx{nextafterfN, TS 18661-3:2015, math.h}
@standardsx{nextafterfNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
The @code{nextafter} function returns the next representable neighbor of
@var{x} in the direction towards @var{y}. The size of the step between
@var{x} and the result depends on the type of the result. If
@math{@var{x} = @var{y}} the function simply returns @var{y}. If either
value is @code{NaN}, @code{NaN} is returned. Otherwise
a value corresponding to the value of the least significant bit in the
mantissa is added or subtracted, depending on the direction.
@code{nextafter} will signal overflow or underflow if the result goes
outside of the range of normalized numbers.
This function is defined in @w{IEC 559} (and the appendix with
recommended functions in @w{IEEE 754}/@w{IEEE 854}).
@end deftypefun
@deftypefun double nexttoward (double @var{x}, long double @var{y})
@deftypefunx float nexttowardf (float @var{x}, long double @var{y})
@deftypefunx {long double} nexttowardl (long double @var{x}, long double @var{y})
@standards{ISO, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
These functions are identical to the corresponding versions of
@code{nextafter} except that their second argument is a @code{long
double}.
@end deftypefun
@deftypefun double nextup (double @var{x})
@deftypefunx float nextupf (float @var{x})
@deftypefunx {long double} nextupl (long double @var{x})
@deftypefunx _FloatN nextupfN (_Float@var{N} @var{x})
@deftypefunx _FloatNx nextupfNx (_Float@var{N}x @var{x})
@standards{ISO, math.h}
@standardsx{nextupfN, TS 18661-3:2015, math.h}
@standardsx{nextupfNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
The @code{nextup} function returns the next representable neighbor of @var{x}
in the direction of positive infinity. If @var{x} is the smallest negative
subnormal number in the type of @var{x} the function returns @code{-0}. If
@math{@var{x} = @code{0}} the function returns the smallest positive subnormal
number in the type of @var{x}. If @var{x} is NaN, NaN is returned.
If @var{x} is @math{+@infinity{}}, @math{+@infinity{}} is returned.
@code{nextup} is from TS 18661-1:2014 and TS 18661-3:2015.
@code{nextup} never raises an exception except for signaling NaNs.
@end deftypefun
@deftypefun double nextdown (double @var{x})
@deftypefunx float nextdownf (float @var{x})
@deftypefunx {long double} nextdownl (long double @var{x})
@deftypefunx _FloatN nextdownfN (_Float@var{N} @var{x})
@deftypefunx _FloatNx nextdownfNx (_Float@var{N}x @var{x})
@standards{ISO, math.h}
@standardsx{nextdownfN, TS 18661-3:2015, math.h}
@standardsx{nextdownfNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
The @code{nextdown} function returns the next representable neighbor of @var{x}
in the direction of negative infinity. If @var{x} is the smallest positive
subnormal number in the type of @var{x} the function returns @code{+0}. If
@math{@var{x} = @code{0}} the function returns the smallest negative subnormal
number in the type of @var{x}. If @var{x} is NaN, NaN is returned.
If @var{x} is @math{-@infinity{}}, @math{-@infinity{}} is returned.
@code{nextdown} is from TS 18661-1:2014 and TS 18661-3:2015.
@code{nextdown} never raises an exception except for signaling NaNs.
@end deftypefun
@cindex NaN
@deftypefun double nan (const char *@var{tagp})
@deftypefunx float nanf (const char *@var{tagp})
@deftypefunx {long double} nanl (const char *@var{tagp})
@deftypefunx _FloatN nanfN (const char *@var{tagp})
@deftypefunx _FloatNx nanfNx (const char *@var{tagp})
@standards{ISO, math.h}
@standardsx{nanfN, TS 18661-3:2015, math.h}
@standardsx{nanfNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{@mtslocale{}}@assafe{}@acsafe{}}
@c The unsafe-but-ruled-safe locale use comes from strtod.
The @code{nan} function returns a representation of NaN, provided that
NaN is supported by the target platform.
@code{nan ("@var{n-char-sequence}")} is equivalent to
@code{strtod ("NAN(@var{n-char-sequence})")}.
The argument @var{tagp} is used in an unspecified manner. On @w{IEEE
754} systems, there are many representations of NaN, and @var{tagp}
selects one. On other systems it may do nothing.
@end deftypefun
@deftypefun int canonicalize (double *@var{cx}, const double *@var{x})
@deftypefunx int canonicalizef (float *@var{cx}, const float *@var{x})
@deftypefunx int canonicalizel (long double *@var{cx}, const long double *@var{x})
@deftypefunx int canonicalizefN (_Float@var{N} *@var{cx}, const _Float@var{N} *@var{x})
@deftypefunx int canonicalizefNx (_Float@var{N}x *@var{cx}, const _Float@var{N}x *@var{x})
@standards{ISO, math.h}
@standardsx{canonicalizefN, TS 18661-3:2015, math.h}
@standardsx{canonicalizefNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
In some floating-point formats, some values have canonical (preferred)
and noncanonical encodings (for IEEE interchange binary formats, all
encodings are canonical). These functions, defined by TS
18661-1:2014 and TS 18661-3:2015, attempt to produce a canonical version
of the floating-point value pointed to by @var{x}; if that value is a
signaling NaN, they raise the invalid exception and produce a quiet
NaN. If a canonical value is produced, it is stored in the object
pointed to by @var{cx}, and these functions return zero. Otherwise
(if a canonical value could not be produced because the object pointed
to by @var{x} is not a valid representation of any floating-point
value), the object pointed to by @var{cx} is unchanged and a nonzero
value is returned.
Note that some formats have multiple encodings of a value which are
all equally canonical; when such an encoding is used as an input to
this function, any such encoding of the same value (or of the
corresponding quiet NaN, if that value is a signaling NaN) may be
produced as output.
@end deftypefun
@deftypefun double getpayload (const double *@var{x})
@deftypefunx float getpayloadf (const float *@var{x})
@deftypefunx {long double} getpayloadl (const long double *@var{x})
@deftypefunx _FloatN getpayloadfN (const _Float@var{N} *@var{x})
@deftypefunx _FloatNx getpayloadfNx (const _Float@var{N}x *@var{x})
@standards{ISO, math.h}
@standardsx{getpayloadfN, TS 18661-3:2015, math.h}
@standardsx{getpayloadfNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
IEEE 754 defines the @dfn{payload} of a NaN to be an integer value
encoded in the representation of the NaN. Payloads are typically
propagated from NaN inputs to the result of a floating-point
operation. These functions, defined by TS 18661-1:2014 and TS
18661-3:2015, return the payload of the NaN pointed to by @var{x}
(returned as a positive integer, or positive zero, represented as a
floating-point number); if @var{x} is not a NaN, they return an
unspecified value. They raise no floating-point exceptions even for
signaling NaNs.
@end deftypefun
@deftypefun int setpayload (double *@var{x}, double @var{payload})
@deftypefunx int setpayloadf (float *@var{x}, float @var{payload})
@deftypefunx int setpayloadl (long double *@var{x}, long double @var{payload})
@deftypefunx int setpayloadfN (_Float@var{N} *@var{x}, _Float@var{N} @var{payload})
@deftypefunx int setpayloadfNx (_Float@var{N}x *@var{x}, _Float@var{N}x @var{payload})
@standards{ISO, math.h}
@standardsx{setpayloadfN, TS 18661-3:2015, math.h}
@standardsx{setpayloadfNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
These functions, defined by TS 18661-1:2014 and TS 18661-3:2015, set the
object pointed to by @var{x} to a quiet NaN with payload @var{payload}
and a zero sign bit and return zero. If @var{payload} is not a
positive-signed integer that is a valid payload for a quiet NaN of the
given type, the object pointed to by @var{x} is set to positive zero and
a nonzero value is returned. They raise no floating-point exceptions.
