1969 lines
73 KiB
Plaintext
1969 lines
73 KiB
Plaintext
@c We need some definitions here.
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@ifhtml
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@set mult ·
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@end ifhtml
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@iftex
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@set mult @cdot
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@end iftex
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@ifclear mult
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@set mult x
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@end ifclear
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@macro mul
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@value{mult}
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@end macro
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@iftex
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@set infty @infty
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@end iftex
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@ifclear infty
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@set infty oo
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@end ifclear
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@macro infinity
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@value{infty}
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@end macro
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@node Mathematics, Arithmetic, Low-Level Terminal Interface, Top
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@chapter Mathematics
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This chapter contains information about functions for performing
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mathematical computations, such as trigonometric functions. Most of
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these functions have prototypes declared in the header file
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@file{math.h}.
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@pindex math.h
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For all functions which take a single floating-point argument and for
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several other functions as well there are three different functions
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available for the type @code{double}, @code{float}, and @code{long
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double}. The @code{double} versions of the functions are mostly defined
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even in the @w{ISO C 89} standard. The @code{float} and @code{long
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double} variants are introduced in the numeric extensions for the C
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language which are part of the @w{ISO C 9X} standard.
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Which of the three versions of the function should be used depends on
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the situation. For most functions and implementation it is true that
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speed and precision do not go together. I.e., the @code{float} versions
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are normally faster than the @code{double} and @code{long double}
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versions. On the other hand the @code{long double} version has the
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highest precision. One should always think about the actual needs and
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in case of double using @code{double} is a good compromise.
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@menu
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* Domain and Range Errors:: Detecting overflow conditions and the like.
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* Exceptions in Math Functions:: Signalling exception in math functions.
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* Mathematical Constants:: Precise numeric values for often used
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constant.
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* FP Comparison Functions:: Special functions to compare floating-point
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numbers.
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* FP Function Optimizations:: Fast code or small code.
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* Trig Functions:: Sine, cosine, and tangent.
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* Inverse Trig Functions:: Arc sine, arc cosine, and arc tangent.
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* Exponents and Logarithms:: Also includes square root.
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* Hyperbolic Functions:: Hyperbolic sine and friends.
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* Pseudo-Random Numbers:: Functions for generating pseudo-random
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numbers.
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@end menu
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@node Domain and Range Errors
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@section Domain and Range Errors
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@cindex domain error
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Many of the functions listed in this chapter are defined mathematically
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over a domain that is only a subset of real numbers. For example, the
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@code{acos} function is defined over the domain between @code{@minus{}1} and
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@code{1}. If you pass an argument to one of these functions that is
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outside the domain over which it is defined, the function sets
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@code{errno} to @code{EDOM} to indicate a @dfn{domain error}. On
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machines that support @w{IEEE 754} floating point, functions reporting
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error @code{EDOM} also return a NaN.
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Some of these functions are defined mathematically to result in a
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complex value over parts of their domains. The most familiar example of
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this is taking the square root of a negative number. The functions in
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this chapter take only real arguments and return only real values;
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therefore, if the value ought to be nonreal, this is treated as a domain
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error.
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@cindex range error
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A related problem is that the mathematical result of a function may not
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be representable as a floating point number. If magnitude of the
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correct result is too large to be represented, the function sets
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@code{errno} to @code{ERANGE} to indicate a @dfn{range error}, and
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returns a particular very large value (named by the macro
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@code{HUGE_VAL}) or its negation (@code{@minus{}HUGE_VAL}).
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If the magnitude of the result is too small, a value of zero is returned
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instead. In this case, @code{errno} might or might not be
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set to @code{ERANGE}.
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The only completely reliable way to check for domain and range errors is
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to set @code{errno} to @code{0} before you call the mathematical function
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and test @code{errno} afterward. As a consequence of this use of
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@code{errno}, use of the mathematical functions is not reentrant if you
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check for errors.
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@c ### This is no longer true. --drepper
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@c None of the mathematical functions ever generates signals as a result of
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@c domain or range errors. In particular, this means that you won't see
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@c @code{SIGFPE} signals generated within these functions. (@xref{Signal
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@c Handling}, for more information about signals.)
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@comment math.h
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@comment ISO
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@deftypevr Macro double HUGE_VAL
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An expression representing a particular very large number. On machines
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that use @w{IEEE 754}/@w{IEEE 854} floating point format, the value is
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``infinity''. On other machines, it's typically the largest positive
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number that can be represented.
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The value of this macro is used as the return value from various
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mathematical @code{double} returning functions in overflow situations.
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@end deftypevr
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@comment math.h
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@comment ISO
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@deftypevr Macro float HUGE_VALF
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This macro is similar to the @code{HUGE_VAL} macro except that it is
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used by functions returning @code{float} values.
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This macro is introduced in @w{ISO C 9X}.
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@end deftypevr
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@comment math.h
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@comment ISO
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@deftypevr Macro {long double} HUGE_VALL
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This macro is similar to the @code{HUGE_VAL} macro except that it is
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used by functions returning @code{long double} values. The value is
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only different from @code{HUGE_VAL} if the architecture really supports
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@code{long double} values.
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This macro is introduced in @w{ISO C 9X}.
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@end deftypevr
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A special case is the @code{ilogb} function @pxref{Exponents and
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Logarithms}. Since the return value is an integer value, one cannot
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compare with @code{HUGE_VAL} etc. Therefore two further values are
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defined.