@end deftypefun
@deftypefun int setpayloadsig (double *@var{x}, double @var{payload})
@deftypefunx int setpayloadsigf (float *@var{x}, float @var{payload})
@deftypefunx int setpayloadsigl (long double *@var{x}, long double @var{payload})
@deftypefunx int setpayloadsigfN (_Float@var{N} *@var{x}, _Float@var{N} @var{payload})
@deftypefunx int setpayloadsigfNx (_Float@var{N}x *@var{x}, _Float@var{N}x @var{payload})
@standards{ISO, math.h}
@standardsx{setpayloadsigfN, TS 18661-3:2015, math.h}
@standardsx{setpayloadsigfNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
These functions, defined by TS 18661-1:2014 and TS 18661-3:2015, set the
object pointed to by @var{x} to a signaling NaN with payload
@var{payload} and a zero sign bit and return zero. If @var{payload} is
not a positive-signed integer that is a valid payload for a signaling
NaN of the given type, the object pointed to by @var{x} is set to
positive zero and a nonzero value is returned. They raise no
floating-point exceptions.
@end deftypefun
@node FP Comparison Functions
@subsection Floating-Point Comparison Functions
@cindex unordered comparison
The standard C comparison operators provoke exceptions when one or other
of the operands is NaN. For example,
@smallexample
int v = a < 1.0;
@end smallexample
@noindent
will raise an exception if @var{a} is NaN. (This does @emph{not}
happen with @code{==} and @code{!=}; those merely return false and true,
respectively, when NaN is examined.) Frequently this exception is
undesirable. @w{ISO C99} therefore defines comparison functions that
do not raise exceptions when NaN is examined. All of the functions are
implemented as macros which allow their arguments to be of any
floating-point type. The macros are guaranteed to evaluate their
arguments only once. TS 18661-1:2014 adds such a macro for an
equality comparison that @emph{does} raise an exception for a NaN
argument; it also adds functions that provide a total ordering on all
floating-point values, including NaNs, without raising any exceptions
even for signaling NaNs.
@deftypefn Macro int isgreater (@emph{real-floating} @var{x}, @emph{real-floating} @var{y})
@standards{ISO, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
This macro determines whether the argument @var{x} is greater than
@var{y}. It is equivalent to @code{(@var{x}) > (@var{y})}, but no
exception is raised if @var{x} or @var{y} are NaN.
@end deftypefn
@deftypefn Macro int isgreaterequal (@emph{real-floating} @var{x}, @emph{real-floating} @var{y})
@standards{ISO, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
This macro determines whether the argument @var{x} is greater than or
equal to @var{y}. It is equivalent to @code{(@var{x}) >= (@var{y})}, but no
exception is raised if @var{x} or @var{y} are NaN.
@end deftypefn
@deftypefn Macro int isless (@emph{real-floating} @var{x}, @emph{real-floating} @var{y})
@standards{ISO, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
This macro determines whether the argument @var{x} is less than @var{y}.
It is equivalent to @code{(@var{x}) < (@var{y})}, but no exception is
raised if @var{x} or @var{y} are NaN.
@end deftypefn
@deftypefn Macro int islessequal (@emph{real-floating} @var{x}, @emph{real-floating} @var{y})
@standards{ISO, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
This macro determines whether the argument @var{x} is less than or equal
to @var{y}. It is equivalent to @code{(@var{x}) <= (@var{y})}, but no
exception is raised if @var{x} or @var{y} are NaN.
@end deftypefn
@deftypefn Macro int islessgreater (@emph{real-floating} @var{x}, @emph{real-floating} @var{y})
@standards{ISO, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
This macro determines whether the argument @var{x} is less or greater
than @var{y}. It is equivalent to @code{(@var{x}) < (@var{y}) ||
(@var{x}) > (@var{y})} (although it only evaluates @var{x} and @var{y}
once), but no exception is raised if @var{x} or @var{y} are NaN.
This macro is not equivalent to @code{@var{x} != @var{y}}, because that
expression is true if @var{x} or @var{y} are NaN.
@end deftypefn
@deftypefn Macro int isunordered (@emph{real-floating} @var{x}, @emph{real-floating} @var{y})
@standards{ISO, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
This macro determines whether its arguments are unordered. In other
words, it is true if @var{x} or @var{y} are NaN, and false otherwise.
@end deftypefn
@deftypefn Macro int iseqsig (@emph{real-floating} @var{x}, @emph{real-floating} @var{y})
@standards{ISO, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
This macro determines whether its arguments are equal. It is
equivalent to @code{(@var{x}) == (@var{y})}, but it raises the invalid
exception and sets @code{errno} to @code{EDOM} if either argument is a
NaN.
@end deftypefn
@deftypefun int totalorder (double @var{x}, double @var{y})
@deftypefunx int totalorderf (float @var{x}, float @var{y})
@deftypefunx int totalorderl (long double @var{x}, long double @var{y})
@deftypefunx int totalorderfN (_Float@var{N} @var{x}, _Float@var{N} @var{y})
@deftypefunx int totalorderfNx (_Float@var{N}x @var{x}, _Float@var{N}x @var{y})
@standards{TS 18661-1:2014, math.h}
@standardsx{totalorderfN, TS 18661-3:2015, math.h}
@standardsx{totalorderfNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
These functions determine whether the total order relationship,
defined in IEEE 754-2008, is true for @var{x} and @var{y}, returning
nonzero if it is true and zero if it is false. No exceptions are
raised even for signaling NaNs. The relationship is true if they are
the same floating-point value (including sign for zero and NaNs, and
payload for NaNs), or if @var{x} comes before @var{y} in the following
order: negative quiet NaNs, in order of decreasing payload; negative
signaling NaNs, in order of decreasing payload; negative infinity;
finite numbers, in ascending order, with negative zero before positive
zero; positive infinity; positive signaling NaNs, in order of
increasing payload; positive quiet NaNs, in order of increasing
payload.
@end deftypefun
@deftypefun int totalordermag (double @var{x}, double @var{y})
@deftypefunx int totalordermagf (float @var{x}, float @var{y})
@deftypefunx int totalordermagl (long double @var{x}, long double @var{y})
@deftypefunx int totalordermagfN (_Float@var{N} @var{x}, _Float@var{N} @var{y})
@deftypefunx int totalordermagfNx (_Float@var{N}x @var{x}, _Float@var{N}x @var{y})
@standards{TS 18661-1:2014, math.h}
@standardsx{totalordermagfN, TS 18661-3:2015, math.h}
@standardsx{totalordermagfNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
These functions determine whether the total order relationship,
defined in IEEE 754-2008, is true for the absolute values of @var{x}
and @var{y}, returning nonzero if it is true and zero if it is false.
No exceptions are raised even for signaling NaNs.
@end deftypefun
Not all machines provide hardware support for these operations. On
machines that don't, the macros can be very slow. Therefore, you should
not use these functions when NaN is not a concern.
@strong{NB:} There are no macros @code{isequal} or @code{isunequal}.
They are unnecessary, because the @code{==} and @code{!=} operators do
@emph{not} throw an exception if one or both of the operands are NaN.
@node Misc FP Arithmetic
@subsection Miscellaneous FP arithmetic functions
@cindex minimum
@cindex maximum
@cindex positive difference
@cindex multiply-add
The functions in this section perform miscellaneous but common
operations that are awkward to express with C operators. On some
processors these functions can use special machine instructions to
perform these operations faster than the equivalent C code.
@deftypefun double fmin (double @var{x}, double @var{y})
@deftypefunx float fminf (float @var{x}, float @var{y})
@deftypefunx {long double} fminl (long double @var{x}, long double @var{y})
@deftypefunx _FloatN fminfN (_Float@var{N} @var{x}, _Float@var{N} @var{y})
@deftypefunx _FloatNx fminfNx (_Float@var{N}x @var{x}, _Float@var{N}x @var{y})
@standards{ISO, math.h}
@standardsx{fminfN, TS 18661-3:2015, math.h}
@standardsx{fminfNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
The @code{fmin} function returns the lesser of the two values @var{x}
and @var{y}. It is similar to the expression
@smallexample
((x) < (y) ? (x) : (y))
@end smallexample
except that @var{x} and @var{y} are only evaluated once.
If an argument is NaN, the other argument is returned. If both arguments
are NaN, NaN is returned.