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@comment math.h
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@comment ISO
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@deftypevr Macro int FP_ILOGB0
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This value is returned by @code{ilogb} if the argument is @code{0}. The
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numeric value is either @code{INT_MIN} or @code{-INT_MAX}.
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This macro is introduced in @w{ISO C 9X}.
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@end deftypevr
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@comment math.h
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@comment ISO
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@deftypevr Macro int FP_ILOGBNAN
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This value is returned by @code{ilogb} if the argument is @code{NaN}. The
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numeric value is either @code{INT_MIN} or @code{INT_MAX}.
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This macro is introduced in @w{ISO C 9X}.
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@end deftypevr
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For more information about floating-point representations and limits,
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see @ref{Floating Point Parameters}. In particular, the macro
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@code{DBL_MAX} might be more appropriate than @code{HUGE_VAL} for many
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uses other than testing for an error in a mathematical function.
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@node Exceptions in Math Functions
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@section Exceptions in Math Functions
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@cindex exception
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@cindex signal
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Due to the restrictions in the size of the floating-point number
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representation or the limitation of the input range of certain functions
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some of the mathematical operations and functions have to signal
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exceptional situations. The @w{IEEE 754} standard specifies which
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exceptions have to be supported and how they can be handled.
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@w{IEEE 754} specifies two actions for floating-point exception: taking
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a trap or continuing without doing so. If the trap is taken a
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(possibly) user defined trap handler is called and this function can
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correct the argument or react somehow else on the call. If the trap
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handler returns, its return value is taken as the result of the
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operation.
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If no trap handler is called each of the known exceptions has a default
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action. This consists of setting a corresponding bit in the
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floating-point status word to indicate which kind of exception was
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raised and to return a default value, which depends on the exception
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(see the table below).
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@noindent
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The exceptions defined in @w{IEEE 754} are:
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@table @samp
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@item Invalid Operation
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This exception is raised if the given operands are invalid for the
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operation to be performed. Examples are
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(see @w{IEEE 754}, @w{section 7}):
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@enumerate
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@item
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Any operation on a signalling NaN.
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@item
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Addition or subtraction; magnitude subtraction of infinities such as
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@math{(+@infinity{}) + (-@infinity{})}.
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@item
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Multiplication:
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@math{0 @mul{} @infinity{}}.
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@item
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Division: @math{0/0} or @math{@infinity{}/@infinity{}}.
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@item
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Remainder: @math{x} REM @math{y}, where @math{y} is zero or @math{x} is
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infinite.
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@item
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Square root if the operand is less then zero.
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@item
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Conversion of an internal floating-point number to an integer or to a
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decimal string when overflow, infinity, or NaN precludes a faithful
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representation in that format and this cannot otherwise be signaled.
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@item
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Conversion of an unrecognizable input string.
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@item
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Comparison via predicates involving @math{<} or @math{>}, without
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@code{?}, when the operands are @dfn{unordered}. (@math{?>} means the
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unordered greater relation, @xref{FP Comparison Functions}).
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@end enumerate
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If the exception does not cause a trap handler to be called the result
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of the operation is taken as a quiet NaN.
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@item Division by Zero
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This exception is raised if the divisor is zero and the dividend is a
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finite nonzero number. If no trap occurs the result is either
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@math{+@infinity{}} or @math{-@infinity{}}, depending on the
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signs of the operands.
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@item Overflow
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This exception is signalled whenever the result cannot be represented
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as a finite value in the precision format of the destination. If no trap
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occurs the result depends on the sign of the intermediate result and the
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current rounding mode (@w{IEEE 754}, @w{section 7.3}):
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@enumerate
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@item
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Round to nearest carries all overflows to @math{@infinity{}}
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with the sign of the intermediate result.
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@item
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Round toward @math{0} carries all overflows to the precision's largest
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finite number with the sign of the intermediate result.
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@item
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Round toward @math{-@infinity{}} carries positive overflows to the
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precision's largest finite number and carries negative overflows to
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@math{-@infinity{}}.
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@item
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Round toward @math{@infinity{}} carries negative overflows to the
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precision's most negative finite number and carries positive overflows
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to @math{@infinity{}}.
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@end enumerate
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@item Underflow
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The underflow exception is created when an intermediate result is too
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small for the operation or if the operations result rounded to the
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destination precision causes a loss of accuracy by approximating the
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result by denormalized numbers.
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When no trap is installed for the underflow exception, underflow shall
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be signaled (via the underflow flag) only when both tininess and loss of
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accuracy have been detected. If no trap handler is installed the
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operation continues with an inprecise small value or zero if the
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destination precision cannot hold the small exact result.
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@item Inexact
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This exception is signalled if the rounded result is not exact (such as
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computing the square root of two) or the result overflows without an
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overflow trap.
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@end table
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To control whether an exception causes a trap to occur all @w{IEEE 754}
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conformant floating-point implementations (either hardware or software)
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have a control word. By setting specific bits for each exception in
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this control word the programmer can decide whether a trap is wanted or
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not.
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@w{ISO C 9X} introduces a set of function which can be used to control
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exceptions. There are functions to manipulate the control word, to
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query the status word or to save and restore the whole state of the
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floating-point unit. There are also functions to control the rounding
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mode used.
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@menu
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* Status bit operations:: Manipulate the FP status word.
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* FPU environment:: Controlling the status of the FPU.
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* Rounding Modes:: Controlling the rounding mode.
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@end menu
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@node Status bit operations
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@subsection Controlling the FPU status word
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To control the five types of exceptions defined in @w{IEEE 754} some
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functions are defined which abstract the interface to the FPU. The
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actual implementation can be very different, depending on the underlying
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hardware or software.
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To address the single exception the @file{fenv.h} headers defines a
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number of macros:
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@vtable @code
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@comment fenv.h
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@comment ISO
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@item FE_INEXACT
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Represents the inexact exception iff the FPU supports this exception.
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@comment fenv.h
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@comment ISO
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@item FE_DIVBYZERO
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Represents the divide by zero exception iff the FPU supports this exception.
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@comment fenv.h
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@comment ISO
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@item FE_UNDERFLOW
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Represents the underflow exception iff the FPU supports this exception.
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@comment fenv.h
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@comment ISO
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@item FE_OVERFLOW
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Represents the overflow exception iff the FPU supports this exception.
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@comment fenv.h
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@comment ISO
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@item FE_INVALID
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Represents the invalid exception iff the FPU supports this exception.
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@end vtable
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The macro @code{FE_ALL_EXCEPT} is the bitwise OR of all exception macros
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which are supported by the FP implementation.
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Each of the supported exception flags can either be set or unset. The
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@w{ISO C 9X} standard defines functions to set, unset and test the
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status of the flags.
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@comment fenv.h
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@comment ISO
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@deftypefun void feclearexcept (int @var{excepts})
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This function clears all of the supported exception flags denoted by
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@var{excepts} in the status word.
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@end deftypefun
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To safe the current status of the flags in the status word @file{fenv.h}
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defines the type @code{fexcept_t} which can hold all the information.
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The following function can be used to retrieve the current setting.
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@comment fenv.h
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@comment ISO
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@deftypefun void fegetexceptflag (fexcept_t *@var{flagp}, int @var{excepts})
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Store in the variable pointed to by @var{flagp} an
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implementation-defined value representing the current setting of the
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exception flags indicated by the parameter @var{excepts}.
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@end deftypefun
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@noindent
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To restore the previously saved values one can use this function:
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@comment fenv.h
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@comment ISO
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@deftypefun void fesetexceptflag (const fexcept_t *@var{flagp}, int @var{excepts})
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Restore from the variable pointed to by @var{flagp} the setting of the
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flags for the exceptions denoted by the value of the parameter
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@var{excepts}.
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@end deftypefun
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The last function allows to query the current status of the flags. The
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flags can be set either explicitely (using @code{fesetexceptflag} or
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@code{feclearexcept}) or by a floating-point operation which happened
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before. Since the flags are accumulative, the flags must be explicitely
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reset using @code{feclearexcept} if one wants to test for a certain
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exceptions raised by a specific piece of code.
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@comment fenv.h
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@comment ISO
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@deftypefun int fetestexcept (int @var{excepts})
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Test whether a subset of the flags indicated by the parameter
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@var{except} is currently set. If yes, a nonzero value is returned
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which specifies which exceptions are set. Otherwise the result is zero.
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@end deftypefun
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@noindent
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Code which uses the @code{fetestexcept} function could look like this:
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@smallexample
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@{
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double f;
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int raised;
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feclearexcept (FE_ALL_EXCEPT);
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f = compute ();
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raised = fetestexcept (FE_OVERFLOW | FE_INVALID);
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if (raised & FE_OVERFLOW) @{ /* ... */ @}
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if (raised & FE_INVALID) @{ /* ... */ @}
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/* ... */
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@}
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@end smallexample
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Please note that the return value of @code{fetestexcept} is @code{int}
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but this does not mean that the @code{fexcept_t} type is generally
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representable as an integer. These are completely independent types.
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@node FPU environment
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@subsection Controlling the Floating-Point environment
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It is sometimes necessary so save the complete status of the
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floating-point unit for a certain time to perform some completely
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different actions. Beside the status of the exception flags, the
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control word for the exceptions and the rounding mode can be saved.
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The file @file{fenv.h} defines the type @code{fenv_t}. The layout of a
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variable of this type is implementation defined but the variable is able
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to contain the complete status information. To fill a variable of this
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type one can use this function:
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@comment fenv.h
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@comment ISO
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@deftypefun void fegetenv (fenv_t *@var{envp})
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Store the current floating-point environment in the object pointed to by
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@var{envp}.
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@end deftypefun
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@noindent
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Another possibility which is useful in several situations is
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@comment fenv.h
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@comment ISO
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@deftypefun int feholdexcept (fenv_t *@var{envp})
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Store the current floating-point environment in the object pointed to by
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@var{envp}. Afterwards, all exception flags are cleared and if
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available a mode is installed which continues on all exceptions and does
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not cause a trap to occur. In this case a nonzero value is returned.
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If the floating-point implementation does not support such a non-stop
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mode, the return value is zero.
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@end deftypefun
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The functions which allow a state of the floating-point unit to be
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restored can take two kinds of arguments:
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@itemize @bullet
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@item
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Pointers to @code{fenv_t} objects which were initialized previously by a
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call to @code{fegetenv} or @code{feholdexcept}.
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@item
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@vindex FE_DFL_ENV
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The special macro @code{FE_DFL_ENV} which represents the floating-point
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environment as it was available at program start.
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@item
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Implementation defined macros with names starting with @code{FE_}.
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@vindex FE_NOMASK_ENV
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If possible, the GNU C Library defines a macro @code{FE_NOMASK_ENV}
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which represents an environment where no exceptions are masked, so every
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exception raised causes a trap to occur. You can test for this macro
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using @code{#ifdef}.
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Some platforms might define other predefined environments.
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@end itemize
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@noindent
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To set any of the environments there are two functions defined.