@end deftypefun
@deftypefun double fmax (double @var{x}, double @var{y})
@deftypefunx float fmaxf (float @var{x}, float @var{y})
@deftypefunx {long double} fmaxl (long double @var{x}, long double @var{y})
@deftypefunx _FloatN fmaxfN (_Float@var{N} @var{x}, _Float@var{N} @var{y})
@deftypefunx _FloatNx fmaxfNx (_Float@var{N}x @var{x}, _Float@var{N}x @var{y})
@standards{ISO, math.h}
@standardsx{fmaxfN, TS 18661-3:2015, math.h}
@standardsx{fmaxfNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
The @code{fmax} function returns the greater of the two values @var{x}
and @var{y}.
If an argument is NaN, the other argument is returned. If both arguments
are NaN, NaN is returned.
@end deftypefun
@deftypefun double fminmag (double @var{x}, double @var{y})
@deftypefunx float fminmagf (float @var{x}, float @var{y})
@deftypefunx {long double} fminmagl (long double @var{x}, long double @var{y})
@deftypefunx _FloatN fminmagfN (_Float@var{N} @var{x}, _Float@var{N} @var{y})
@deftypefunx _FloatNx fminmagfNx (_Float@var{N}x @var{x}, _Float@var{N}x @var{y})
@standards{ISO, math.h}
@standardsx{fminmagfN, TS 18661-3:2015, math.h}
@standardsx{fminmagfNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
These functions, from TS 18661-1:2014 and TS 18661-3:2015, return
whichever of the two values @var{x} and @var{y} has the smaller absolute
value. If both have the same absolute value, or either is NaN, they
behave the same as the @code{fmin} functions.
@end deftypefun
@deftypefun double fmaxmag (double @var{x}, double @var{y})
@deftypefunx float fmaxmagf (float @var{x}, float @var{y})
@deftypefunx {long double} fmaxmagl (long double @var{x}, long double @var{y})
@deftypefunx _FloatN fmaxmagfN (_Float@var{N} @var{x}, _Float@var{N} @var{y})
@deftypefunx _FloatNx fmaxmagfNx (_Float@var{N}x @var{x}, _Float@var{N}x @var{y})
@standards{ISO, math.h}
@standardsx{fmaxmagfN, TS 18661-3:2015, math.h}
@standardsx{fmaxmagfNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
These functions, from TS 18661-1:2014, return whichever of the two
values @var{x} and @var{y} has the greater absolute value. If both
have the same absolute value, or either is NaN, they behave the same
as the @code{fmax} functions.
@end deftypefun
@deftypefun double fdim (double @var{x}, double @var{y})
@deftypefunx float fdimf (float @var{x}, float @var{y})
@deftypefunx {long double} fdiml (long double @var{x}, long double @var{y})
@deftypefunx _FloatN fdimfN (_Float@var{N} @var{x}, _Float@var{N} @var{y})
@deftypefunx _FloatNx fdimfNx (_Float@var{N}x @var{x}, _Float@var{N}x @var{y})
@standards{ISO, math.h}
@standardsx{fdimfN, TS 18661-3:2015, math.h}
@standardsx{fdimfNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
The @code{fdim} function returns the positive difference between
@var{x} and @var{y}. The positive difference is @math{@var{x} -
@var{y}} if @var{x} is greater than @var{y}, and @math{0} otherwise.
If @var{x}, @var{y}, or both are NaN, NaN is returned.
@end deftypefun
@deftypefun double fma (double @var{x}, double @var{y}, double @var{z})
@deftypefunx float fmaf (float @var{x}, float @var{y}, float @var{z})
@deftypefunx {long double} fmal (long double @var{x}, long double @var{y}, long double @var{z})
@deftypefunx _FloatN fmafN (_Float@var{N} @var{x}, _Float@var{N} @var{y}, _Float@var{N} @var{z})
@deftypefunx _FloatNx fmafNx (_Float@var{N}x @var{x}, _Float@var{N}x @var{y}, _Float@var{N}x @var{z})
@standards{ISO, math.h}
@standardsx{fmafN, TS 18661-3:2015, math.h}
@standardsx{fmafNx, TS 18661-3:2015, math.h}
@cindex butterfly
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
The @code{fma} function performs floating-point multiply-add. This is
the operation @math{(@var{x} @mul{} @var{y}) + @var{z}}, but the
intermediate result is not rounded to the destination type. This can
sometimes improve the precision of a calculation.
This function was introduced because some processors have a special
instruction to perform multiply-add. The C compiler cannot use it
directly, because the expression @samp{x*y + z} is defined to round the
intermediate result. @code{fma} lets you choose when you want to round
only once.
@vindex FP_FAST_FMA
On processors which do not implement multiply-add in hardware,
@code{fma} can be very slow since it must avoid intermediate rounding.
@file{math.h} defines the symbols @code{FP_FAST_FMA},
@code{FP_FAST_FMAF}, and @code{FP_FAST_FMAL} when the corresponding
version of @code{fma} is no slower than the expression @samp{x*y + z}.
In @theglibc{}, this always means the operation is implemented in
hardware.
@end deftypefun
@deftypefun float fadd (double @var{x}, double @var{y})
@deftypefunx float faddl (long double @var{x}, long double @var{y})
@deftypefunx double daddl (long double @var{x}, long double @var{y})
@deftypefunx _FloatM fMaddfN (_Float@var{N} @var{x}, _Float@var{N} @var{y})
@deftypefunx _FloatM fMaddfNx (_Float@var{N}x @var{x}, _Float@var{N}x @var{y})
@deftypefunx _FloatMx fMxaddfN (_Float@var{N} @var{x}, _Float@var{N} @var{y})
@deftypefunx _FloatMx fMxaddfNx (_Float@var{N}x @var{x}, _Float@var{N}x @var{y})
@standards{TS 18661-1:2014, math.h}
@standardsx{fMaddfN, TS 18661-3:2015, math.h}
@standardsx{fMaddfNx, TS 18661-3:2015, math.h}
@standardsx{fMxaddfN, TS 18661-3:2015, math.h}
@standardsx{fMxaddfNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
These functions, from TS 18661-1:2014 and TS 18661-3:2015, return
@math{@var{x} + @var{y}}, rounded once to the return type of the
function without any intermediate rounding to the type of the
arguments.
@end deftypefun
@deftypefun float fsub (double @var{x}, double @var{y})
@deftypefunx float fsubl (long double @var{x}, long double @var{y})
@deftypefunx double dsubl (long double @var{x}, long double @var{y})
@deftypefunx _FloatM fMsubfN (_Float@var{N} @var{x}, _Float@var{N} @var{y})
@deftypefunx _FloatM fMsubfNx (_Float@var{N}x @var{x}, _Float@var{N}x @var{y})
@deftypefunx _FloatMx fMxsubfN (_Float@var{N} @var{x}, _Float@var{N} @var{y})
@deftypefunx _FloatMx fMxsubfNx (_Float@var{N}x @var{x}, _Float@var{N}x @var{y})
@standards{TS 18661-1:2014, math.h}
@standardsx{fMsubfN, TS 18661-3:2015, math.h}
@standardsx{fMsubfNx, TS 18661-3:2015, math.h}
@standardsx{fMxsubfN, TS 18661-3:2015, math.h}
@standardsx{fMxsubfNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
These functions, from TS 18661-1:2014 and TS 18661-3:2015, return
@math{@var{x} - @var{y}}, rounded once to the return type of the
function without any intermediate rounding to the type of the
arguments.
@end deftypefun
@deftypefun float fmul (double @var{x}, double @var{y})
@deftypefunx float fmull (long double @var{x}, long double @var{y})
@deftypefunx double dmull (long double @var{x}, long double @var{y})
@deftypefunx _FloatM fMmulfN (_Float@var{N} @var{x}, _Float@var{N} @var{y})
@deftypefunx _FloatM fMmulfNx (_Float@var{N}x @var{x}, _Float@var{N}x @var{y})
@deftypefunx _FloatMx fMxmulfN (_Float@var{N} @var{x}, _Float@var{N} @var{y})
@deftypefunx _FloatMx fMxmulfNx (_Float@var{N}x @var{x}, _Float@var{N}x @var{y})
@standards{TS 18661-1:2014, math.h}
@standardsx{fMmulfN, TS 18661-3:2015, math.h}
@standardsx{fMmulfNx, TS 18661-3:2015, math.h}
@standardsx{fMxmulfN, TS 18661-3:2015, math.h}
@standardsx{fMxmulfNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
These functions, from TS 18661-1:2014 and TS 18661-3:2015, return
@math{@var{x} * @var{y}}, rounded once to the return type of the
function without any intermediate rounding to the type of the
arguments.