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@deftypefun void fesetenv (const fenv_t *@var{envp})
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Establish the floating-point environment described in the object pointed
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to by @var{envp}. Even if one or more exceptions flags in the restored
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environment are set no exception is raised.
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@end deftypefun
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In some situations the previous status of the exception flags must not
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simply be discarded and so this function is useful:
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@deftypefun void feupdateenv (const fenv_t *@var{envp})
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The current status of the floating-point unit is preserved in some
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automatic storage before the environment described by the object pointed
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to by @var{envp} is installed. Once this is finished all exceptions set
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in the original environment which is saved in the automatic storage, is
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raised.
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@end deftypefun
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This function can be used to execute a part of the program with an
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environment which masks all exceptions and before switching back remove
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unwanted exception and raise the remaining exceptions.
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@node Rounding Modes
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@subsection Rounding modes of the Floating-Point Unit
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@w{IEEE 754} defines four different rounding modes. If the rounding
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mode is supported by the floating-point implementation the corresponding
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|
of the following macros is defined:
|
|
|
|
@table @code
|
|
@comment fenv.h
|
|
@comment ISO
|
|
@vindex FE_TONEAREST
|
|
@item FE_TONEAREST
|
|
Round to nearest. This is the default mode and should always be used
|
|
except when a different mode is explicitely required. Only rounding to
|
|
nearest guarantees numeric stability of the computations.
|
|
|
|
@comment fenv.h
|
|
@comment ISO
|
|
@vindex FE_UPWARD
|
|
@item FE_UPWARD
|
|
Round toward @math{+@infinity{}}.
|
|
|
|
@comment fenv.h
|
|
@comment ISO
|
|
@vindex FE_DOWNWARD
|
|
@item FE_DOWNWARD
|
|
Round toward @math{-@infinity{}}.
|
|
|
|
@comment fenv.h
|
|
@comment ISO
|
|
@vindex FE_TOWARDZERO
|
|
@item FE_TOWARDZERO
|
|
Round toward zero.
|
|
@end table
|
|
|
|
At any time one of the above four rounding modes is selected. To get
|
|
information about the currently selected mode one can use this function:
|
|
|
|
@comment fenv.h
|
|
@comment ISO
|
|
@deftypefun int fegetround (void)
|
|
Return the currently selected rounding mode, represented by one of the
|
|
values of the defined rounding mode macros.
|
|
@end deftypefun
|
|
|
|
@noindent
|
|
To set a specific rounding mode the next function can be used.
|
|
|
|
@comment fenv.h
|
|
@comment ISO
|
|
@deftypefun int fesetround (int @var{round})
|
|
Change the currently selected rounding mode to the mode described by the
|
|
parameter @var{round}. If @var{round} does not correspond to one of the
|
|
supported rounding modes nothing is changed.
|
|
|
|
The function returns a nonzero value iff the requested rounding mode can
|
|
be established. Otherwise zero is returned.
|
|
@end deftypefun
|
|
|
|
Changing the rounding mode might be necessary for various reasons. But
|
|
changing the mode only to round a given number normally is no good idea.
|
|
The standard defines a set of functions which can be used to round an
|
|
argument according to some rules and for all of the rounding modes there
|
|
is a corresponding function.
|
|
|
|
If a large set of number has to be rounded it might be good to change
|
|
the rounding mode and to not use the function the library provides. So
|
|
the perhaps necessary switching of the rounding mode in the library
|
|
function can be avoided. But since not all rounding modes are
|
|
guaranteed to exist on any platform this possible implementation cannot
|
|
be portably used. A default method has to be implemented as well.
|
|
|
|
|
|
@node Mathematical Constants
|
|
@section Predefined Mathematical Constants
|
|
@cindex constants
|
|
@cindex mathematical constants
|
|
|
|
The header @file{math.h} defines a series of mathematical constants if
|
|
@code{_BSD_SOURCE} or a more general feature select macro is defined
|
|
before including this file. All values are defined as preprocessor
|
|
macros starting with @code{M_}. The collection includes:
|
|
|
|
@vtable @code
|
|
@item M_E
|
|
The value is that of the base of the natural logarithm.
|
|
@item M_LOG2E
|
|
The value is computed as the logarithm to base @code{2} of @code{M_E}.
|
|
@item M_LOG10E
|
|
The value is computed as the logarithm to base @code{10} of @code{M_E}.
|
|
@item M_LN2
|
|
The value is computed as the natural logarithm of @code{2}.
|
|
@item M_LN10
|
|
The value is computed as the natural logarithm of @code{10}.
|
|
@item M_PI
|
|
The value is those of the number pi.
|
|
@item M_PI_2
|
|
The value is those of the number pi divided by two.
|
|
@item M_PI_4
|
|
The value is those of the number pi divided by four.
|
|
@item M_1_PI
|
|
The value is the reziprocal of the value of the number pi.
|
|
@item M_2_PI
|
|
The value is two times the reziprocal of the value of the number pi.
|
|
@item M_2_SQRTPI
|
|
The value is two times the reziprocal of the square root of the number pi.
|
|
@item M_SQRT2
|
|
The value is the square root of the value of the number pi.
|
|
@item M_SQRT1_2
|
|
The value is the reziprocal of the square root of the value of the number pi.
|
|
@end vtable
|
|
|
|
All values are defined as @code{long double} values unless the compiler
|
|
does not support this type or @code{__STDC__} is not defined (both is
|
|
unlikely). Historically the numbers were @code{double} values and some
|
|
old code still relies on this so you might want to add explicit casts if
|
|
the extra precision of the @code{long double} value is not needed. One
|
|
critical case are functions with a variable number of arguments, such as
|
|
@code{printf}.