@end deftypefun
@deftypefun float fdiv (double @var{x}, double @var{y})
@deftypefunx float fdivl (long double @var{x}, long double @var{y})
@deftypefunx double ddivl (long double @var{x}, long double @var{y})
@deftypefunx _FloatM fMdivfN (_Float@var{N} @var{x}, _Float@var{N} @var{y})
@deftypefunx _FloatM fMdivfNx (_Float@var{N}x @var{x}, _Float@var{N}x @var{y})
@deftypefunx _FloatMx fMxdivfN (_Float@var{N} @var{x}, _Float@var{N} @var{y})
@deftypefunx _FloatMx fMxdivfNx (_Float@var{N}x @var{x}, _Float@var{N}x @var{y})
@standards{TS 18661-1:2014, math.h}
@standardsx{fMdivfN, TS 18661-3:2015, math.h}
@standardsx{fMdivfNx, TS 18661-3:2015, math.h}
@standardsx{fMxdivfN, TS 18661-3:2015, math.h}
@standardsx{fMxdivfNx, TS 18661-3:2015, math.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
These functions, from TS 18661-1:2014 and TS 18661-3:2015, return
@math{@var{x} / @var{y}}, rounded once to the return type of the
function without any intermediate rounding to the type of the
arguments.
@end deftypefun
@node Complex Numbers
@section Complex Numbers
@pindex complex.h
@cindex complex numbers
@w{ISO C99} introduces support for complex numbers in C. This is done
with a new type qualifier, @code{complex}. It is a keyword if and only
if @file{complex.h} has been included. There are three complex types,
corresponding to the three real types: @code{float complex},
@code{double complex}, and @code{long double complex}.
Likewise, on machines that have support for @code{_Float@var{N}} or
@code{_Float@var{N}x} enabled, the complex types @code{_Float@var{N}
complex} and @code{_Float@var{N}x complex} are also available if
@file{complex.h} has been included; @pxref{Mathematics}.
To construct complex numbers you need a way to indicate the imaginary
part of a number. There is no standard notation for an imaginary
floating point constant. Instead, @file{complex.h} defines two macros
that can be used to create complex numbers.
@deftypevr Macro {const float complex} _Complex_I
@standards{C99, complex.h}
This macro is a representation of the complex number ``@math{0+1i}''.
Multiplying a real floating-point value by @code{_Complex_I} gives a
complex number whose value is purely imaginary. You can use this to
construct complex constants:
@smallexample
@math{3.0 + 4.0i} = @code{3.0 + 4.0 * _Complex_I}
@end smallexample
Note that @code{_Complex_I * _Complex_I} has the value @code{-1}, but
the type of that value is @code{complex}.
@end deftypevr
@c Put this back in when gcc supports _Imaginary_I. It's too confusing.
@ignore
@noindent
Without an optimizing compiler this is more expensive than the use of
@code{_Imaginary_I} but with is better than nothing. You can avoid all
the hassles if you use the @code{I} macro below if the name is not
problem.
@deftypevr Macro {const float imaginary} _Imaginary_I
This macro is a representation of the value ``@math{1i}''. I.e., it is
the value for which
@smallexample
_Imaginary_I * _Imaginary_I = -1
@end smallexample
@noindent
The result is not of type @code{float imaginary} but instead @code{float}.
One can use it to easily construct complex number like in
@smallexample
3.0 - _Imaginary_I * 4.0
@end smallexample
@noindent
which results in the complex number with a real part of 3.0 and a
imaginary part -4.0.
@end deftypevr
@end ignore
@noindent
@code{_Complex_I} is a bit of a mouthful. @file{complex.h} also defines
a shorter name for the same constant.
@deftypevr Macro {const float complex} I
@standards{C99, complex.h}
This macro has exactly the same value as @code{_Complex_I}. Most of the
time it is preferable. However, it causes problems if you want to use
the identifier @code{I} for something else. You can safely write
@smallexample
#include <complex.h>
#undef I
@end smallexample
@noindent
if you need @code{I} for your own purposes. (In that case we recommend
you also define some other short name for @code{_Complex_I}, such as
@code{J}.)
@ignore
If the implementation does not support the @code{imaginary} types
@code{I} is defined as @code{_Complex_I} which is the second best
solution. It still can be used in the same way but requires a most
clever compiler to get the same results.
@end ignore
@end deftypevr
@node Operations on Complex
@section Projections, Conjugates, and Decomposing of Complex Numbers
@cindex project complex numbers
@cindex conjugate complex numbers
@cindex decompose complex numbers
@pindex complex.h
@w{ISO C99} also defines functions that perform basic operations on
complex numbers, such as decomposition and conjugation. The prototypes
for all these functions are in @file{complex.h}. All functions are
available in three variants, one for each of the three complex types.
@deftypefun double creal (complex double @var{z})
@deftypefunx float crealf (complex float @var{z})
@deftypefunx {long double} creall (complex long double @var{z})
@deftypefunx _FloatN crealfN (complex _Float@var{N} @var{z})
@deftypefunx _FloatNx crealfNx (complex _Float@var{N}x @var{z})
@standards{ISO, complex.h}
@standardsx{crealfN, TS 18661-3:2015, complex.h}
@standardsx{crealfNx, TS 18661-3:2015, complex.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
These functions return the real part of the complex number @var{z}.
@end deftypefun
@deftypefun double cimag (complex double @var{z})
@deftypefunx float cimagf (complex float @var{z})
@deftypefunx {long double} cimagl (complex long double @var{z})
@deftypefunx _FloatN cimagfN (complex _Float@var{N} @var{z})
@deftypefunx _FloatNx cimagfNx (complex _Float@var{N}x @var{z})
@standards{ISO, complex.h}
@standardsx{cimagfN, TS 18661-3:2015, complex.h}
@standardsx{cimagfNx, TS 18661-3:2015, complex.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
These functions return the imaginary part of the complex number @var{z}.
@end deftypefun
@deftypefun {complex double} conj (complex double @var{z})
@deftypefunx {complex float} conjf (complex float @var{z})
@deftypefunx {complex long double} conjl (complex long double @var{z})
@deftypefunx {complex _FloatN} conjfN (complex _Float@var{N} @var{z})
@deftypefunx {complex _FloatNx} conjfNx (complex _Float@var{N}x @var{z})
@standards{ISO, complex.h}
@standardsx{conjfN, TS 18661-3:2015, complex.h}
@standardsx{conjfNx, TS 18661-3:2015, complex.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
These functions return the conjugate value of the complex number
@var{z}. The conjugate of a complex number has the same real part and a
negated imaginary part. In other words, @samp{conj(a + bi) = a + -bi}.
@end deftypefun
@deftypefun double carg (complex double @var{z})
@deftypefunx float cargf (complex float @var{z})
@deftypefunx {long double} cargl (complex long double @var{z})
@deftypefunx _FloatN cargfN (complex _Float@var{N} @var{z})
@deftypefunx _FloatNx cargfNx (complex _Float@var{N}x @var{z})
@standards{ISO, complex.h}
@standardsx{cargfN, TS 18661-3:2015, complex.h}
@standardsx{cargfNx, TS 18661-3:2015, complex.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
These functions return the argument of the complex number @var{z}.
The argument of a complex number is the angle in the complex plane
between the positive real axis and a line passing through zero and the
number. This angle is measured in the usual fashion and ranges from
@math{-@pi{}} to @math{@pi{}}.
@code{carg} has a branch cut along the negative real axis.
@end deftypefun
@deftypefun {complex double} cproj (complex double @var{z})
@deftypefunx {complex float} cprojf (complex float @var{z})
@deftypefunx {complex long double} cprojl (complex long double @var{z})
@deftypefunx {complex _FloatN} cprojfN (complex _Float@var{N} @var{z})
@deftypefunx {complex _FloatNx} cprojfNx (complex _Float@var{N}x @var{z})
@standards{ISO, complex.h}
@standardsx{cprojfN, TS 18661-3:2015, complex.h}
@standardsx{cprojfNx, TS 18661-3:2015, complex.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
These functions return the projection of the complex value @var{z} onto
the Riemann sphere. Values with an infinite imaginary part are projected
to positive infinity on the real axis, even if the real part is NaN. If
the real part is infinite, the result is equivalent to
@smallexample
INFINITY + I * copysign (0.0, cimag (z))
@end smallexample
@end deftypefun
@node Parsing of Numbers
@section Parsing of Numbers
@cindex parsing numbers (in formatted input)
@cindex converting strings to numbers
@cindex number syntax, parsing
@cindex syntax, for reading numbers
This section describes functions for ``reading'' integer and
floating-point numbers from a string. It may be more convenient in some
cases to use @code{sscanf} or one of the related functions; see
@ref{Formatted Input}. But often you can make a program more robust by
finding the tokens in the string by hand, then converting the numbers
one by one.
@menu
* Parsing of Integers:: Functions for conversion of integer values.
* Parsing of Floats:: Functions for conversion of floating-point
values.
@end menu
@node Parsing of Integers
@subsection Parsing of Integers
@pindex stdlib.h
@pindex wchar.h
The @samp{str} functions are declared in @file{stdlib.h} and those
beginning with @samp{wcs} are declared in @file{wchar.h}. One might
wonder about the use of @code{restrict} in the prototypes of the
functions in this section. It is seemingly useless but the @w{ISO C}
standard uses it (for the functions defined there) so we have to do it
as well.
@deftypefun {long int} strtol (const char *restrict @var{string}, char **restrict @var{tailptr}, int @var{base})
@standards{ISO, stdlib.h}
@safety{@prelim{}@mtsafe{@mtslocale{}}@assafe{}@acsafe{}}
@c strtol uses the thread-local pointer to the locale in effect, and
@c strtol_l loads the LC_NUMERIC locale data from it early on and once,
@c but if the locale is the global locale, and another thread calls
@c setlocale in a way that modifies the pointer to the LC_CTYPE locale
@c category, the behavior of e.g. IS*, TOUPPER will vary throughout the
@c execution of the function, because they re-read the locale data from
@c the given locale pointer. We solved this by documenting setlocale as
@c MT-Unsafe.
The @code{strtol} (``string-to-long'') function converts the initial
part of @var{string} to a signed integer, which is returned as a value
of type @code{long int}.
This function attempts to decompose @var{string} as follows:
@itemize @bullet
@item
A (possibly empty) sequence of whitespace characters. Which characters
are whitespace is determined by the @code{isspace} function
(@pxref{Classification of Characters}). These are discarded.
@item
An optional plus or minus sign (@samp{+} or @samp{-}).
@item
A nonempty sequence of digits in the radix specified by @var{base}.
If @var{base} is zero, decimal radix is assumed unless the series of
digits begins with @samp{0} (specifying octal radix), or @samp{0x} or
@samp{0X} (specifying hexadecimal radix); in other words, the same
syntax used for integer constants in C.
Otherwise @var{base} must have a value between @code{2} and @code{36}.
If @var{base} is @code{16}, the digits may optionally be preceded by
@samp{0x} or @samp{0X}. If base has no legal value the value returned
is @code{0l} and the global variable @code{errno} is set to @code{EINVAL}.
@item
Any remaining characters in the string. If @var{tailptr} is not a null
pointer, @code{strtol} stores a pointer to this tail in
@code{*@var{tailptr}}.
@end itemize
If the string is empty, contains only whitespace, or does not contain an
initial substring that has the expected syntax for an integer in the
specified @var{base}, no conversion is performed. In this case,
@code{strtol} returns a value of zero and the value stored in
@code{*@var{tailptr}} is the value of @var{string}.
In a locale other than the standard @code{"C"} locale, this function
may recognize additional implementation-dependent syntax.
If the string has valid syntax for an integer but the value is not
representable because of overflow, @code{strtol} returns either
@code{LONG_MAX} or @code{LONG_MIN} (@pxref{Range of Type}), as
appropriate for the sign of the value. It also sets @code{errno}
to @code{ERANGE} to indicate there was overflow.
You should not check for errors by examining the return value of
@code{strtol}, because the string might be a valid representation of
@code{0l}, @code{LONG_MAX}, or @code{LONG_MIN}. Instead, check whether
@var{tailptr} points to what you expect after the number
(e.g. @code{'\0'} if the string should end after the number). You also
need to clear @code{errno} before the call and check it afterward, in
case there was overflow.
There is an example at the end of this section.
@end deftypefun
@deftypefun {long int} wcstol (const wchar_t *restrict @var{string}, wchar_t **restrict @var{tailptr}, int @var{base})
@standards{ISO, wchar.h}
@safety{@prelim{}@mtsafe{@mtslocale{}}@assafe{}@acsafe{}}
The @code{wcstol} function is equivalent to the @code{strtol} function
in nearly all aspects but handles wide character strings.
The @code{wcstol} function was introduced in @w{Amendment 1} of @w{ISO C90}.
@end deftypefun
@deftypefun {unsigned long int} strtoul (const char *restrict @var{string}, char **restrict @var{tailptr}, int @var{base})
@standards{ISO, stdlib.h}
@safety{@prelim{}@mtsafe{@mtslocale{}}@assafe{}@acsafe{}}
The @code{strtoul} (``string-to-unsigned-long'') function is like
@code{strtol} except it converts to an @code{unsigned long int} value.
The syntax is the same as described above for @code{strtol}. The value
returned on overflow is @code{ULONG_MAX} (@pxref{Range of Type}).
If @var{string} depicts a negative number, @code{strtoul} acts the same
as @var{strtol} but casts the result to an unsigned integer. That means
for example that @code{strtoul} on @code{"-1"} returns @code{ULONG_MAX}
and an input more negative than @code{LONG_MIN} returns
(@code{ULONG_MAX} + 1) / 2.
@code{strtoul} sets @code{errno} to @code{EINVAL} if @var{base} is out of
range, or @code{ERANGE} on overflow.
@end deftypefun
@deftypefun {unsigned long int} wcstoul (const wchar_t *restrict @var{string}, wchar_t **restrict @var{tailptr}, int @var{base})
@standards{ISO, wchar.h}
@safety{@prelim{}@mtsafe{@mtslocale{}}@assafe{}@acsafe{}}
The @code{wcstoul} function is equivalent to the @code{strtoul} function
in nearly all aspects but handles wide character strings.
The @code{wcstoul} function was introduced in @w{Amendment 1} of @w{ISO C90}.
@end deftypefun
@deftypefun {long long int} strtoll (const char *restrict @var{string}, char **restrict @var{tailptr}, int @var{base})
@standards{ISO, stdlib.h}
@safety{@prelim{}@mtsafe{@mtslocale{}}@assafe{}@acsafe{}}
The @code{strtoll} function is like @code{strtol} except that it returns
a @code{long long int} value, and accepts numbers with a correspondingly
larger range.
If the string has valid syntax for an integer but the value is not
representable because of overflow, @code{strtoll} returns either
@code{LLONG_MAX} or @code{LLONG_MIN} (@pxref{Range of Type}), as
appropriate for the sign of the value. It also sets @code{errno} to
@code{ERANGE} to indicate there was overflow.
The @code{strtoll} function was introduced in @w{ISO C99}.
@end deftypefun
@deftypefun {long long int} wcstoll (const wchar_t *restrict @var{string}, wchar_t **restrict @var{tailptr}, int @var{base})
@standards{ISO, wchar.h}
@safety{@prelim{}@mtsafe{@mtslocale{}}@assafe{}@acsafe{}}
The @code{wcstoll} function is equivalent to the @code{strtoll} function
in nearly all aspects but handles wide character strings.
The @code{wcstoll} function was introduced in @w{Amendment 1} of @w{ISO C90}.
@end deftypefun
@deftypefun {long long int} strtoq (const char *restrict @var{string}, char **restrict @var{tailptr}, int @var{base})
@standards{BSD, stdlib.h}
@safety{@prelim{}@mtsafe{@mtslocale{}}@assafe{}@acsafe{}}
@code{strtoq} (``string-to-quad-word'') is the BSD name for @code{strtoll}.