|
|
|
|
@vindex PI
|
|
@emph{Note:} Some programs use a constant named @code{PI} which has the
|
|
same value as @code{M_PI}. This probably derives from Stroustroup's
|
|
book about his C++ programming language where this value is used in
|
|
examples (and perhaps some AT&T headers contain this value). But due to
|
|
possible name space problems (@code{PI} is a quite frequently used name)
|
|
this value is not added to @file{math.h}. Every program should use
|
|
@code{M_PI} instead or add on the compiler command line
|
|
@code{-DPI=M_PI}.
|
|
|
|
|
|
@node FP Comparison Functions
|
|
@section Floating-Point Comparison Functions
|
|
@cindex unordered comparison
|
|
|
|
The @w{IEEE 754} standards defines a set of functions which allows to
|
|
compare even those numbers which normally would cause an exception to be
|
|
raised since they are unordered. E.g., the expression
|
|
|
|
@smallexample
|
|
int v = a < 1.0;
|
|
@end smallexample
|
|
|
|
@noindent
|
|
would raise an exception if @var{a} would be a NaN. Functions to
|
|
compare unordered numbers are part of the FORTRAN language for a long
|
|
time and the extensions in @w{ISO C 9X} finally introduce them as well
|
|
for the C programming language.
|
|
|
|
All of the operations are implemented as macros which allow their
|
|
arguments to be of either @code{float}, @code{double}, or @code{long
|
|
double} type.
|
|
|
|
@comment math.h
|
|
@comment ISO
|
|
@deftypefn {Macro} int isgreater (@emph{real-floating} @var{x}, @emph{real-floating} @var{y})
|
|
This macro determines whether the argument @var{x} is greater than
|
|
@var{y}. This is equivalent to @code{(@var{x}) > (@var{y})} but no
|
|
exception is raised if @var{x} or @var{y} are unordered.
|
|
@end deftypefn
|
|
|
|
@comment math.h
|
|
@comment ISO
|
|
@deftypefn {Macro} int isgreaterequal (@emph{real-floating} @var{x}, @emph{real-floating} @var{y})
|
|
This macro determines whether the argument @var{x} is greater than or
|
|
equal to @var{y}. This is equivalent to @code{(@var{x}) >= (@var{y})} but no
|
|
exception is raised if @var{x} or @var{y} are unordered.
|
|
@end deftypefn
|
|
|
|
@comment math.h
|
|
@comment ISO
|
|
@deftypefn {Macro} int isless (@emph{real-floating} @var{x}, @emph{real-floating} @var{y})
|
|
This macro determines whether the argument @var{x} is less than @var{y}.
|
|
This is equivalent @code{(@var{x}) < (@var{y})} but no exception is raised if
|
|
@var{x} or @var{y} are unordered.
|
|
@end deftypefn
|
|
|
|
@comment math.h
|
|
@comment ISO
|
|
@deftypefn {Macro} int islessequal (@emph{real-floating} @var{x}, @emph{real-floating} @var{y})
|
|
This macro determines whether the argument @var{x} is less than or equal
|
|
to @var{y}. This is equivalent to @code{(@var{x}) <= (@var{y})} but no
|
|
exception is raised if @var{x} or @var{y} are unordered.
|
|
@end deftypefn
|
|
|
|
@comment math.h
|
|
@comment ISO
|
|
@deftypefn {Macro} int islessgreater (@emph{real-floating} @var{x}, @emph{real-floating} @var{y})
|
|
This macro determines whether the argument @var{x} is less or greater
|
|
than @var{y}. This is equivalent to @code{(@var{x}) < (@var{y}) ||
|
|
(@var{x}) > (@var{y})} (except that @var{x} and @var{y} are only
|
|
evaluated once) but no exception is raised if @var{x} or @var{y} are
|
|
unordered.
|
|
@end deftypefn
|
|
|
|
@comment math.h
|
|
@comment ISO
|
|
@deftypefn {Macro} int isunordered (@emph{real-floating} @var{x}, @emph{real-floating} @var{y})
|
|
This macro determines whether its arguments are unordered.
|
|
@end deftypefn
|
|
|
|
All the macros are defined in a way to ensure that both arguments are
|
|
evaluated exactly once and so they can be used exactly like the builtin
|
|
operators.
|
|
|
|
On several platform these macros are mapped to efficient instructions
|
|
the processor understands. But on machines missing these functions, the
|
|
macros above might be rather slow. So it is best to use the builtin
|
|
operators unless it is necessary to use unordered comparisons.
|
|
|
|
@strong{Note:} There are no macros @code{isequal} or @code{isunequal}.
|
|
These macros are not necessary since the @w{IEEE 754} standard requires
|
|
that the comparison for equality and unequality do @emph{not} throw an
|
|
exception if one of the arguments is an unordered value.
|
|
|
|
|
|
@node FP Function Optimizations
|
|
@section Is Fast Code or Small Code preferred?
|
|
@cindex Optimization
|
|
|
|
If an application uses many floating point function it is often the case
|
|
that the costs for the function calls itselfs are not neglectable.
|
|
Modern processor implementation often can execute the operation itself
|
|
very fast but the call means a disturbance of the control flow.
|
|
|
|
For this reason the GNU C Library provides optimizations for many of the
|
|
frequently used math functions. When the GNU CC is used and the user
|
|
activates the optimizer several new inline functions and macros get
|
|
defined. These new functions and macros have the same names as the
|
|
library function and so get used instead of the later. In case of
|
|
inline functions the compiler will decide whether it is reasonable to
|
|
use the inline function and this decision is usually correct.