@end deftypefun
@deftypefun {long long int} wcstoq (const wchar_t *restrict @var{string}, wchar_t **restrict @var{tailptr}, int @var{base})
@standards{GNU, wchar.h}
@safety{@prelim{}@mtsafe{@mtslocale{}}@assafe{}@acsafe{}}
The @code{wcstoq} function is equivalent to the @code{strtoq} function
in nearly all aspects but handles wide character strings.
The @code{wcstoq} function is a GNU extension.
@end deftypefun
@deftypefun {unsigned long long int} strtoull (const char *restrict @var{string}, char **restrict @var{tailptr}, int @var{base})
@standards{ISO, stdlib.h}
@safety{@prelim{}@mtsafe{@mtslocale{}}@assafe{}@acsafe{}}
The @code{strtoull} function is related to @code{strtoll} the same way
@code{strtoul} is related to @code{strtol}.
The @code{strtoull} function was introduced in @w{ISO C99}.
@end deftypefun
@deftypefun {unsigned long long int} wcstoull (const wchar_t *restrict @var{string}, wchar_t **restrict @var{tailptr}, int @var{base})
@standards{ISO, wchar.h}
@safety{@prelim{}@mtsafe{@mtslocale{}}@assafe{}@acsafe{}}
The @code{wcstoull} function is equivalent to the @code{strtoull} function
in nearly all aspects but handles wide character strings.
The @code{wcstoull} function was introduced in @w{Amendment 1} of @w{ISO C90}.
@end deftypefun
@deftypefun {unsigned long long int} strtouq (const char *restrict @var{string}, char **restrict @var{tailptr}, int @var{base})
@standards{BSD, stdlib.h}
@safety{@prelim{}@mtsafe{@mtslocale{}}@assafe{}@acsafe{}}
@code{strtouq} is the BSD name for @code{strtoull}.
@end deftypefun
@deftypefun {unsigned long long int} wcstouq (const wchar_t *restrict @var{string}, wchar_t **restrict @var{tailptr}, int @var{base})
@standards{GNU, wchar.h}
@safety{@prelim{}@mtsafe{@mtslocale{}}@assafe{}@acsafe{}}
The @code{wcstouq} function is equivalent to the @code{strtouq} function
in nearly all aspects but handles wide character strings.
The @code{wcstouq} function is a GNU extension.
@end deftypefun
@deftypefun intmax_t strtoimax (const char *restrict @var{string}, char **restrict @var{tailptr}, int @var{base})
@standards{ISO, inttypes.h}
@safety{@prelim{}@mtsafe{@mtslocale{}}@assafe{}@acsafe{}}
The @code{strtoimax} function is like @code{strtol} except that it returns
a @code{intmax_t} value, and accepts numbers of a corresponding range.
If the string has valid syntax for an integer but the value is not
representable because of overflow, @code{strtoimax} returns either
@code{INTMAX_MAX} or @code{INTMAX_MIN} (@pxref{Integers}), as
appropriate for the sign of the value. It also sets @code{errno} to
@code{ERANGE} to indicate there was overflow.
See @ref{Integers} for a description of the @code{intmax_t} type. The
@code{strtoimax} function was introduced in @w{ISO C99}.
@end deftypefun
@deftypefun intmax_t wcstoimax (const wchar_t *restrict @var{string}, wchar_t **restrict @var{tailptr}, int @var{base})
@standards{ISO, wchar.h}
@safety{@prelim{}@mtsafe{@mtslocale{}}@assafe{}@acsafe{}}
The @code{wcstoimax} function is equivalent to the @code{strtoimax} function
in nearly all aspects but handles wide character strings.
The @code{wcstoimax} function was introduced in @w{ISO C99}.
@end deftypefun
@deftypefun uintmax_t strtoumax (const char *restrict @var{string}, char **restrict @var{tailptr}, int @var{base})
@standards{ISO, inttypes.h}
@safety{@prelim{}@mtsafe{@mtslocale{}}@assafe{}@acsafe{}}
The @code{strtoumax} function is related to @code{strtoimax}
the same way that @code{strtoul} is related to @code{strtol}.
See @ref{Integers} for a description of the @code{intmax_t} type. The
@code{strtoumax} function was introduced in @w{ISO C99}.
@end deftypefun
@deftypefun uintmax_t wcstoumax (const wchar_t *restrict @var{string}, wchar_t **restrict @var{tailptr}, int @var{base})
@standards{ISO, wchar.h}
@safety{@prelim{}@mtsafe{@mtslocale{}}@assafe{}@acsafe{}}
The @code{wcstoumax} function is equivalent to the @code{strtoumax} function
in nearly all aspects but handles wide character strings.
The @code{wcstoumax} function was introduced in @w{ISO C99}.
@end deftypefun
@deftypefun {long int} atol (const char *@var{string})
@standards{ISO, stdlib.h}
@safety{@prelim{}@mtsafe{@mtslocale{}}@assafe{}@acsafe{}}
This function is similar to the @code{strtol} function with a @var{base}
argument of @code{10}, except that it need not detect overflow errors.
The @code{atol} function is provided mostly for compatibility with
existing code; using @code{strtol} is more robust.
@end deftypefun
@deftypefun int atoi (const char *@var{string})
@standards{ISO, stdlib.h}
@safety{@prelim{}@mtsafe{@mtslocale{}}@assafe{}@acsafe{}}
This function is like @code{atol}, except that it returns an @code{int}.
The @code{atoi} function is also considered obsolete; use @code{strtol}
instead.
@end deftypefun
@deftypefun {long long int} atoll (const char *@var{string})
@standards{ISO, stdlib.h}
@safety{@prelim{}@mtsafe{@mtslocale{}}@assafe{}@acsafe{}}
This function is similar to @code{atol}, except it returns a @code{long
long int}.
The @code{atoll} function was introduced in @w{ISO C99}. It too is
obsolete (despite having just been added); use @code{strtoll} instead.
@end deftypefun
All the functions mentioned in this section so far do not handle
alternative representations of characters as described in the locale
data. Some locales specify thousands separator and the way they have to
be used which can help to make large numbers more readable. To read
such numbers one has to use the @code{scanf} functions with the @samp{'}
flag.
Here is a function which parses a string as a sequence of integers and
returns the sum of them:
@smallexample
int
sum_ints_from_string (char *string)
@{
int sum = 0;
while (1) @{
char *tail;
int next;
/* @r{Skip whitespace by hand, to detect the end.} */
while (isspace (*string)) string++;
if (*string == 0)
break;
/* @r{There is more nonwhitespace,} */
/* @r{so it ought to be another number.} */
errno = 0;
/* @r{Parse it.} */
next = strtol (string, &tail, 0);
/* @r{Add it in, if not overflow.} */
if (errno)
printf ("Overflow\n");
else
sum += next;
/* @r{Advance past it.} */
string = tail;
@}
return sum;
@}
@end smallexample
@node Parsing of Floats
@subsection Parsing of Floats
@pindex stdlib.h
The @samp{str} functions are declared in @file{stdlib.h} and those
beginning with @samp{wcs} are declared in @file{wchar.h}. One might
wonder about the use of @code{restrict} in the prototypes of the
functions in this section. It is seemingly useless but the @w{ISO C}
standard uses it (for the functions defined there) so we have to do it
as well.
@deftypefun double strtod (const char *restrict @var{string}, char **restrict @var{tailptr})
@standards{ISO, stdlib.h}
@safety{@prelim{}@mtsafe{@mtslocale{}}@assafe{}@acsafe{}}
@c Besides the unsafe-but-ruled-safe locale uses, this uses a lot of
@c mpn, but it's all safe.
@c
@c round_and_return
@c get_rounding_mode ok
@c mpn_add_1 ok
@c mpn_rshift ok
@c MPN_ZERO ok
@c MPN2FLOAT -> mpn_construct_(float|double|long_double) ok
@c str_to_mpn
@c mpn_mul_1 -> umul_ppmm ok
@c mpn_add_1 ok
@c mpn_lshift_1 -> mpn_lshift ok
@c STRTOF_INTERNAL
@c MPN_VAR ok
@c SET_NAN_PAYLOAD ok
@c STRNCASECMP ok, wide and narrow
@c round_and_return ok
@c mpn_mul ok
@c mpn_addmul_1 ok
@c ... mpn_sub
@c mpn_lshift ok
@c udiv_qrnnd ok
@c count_leading_zeros ok
@c add_ssaaaa ok
@c sub_ddmmss ok
@c umul_ppmm ok
@c mpn_submul_1 ok
The @code{strtod} (``string-to-double'') function converts the initial
part of @var{string} to a floating-point number, which is returned as a
value of type @code{double}.
This function attempts to decompose @var{string} as follows:
@itemize @bullet
@item
A (possibly empty) sequence of whitespace characters. Which characters
are whitespace is determined by the @code{isspace} function
(@pxref{Classification of Characters}). These are discarded.
@item
An optional plus or minus sign (@samp{+} or @samp{-}).
@item A floating point number in decimal or hexadecimal format. The
decimal format is:
@itemize @minus
@item
A nonempty sequence of digits optionally containing a decimal-point
character---normally @samp{.}, but it depends on the locale
(@pxref{General Numeric}).
@item
An optional exponent part, consisting of a character @samp{e} or
@samp{E}, an optional sign, and a sequence of digits.
@end itemize
The hexadecimal format is as follows:
@itemize @minus
@item
A 0x or 0X followed by a nonempty sequence of hexadecimal digits
optionally containing a decimal-point character---normally @samp{.}, but
it depends on the locale (@pxref{General Numeric}).
@item
An optional binary-exponent part, consisting of a character @samp{p} or
@samp{P}, an optional sign, and a sequence of digits.
@end itemize
@item
Any remaining characters in the string. If @var{tailptr} is not a null
pointer, a pointer to this tail of the string is stored in
@code{*@var{tailptr}}.
@end itemize
If the string is empty, contains only whitespace, or does not contain an
initial substring that has the expected syntax for a floating-point
number, no conversion is performed. In this case, @code{strtod} returns
a value of zero and the value returned in @code{*@var{tailptr}} is the
value of @var{string}.
In a locale other than the standard @code{"C"} or @code{"POSIX"} locales,
this function may recognize additional locale-dependent syntax.
If the string has valid syntax for a floating-point number but the value
is outside the range of a @code{double}, @code{strtod} will signal
overflow or underflow as described in @ref{Math Error Reporting}.
@code{strtod} recognizes four special input strings. The strings
@code{"inf"} and @code{"infinity"} are converted to @math{@infinity{}},
or to the largest representable value if the floating-point format
doesn't support infinities. You can prepend a @code{"+"} or @code{"-"}
to specify the sign. Case is ignored when scanning these strings.
The strings @code{"nan"} and @code{"nan(@var{chars@dots{}})"} are converted
to NaN. Again, case is ignored. If @var{chars@dots{}} are provided, they
are used in some unspecified fashion to select a particular
representation of NaN (there can be several).
Since zero is a valid result as well as the value returned on error, you
should check for errors in the same way as for @code{strtol}, by
examining @code{errno} and @var{tailptr}.
@end deftypefun
@deftypefun float strtof (const char *@var{string}, char **@var{tailptr})
@deftypefunx {long double} strtold (const char *@var{string}, char **@var{tailptr})
@standards{ISO, stdlib.h}
@safety{@prelim{}@mtsafe{@mtslocale{}}@assafe{}@acsafe{}}
@comment See safety comments for strtod.
These functions are analogous to @code{strtod}, but return @code{float}
and @code{long double} values respectively. They report errors in the
same way as @code{strtod}. @code{strtof} can be substantially faster
than @code{strtod}, but has less precision; conversely, @code{strtold}
can be much slower but has more precision (on systems where @code{long
double} is a separate type).
These functions have been GNU extensions and are new to @w{ISO C99}.
@end deftypefun
@deftypefun _FloatN strtofN (const char *@var{string}, char **@var{tailptr})
@deftypefunx _FloatNx strtofNx (const char *@var{string}, char **@var{tailptr})
@standards{ISO/IEC TS 18661-3, stdlib.h}
@safety{@prelim{}@mtsafe{@mtslocale{}}@assafe{}@acsafe{}}
@comment See safety comments for strtod.
These functions are like @code{strtod}, except for the return type.
They were introduced in @w{ISO/IEC TS 18661-3} and are available on machines
that support the related types; @pxref{Mathematics}.
@end deftypefun
@deftypefun double wcstod (const wchar_t *restrict @var{string}, wchar_t **restrict @var{tailptr})
@deftypefunx float wcstof (const wchar_t *@var{string}, wchar_t **@var{tailptr})
@deftypefunx {long double} wcstold (const wchar_t *@var{string}, wchar_t **@var{tailptr})
@deftypefunx _FloatN wcstofN (const wchar_t *@var{string}, wchar_t **@var{tailptr})
@deftypefunx _FloatNx wcstofNx (const wchar_t *@var{string}, wchar_t **@var{tailptr})
@standards{ISO, wchar.h}
@standardsx{wcstofN, GNU, wchar.h}
@standardsx{wcstofNx, GNU, wchar.h}
@safety{@prelim{}@mtsafe{@mtslocale{}}@assafe{}@acsafe{}}
@comment See safety comments for strtod.
The @code{wcstod}, @code{wcstof}, @code{wcstol}, @code{wcstof@var{N}},
and @code{wcstof@var{N}x} functions are equivalent in nearly all aspects
to the @code{strtod}, @code{strtof}, @code{strtold},
@code{strtof@var{N}}, and @code{strtof@var{N}x} functions, but they
handle wide character strings.
The @code{wcstod} function was introduced in @w{Amendment 1} of @w{ISO
C90}. The @code{wcstof} and @code{wcstold} functions were introduced in
@w{ISO C99}.
The @code{wcstof@var{N}} and @code{wcstof@var{N}x} functions are not in
any standard, but are added to provide completeness for the
non-deprecated interface of wide character string to floating-point
conversion functions. They are only available on machines that support
the related types; @pxref{Mathematics}.
@end deftypefun
@deftypefun double atof (const char *@var{string})
@standards{ISO, stdlib.h}
@safety{@prelim{}@mtsafe{@mtslocale{}}@assafe{}@acsafe{}}
This function is similar to the @code{strtod} function, except that it
need not detect overflow and underflow errors. The @code{atof} function
is provided mostly for compatibility with existing code; using
@code{strtod} is more robust.
@end deftypefun
@Theglibc{} also provides @samp{_l} versions of these functions,
which take an additional argument, the locale to use in conversion.
See also @ref{Parsing of Integers}.
@node Printing of Floats
@section Printing of Floats
@pindex stdlib.h
The @samp{strfrom} functions are declared in @file{stdlib.h}.
@deftypefun int strfromd (char *restrict @var{string}, size_t @var{size}, const char *restrict @var{format}, double @var{value})
@deftypefunx int strfromf (char *restrict @var{string}, size_t @var{size}, const char *restrict @var{format}, float @var{value})
@deftypefunx int strfroml (char *restrict @var{string}, size_t @var{size}, const char *restrict @var{format}, long double @var{value})
@standards{ISO/IEC TS 18661-1, stdlib.h}
@safety{@prelim{}@mtsafe{@mtslocale{}}@asunsafe{@ascuheap{}}@acunsafe{@acsmem{}}}
@comment All these functions depend on both __printf_fp and __printf_fphex,
@comment which are both AS-unsafe (ascuheap) and AC-unsafe (acsmem).
The functions @code{strfromd} (``string-from-double''), @code{strfromf}
(``string-from-float''), and @code{strfroml} (``string-from-long-double'')
convert the floating-point number @var{value} to a string of characters and
stores them into the area pointed to by @var{string}. The conversion
writes at most @var{size} characters and respects the format specified by
@var{format}.
The format string must start with the character @samp{%}. An optional
precision follows, which starts with a period, @samp{.}, and may be
followed by a decimal integer, representing the precision. If a decimal
integer is not specified after the period, the precision is taken to be
zero. The character @samp{*} is not allowed. Finally, the format string
ends with one of the following conversion specifiers: @samp{a}, @samp{A},
@samp{e}, @samp{E}, @samp{f}, @samp{F}, @samp{g} or @samp{G} (@pxref{Table
of Output Conversions}). Invalid format strings result in undefined
behavior.