|
|
|
|
For the generated code this means that no calls to the library functions
|
|
are necessary. This increases the speed significantly. But the
|
|
drawback is that the code size increases and this increase is not always
|
|
neglectable.
|
|
|
|
In cases where the inline functions and macros are not wanted the symbol
|
|
@code{__NO_MATH_INLINES} should be defined before any system header is
|
|
included. This will make sure only library functions are used. Of
|
|
course it can be determined for each single file in the project whether
|
|
giving this option is preferred or not.
|
|
|
|
|
|
@node Trig Functions
|
|
@section Trigonometric Functions
|
|
@cindex trigonometric functions
|
|
|
|
These are the familiar @code{sin}, @code{cos}, and @code{tan} functions.
|
|
The arguments to all of these functions are in units of radians; recall
|
|
that pi radians equals 180 degrees.
|
|
|
|
@cindex pi (trigonometric constant)
|
|
The math library does define a symbolic constant for pi in @file{math.h}
|
|
(@pxref{Mathematical Constants}) when BSD compliance is required
|
|
(@pxref{Feature Test Macros}). In case it is not possible to use this
|
|
predefined macro one easily can define it:
|
|
|
|
@smallexample
|
|
#define M_PI 3.14159265358979323846264338327
|
|
@end smallexample
|
|
|
|
@noindent
|
|
You can also compute the value of pi with the expression @code{acos
|
|
(-1.0)}.
|
|
|
|
|
|
@comment math.h
|
|
@comment ISO
|
|
@deftypefun double sin (double @var{x})
|
|
@deftypefunx float sinf (float @var{x})
|
|
@deftypefunx {long double} sinl (long double @var{x})
|
|
These functions return the sine of @var{x}, where @var{x} is given in
|
|
radians. The return value is in the range @code{-1} to @code{1}.
|
|
@end deftypefun
|
|
|
|
@comment math.h
|
|
@comment ISO
|
|
@deftypefun double cos (double @var{x})
|
|
@deftypefunx float cosf (float @var{x})
|
|
@deftypefunx {long double} cosl (long double @var{x})
|
|
These functions return the cosine of @var{x}, where @var{x} is given in
|
|
radians. The return value is in the range @code{-1} to @code{1}.
|
|
@end deftypefun
|
|
|
|
@comment math.h
|
|
@comment ISO
|
|
@deftypefun double tan (double @var{x})
|
|
@deftypefunx float tanf (float @var{x})
|
|
@deftypefunx {long double} tanl (long double @var{x})
|
|
These functions return the tangent of @var{x}, where @var{x} is given in
|
|
radians.
|
|
|
|
The following @code{errno} error conditions are defined for this function:
|
|
|
|
@table @code
|
|
@item ERANGE
|
|
Mathematically, the tangent function has singularities at odd multiples
|
|
of pi/2. If the argument @var{x} is too close to one of these
|
|
singularities, @code{tan} sets @code{errno} to @code{ERANGE} and returns
|
|
either positive or negative @code{HUGE_VAL}.
|
|
@end table
|
|
@end deftypefun
|
|
|
|
In many applications where @code{sin} and @code{cos} are used, the value
|
|
for the same argument of both of these functions is used at the same
|
|
time. Since the algorithm to compute these values is very similar for
|
|
both functions there is an additional function which computes both values
|
|
at the same time.
|
|
|
|
@comment math.h
|
|
@comment GNU
|
|
@deftypefun void sincos (double @var{x}, double *@var{sinx}, double *@var{cosx})
|
|
@deftypefunx void sincosf (float @var{x}, float *@var{sinx}, float *@var{cosx})
|
|
@deftypefunx void sincosl (long double @var{x}, long double *@var{sinx}, long double *@var{cosx})
|
|
These functions return the sine of @var{x} in @code{*@var{sinx}} and the
|
|
cosine of @var{x} in @code{*@var{cos}}, where @var{x} is given in
|
|
radians. Both values, @code{*@var{sinx}} and @code{*@var{cosx}}, are in
|
|
the range of @code{-1} to @code{1}.
|
|
|
|
This function is a GNU extension. It should be used whenever both sine
|
|
and cosine are needed but in portable applications there should be a
|
|
fallback method for systems without this function.
|
|
@end deftypefun
|
|
|
|
@cindex complex trigonometric functions
|
|
|
|
The trigonometric functions are in mathematics not only defined on real
|
|
numbers. They can be extended to complex numbers and the @w{ISO C 9X}
|
|
standard introduces these variants in the standard math library.
|
|
|
|
@comment complex.h
|
|
@comment ISO
|
|
@deftypefun {complex double} csin (complex double @var{z})
|
|
@deftypefunx {complex float} csinf (complex float @var{z})
|
|
@deftypefunx {complex long double} csinl (complex long double @var{z})
|
|
These functions return the complex sine of the complex value in @var{z}.
|
|
The mathematical definition of the complex sine is
|
|
|
|
@ifinfo
|
|
@math{sin (z) = 1/(2*i) * (exp (z*i) - exp (-z*i))}.
|
|
@end ifinfo
|
|
@iftex
|
|
@tex
|
|
$$\sin(z) = {1\over 2i} (e^{zi} - e^{-zi})$$
|
|
@end tex
|
|
@end iftex
|
|
@end deftypefun
|
|
|
|
@comment complex.h
|
|
@comment ISO
|
|
@deftypefun {complex double} ccos (complex double @var{z})
|
|
@deftypefunx {complex float} ccosf (complex float @var{z})
|
|
@deftypefunx {complex long double} ccosl (complex long double @var{z})
|
|
These functions return the complex cosine of the complex value in @var{z}.
|
|
The mathematical definition of the complex cosine is
|
|
|
|
@ifinfo
|
|
@math{cos (z) = 1/2 * (exp (z*i) + exp (-z*i))}
|
|
@end ifinfo
|
|
@iftex
|
|
@tex
|
|
$$\cos(z) = {1\over 2} (e^{zi} + e^{-zi})$$
|
|
@end tex
|
|
@end iftex
|
|
@end deftypefun
|
|
|
|
@comment complex.h
|
|
@comment ISO
|
|
@deftypefun {complex double} ctan (complex double @var{z})
|
|
@deftypefunx {complex float} ctanf (complex float @var{z})
|
|
@deftypefunx {complex long double} ctanl (complex long double @var{z})
|
|
These functions return the complex tangent of the complex value in @var{z}.
|
|
The mathematical definition of the complex tangent is
|
|
|
|
@ifinfo
|
|
@math{tan (z) = 1/i * (exp (z*i) - exp (-z*i)) / (exp (z*i) + exp (-z*i))}
|
|
@end ifinfo
|
|
@iftex
|
|
@tex
|
|
$$\tan(z) = {1\over i} {e^{zi} - e^{-zi}\over e^{zi} + e^{-zi}}$$
|
|
@end tex
|
|
@end iftex
|
|
@end deftypefun
|
|
|
|
|
|
@node Inverse Trig Functions
|
|
@section Inverse Trigonometric Functions
|
|
@cindex inverse trigonometric functions
|
|
|
|
These are the usual arc sine, arc cosine and arc tangent functions,
|
|
which are the inverses of the sine, cosine and tangent functions,
|
|
respectively.
|
|
|
|
@comment math.h
|
|
@comment ISO
|
|
@deftypefun double asin (double @var{x})
|
|
@deftypefunx float asinf (float @var{x})
|
|
@deftypefunx {long double} asinl (long double @var{x})
|
|
These functions compute the arc sine of @var{x}---that is, the value whose
|
|
sine is @var{x}. The value is in units of radians. Mathematically,
|
|
there are infinitely many such values; the one actually returned is the
|
|
one between @code{-pi/2} and @code{pi/2} (inclusive).
|
|
|
|
@code{asin} fails, and sets @code{errno} to @code{EDOM}, if @var{x} is
|
|
out of range. The arc sine function is defined mathematically only
|
|
over the domain @code{-1} to @code{1}.
|
|
@end deftypefun
|
|
|
|
@comment math.h
|
|
@comment ISO
|
|
@deftypefun double acos (double @var{x})
|
|
@deftypefunx float acosf (float @var{x})
|
|
@deftypefunx {long double} acosl (long double @var{x})
|
|
These functions compute the arc cosine of @var{x}---that is, the value
|
|
whose cosine is @var{x}. The value is in units of radians.
|
|
Mathematically, there are infinitely many such values; the one actually
|
|
returned is the one between @code{0} and @code{pi} (inclusive).
|
|
|
|
@code{acos} fails, and sets @code{errno} to @code{EDOM}, if @var{x} is
|
|
out of range. The arc cosine function is defined mathematically only
|
|
over the domain @code{-1} to @code{1}.
|
|
@end deftypefun
|
|
|
|
|
|
@comment math.h
|
|
@comment ISO
|
|
@deftypefun double atan (double @var{x})
|
|
@deftypefunx float atanf (float @var{x})
|
|
@deftypefunx {long double} atanl (long double @var{x})
|
|
These functions compute the arc tangent of @var{x}---that is, the value
|
|
whose tangent is @var{x}. The value is in units of radians.
|
|
Mathematically, there are infinitely many such values; the one actually
|
|
returned is the one between @code{-pi/2} and @code{pi/2}
|
|
(inclusive).
|
|
@end deftypefun
|
|
|
|
@comment math.h
|
|
@comment ISO
|
|
@deftypefun double atan2 (double @var{y}, double @var{x})
|
|
@deftypefunx float atan2f (float @var{y}, float @var{x})
|
|
@deftypefunx {long double} atan2l (long double @var{y}, long double @var{x})
|
|
This is the two argument arc tangent function. It is similar to computing
|
|
the arc tangent of @var{y}/@var{x}, except that the signs of both arguments
|
|
are used to determine the quadrant of the result, and @var{x} is
|
|
permitted to be zero. The return value is given in radians and is in
|
|
the range @code{-pi} to @code{pi}, inclusive.
|
|
|
|
If @var{x} and @var{y} are coordinates of a point in the plane,
|
|
@code{atan2} returns the signed angle between the line from the origin
|
|
to that point and the x-axis. Thus, @code{atan2} is useful for
|
|
converting Cartesian coordinates to polar coordinates. (To compute the
|
|
radial coordinate, use @code{hypot}; see @ref{Exponents and
|
|
Logarithms}.)
|
|
|
|
The function @code{atan2} sets @code{errno} to @code{EDOM} if both
|
|
@var{x} and @var{y} are zero; the return value is not defined in this
|
|
case.
|
|
@end deftypefun
|
|
|
|
@cindex inverse complex trigonometric functions
|
|
|
|
The inverse trigonometric functions also exist is separate versions
|
|
which are usable with complex numbers.