These functions return the number of characters that would have been
written to @var{string} had @var{size} been sufficiently large, not
counting the terminating null character. Thus, the null-terminated output
has been completely written if and only if the returned value is less than
@var{size}.
These functions were introduced by ISO/IEC TS 18661-1.
@end deftypefun
@deftypefun int strfromfN (char *restrict @var{string}, size_t @var{size}, const char *restrict @var{format}, _Float@var{N} @var{value})
@deftypefunx int strfromfNx (char *restrict @var{string}, size_t @var{size}, const char *restrict @var{format}, _Float@var{N}x @var{value})
@standards{ISO/IEC TS 18661-3, stdlib.h}
@safety{@prelim{}@mtsafe{@mtslocale{}}@asunsafe{@ascuheap{}}@acunsafe{@acsmem{}}}
@comment See safety comments for strfromd.
These functions are like @code{strfromd}, except for the type of
@code{value}.
They were introduced in @w{ISO/IEC TS 18661-3} and are available on machines
that support the related types; @pxref{Mathematics}.
@end deftypefun
@node System V Number Conversion
@section Old-fashioned System V number-to-string functions
The old @w{System V} C library provided three functions to convert
numbers to strings, with unusual and hard-to-use semantics. @Theglibc{}
also provides these functions and some natural extensions.
These functions are only available in @theglibc{} and on systems descended
from AT&T Unix. Therefore, unless these functions do precisely what you
need, it is better to use @code{sprintf}, which is standard.
All these functions are defined in @file{stdlib.h}.
@deftypefun {char *} ecvt (double @var{value}, int @var{ndigit}, int *@var{decpt}, int *@var{neg})
@standards{SVID, stdlib.h}
@standards{Unix98, stdlib.h}
@safety{@prelim{}@mtunsafe{@mtasurace{:ecvt}}@asunsafe{}@acsafe{}}
The function @code{ecvt} converts the floating-point number @var{value}
to a string with at most @var{ndigit} decimal digits. The
returned string contains no decimal point or sign. The first digit of
the string is non-zero (unless @var{value} is actually zero) and the
last digit is rounded to nearest. @code{*@var{decpt}} is set to the
index in the string of the first digit after the decimal point.
@code{*@var{neg}} is set to a nonzero value if @var{value} is negative,
zero otherwise.
If @var{ndigit} decimal digits would exceed the precision of a
@code{double} it is reduced to a system-specific value.
The returned string is statically allocated and overwritten by each call
to @code{ecvt}.
If @var{value} is zero, it is implementation defined whether
@code{*@var{decpt}} is @code{0} or @code{1}.
For example: @code{ecvt (12.3, 5, &d, &n)} returns @code{"12300"}
and sets @var{d} to @code{2} and @var{n} to @code{0}.
@end deftypefun
@deftypefun {char *} fcvt (double @var{value}, int @var{ndigit}, int *@var{decpt}, int *@var{neg})
@standards{SVID, stdlib.h}
@standards{Unix98, stdlib.h}
@safety{@prelim{}@mtunsafe{@mtasurace{:fcvt}}@asunsafe{@ascuheap{}}@acunsafe{@acsmem{}}}
The function @code{fcvt} is like @code{ecvt}, but @var{ndigit} specifies
the number of digits after the decimal point. If @var{ndigit} is less
than zero, @var{value} is rounded to the @math{@var{ndigit}+1}'th place to the
left of the decimal point. For example, if @var{ndigit} is @code{-1},
@var{value} will be rounded to the nearest 10. If @var{ndigit} is
negative and larger than the number of digits to the left of the decimal
point in @var{value}, @var{value} will be rounded to one significant digit.
If @var{ndigit} decimal digits would exceed the precision of a
@code{double} it is reduced to a system-specific value.
The returned string is statically allocated and overwritten by each call
to @code{fcvt}.
@end deftypefun
@deftypefun {char *} gcvt (double @var{value}, int @var{ndigit}, char *@var{buf})
@standards{SVID, stdlib.h}
@standards{Unix98, stdlib.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
@c gcvt calls sprintf, that ultimately calls vfprintf, which malloc()s
@c args_value if it's too large, but gcvt never exercises this path.
@code{gcvt} is functionally equivalent to @samp{sprintf(buf, "%*g",
ndigit, value)}. It is provided only for compatibility's sake. It
returns @var{buf}.
If @var{ndigit} decimal digits would exceed the precision of a
@code{double} it is reduced to a system-specific value.
@end deftypefun
As extensions, @theglibc{} provides versions of these three
functions that take @code{long double} arguments.
@deftypefun {char *} qecvt (long double @var{value}, int @var{ndigit}, int *@var{decpt}, int *@var{neg})
@standards{GNU, stdlib.h}
@safety{@prelim{}@mtunsafe{@mtasurace{:qecvt}}@asunsafe{}@acsafe{}}
This function is equivalent to @code{ecvt} except that it takes a
@code{long double} for the first parameter and that @var{ndigit} is
restricted by the precision of a @code{long double}.
@end deftypefun
@deftypefun {char *} qfcvt (long double @var{value}, int @var{ndigit}, int *@var{decpt}, int *@var{neg})
@standards{GNU, stdlib.h}
@safety{@prelim{}@mtunsafe{@mtasurace{:qfcvt}}@asunsafe{@ascuheap{}}@acunsafe{@acsmem{}}}
This function is equivalent to @code{fcvt} except that it
takes a @code{long double} for the first parameter and that @var{ndigit} is
restricted by the precision of a @code{long double}.
@end deftypefun
@deftypefun {char *} qgcvt (long double @var{value}, int @var{ndigit}, char *@var{buf})
@standards{GNU, stdlib.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
This function is equivalent to @code{gcvt} except that it takes a
@code{long double} for the first parameter and that @var{ndigit} is
restricted by the precision of a @code{long double}.
@end deftypefun
@cindex gcvt_r
The @code{ecvt} and @code{fcvt} functions, and their @code{long double}
equivalents, all return a string located in a static buffer which is
overwritten by the next call to the function. @Theglibc{}
provides another set of extended functions which write the converted
string into a user-supplied buffer. These have the conventional
@code{_r} suffix.
@code{gcvt_r} is not necessary, because @code{gcvt} already uses a
user-supplied buffer.
@deftypefun int ecvt_r (double @var{value}, int @var{ndigit}, int *@var{decpt}, int *@var{neg}, char *@var{buf}, size_t @var{len})
@standards{GNU, stdlib.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
The @code{ecvt_r} function is the same as @code{ecvt}, except
that it places its result into the user-specified buffer pointed to by
@var{buf}, with length @var{len}. The return value is @code{-1} in
case of an error and zero otherwise.
This function is a GNU extension.
@end deftypefun
@deftypefun int fcvt_r (double @var{value}, int @var{ndigit}, int *@var{decpt}, int *@var{neg}, char *@var{buf}, size_t @var{len})
@standards{SVID, stdlib.h}
@standards{Unix98, stdlib.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
The @code{fcvt_r} function is the same as @code{fcvt}, except that it
places its result into the user-specified buffer pointed to by
@var{buf}, with length @var{len}. The return value is @code{-1} in
case of an error and zero otherwise.
This function is a GNU extension.
@end deftypefun
@deftypefun int qecvt_r (long double @var{value}, int @var{ndigit}, int *@var{decpt}, int *@var{neg}, char *@var{buf}, size_t @var{len})
@standards{GNU, stdlib.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
The @code{qecvt_r} function is the same as @code{qecvt}, except
that it places its result into the user-specified buffer pointed to by
@var{buf}, with length @var{len}. The return value is @code{-1} in
case of an error and zero otherwise.
This function is a GNU extension.
@end deftypefun
@deftypefun int qfcvt_r (long double @var{value}, int @var{ndigit}, int *@var{decpt}, int *@var{neg}, char *@var{buf}, size_t @var{len})
@standards{GNU, stdlib.h}
@safety{@prelim{}@mtsafe{}@assafe{}@acsafe{}}
The @code{qfcvt_r} function is the same as @code{qfcvt}, except
that it places its result into the user-specified buffer pointed to by
@var{buf}, with length @var{len}. The return value is @code{-1} in
case of an error and zero otherwise.
This function is a GNU extension.
@end deftypefun