|
|
|
|
@comment complex.h
|
|
@comment ISO
|
|
@deftypefun {complex double} casin (complex double @var{z})
|
|
@deftypefunx {complex float} casinf (complex float @var{z})
|
|
@deftypefunx {complex long double} casinl (complex long double @var{z})
|
|
These functions compute the complex arc sine of @var{z}---that is, the
|
|
value whose sine is @var{z}. The value is in units of radians.
|
|
|
|
Unlike the real version of the arc sine function @code{casin} has no
|
|
limitation on the argument @var{z}.
|
|
@end deftypefun
|
|
|
|
@comment complex.h
|
|
@comment ISO
|
|
@deftypefun {complex double} cacos (complex double @var{z})
|
|
@deftypefunx {complex float} cacosf (complex float @var{z})
|
|
@deftypefunx {complex long double} cacosl (complex long double @var{z})
|
|
These functions compute the complex arc cosine of @var{z}---that is, the
|
|
value whose cosine is @var{z}. The value is in units of radians.
|
|
|
|
Unlike the real version of the arc cosine function @code{cacos} has no
|
|
limitation on the argument @var{z}.
|
|
@end deftypefun
|
|
|
|
|
|
@comment complex.h
|
|
@comment ISO
|
|
@deftypefun {complex double} catan (complex double @var{z})
|
|
@deftypefunx {complex float} catanf (complex float @var{z})
|
|
@deftypefunx {complex long double} catanl (complex long double @var{z})
|
|
These functions compute the complex arc tangent of @var{z}---that is,
|
|
the value whose tangent is @var{z}. The value is in units of radians.
|
|
@end deftypefun
|
|
|
|
|
|
@node Exponents and Logarithms
|
|
@section Exponentiation and Logarithms
|
|
@cindex exponentiation functions
|
|
@cindex power functions
|
|
@cindex logarithm functions
|
|
|
|
@comment math.h
|
|
@comment ISO
|
|
@deftypefun double exp (double @var{x})
|
|
@deftypefunx float expf (float @var{x})
|
|
@deftypefunx {long double} expl (long double @var{x})
|
|
These functions return the value of @code{e} (the base of natural
|
|
logarithms) raised to power @var{x}.
|
|
|
|
The function fails, and sets @code{errno} to @code{ERANGE}, if the
|
|
magnitude of the result is too large to be representable.
|
|
@end deftypefun
|
|
|
|
@comment math.h
|
|
@comment ISO
|
|
@deftypefun double exp10 (double @var{x})
|
|
@deftypefunx float exp10f (float @var{x})
|
|
@deftypefunx {long double} exp10l (long double @var{x})
|
|
These functions return the value of @code{10} raised to the power @var{x}.
|
|
Mathematically, @code{exp10 (x)} is the same as @code{exp (x * log (10))}.
|
|
|
|
The function fails, and sets @code{errno} to @code{ERANGE}, if the
|
|
magnitude of the result is too large to be representable.
|
|
@end deftypefun
|
|
|
|
@comment math.h
|
|
@comment ISO
|
|
@deftypefun double exp2 (double @var{x})
|
|
@deftypefunx float exp2f (float @var{x})
|
|
@deftypefunx {long double} exp2l (long double @var{x})
|
|
These functions return the value of @code{2} raised to the power @var{x}.
|
|
Mathematically, @code{exp2 (x)} is the same as @code{exp (x * log (2))}.
|
|
|
|
The function fails, and sets @code{errno} to @code{ERANGE}, if the
|
|
magnitude of the result is too large to be representable.
|
|
@end deftypefun
|
|
|
|
|
|
@comment math.h
|
|
@comment ISO
|
|
@deftypefun double log (double @var{x})
|
|
@deftypefunx float logf (float @var{x})
|
|
@deftypefunx {long double} logl (long double @var{x})
|
|
These functions return the natural logarithm of @var{x}. @code{exp (log
|
|
(@var{x}))} equals @var{x}, exactly in mathematics and approximately in
|
|
C.
|
|
|
|
The following @code{errno} error conditions are defined for this function:
|
|
|
|
@table @code
|
|
@item EDOM
|
|
The argument @var{x} is negative. The log function is defined
|
|
mathematically to return a real result only on positive arguments.
|
|
|
|
@item ERANGE
|
|
The argument is zero. The log of zero is not defined.
|
|
@end table
|
|
@end deftypefun
|
|
|
|
@comment math.h
|
|
@comment ISO
|
|
@deftypefun double log10 (double @var{x})
|
|
@deftypefunx float log10f (float @var{x})
|
|
@deftypefunx {long double} log10l (long double @var{x})
|
|
These functions return the base-10 logarithm of @var{x}. Except for the
|
|
different base, it is similar to the @code{log} function. In fact,
|
|
@code{log10 (@var{x})} equals @code{log (@var{x}) / log (10)}.
|
|
@end deftypefun
|
|
|
|
@comment math.h
|
|
@comment ISO
|
|
@deftypefun double log2 (double @var{x})
|
|
@deftypefunx float log2f (float @var{x})
|
|
@deftypefunx {long double} log2l (long double @var{x})
|
|
These functions return the base-2 logarithm of @var{x}. Except for the
|
|
different base, it is similar to the @code{log} function. In fact,
|
|
@code{log2 (@var{x})} equals @code{log (@var{x}) / log (2)}.
|
|
@end deftypefun
|
|
|
|
@comment math.h
|
|
@comment ISO
|
|
@deftypefun double logb (double @var{x})
|
|
@deftypefunx float logbf (float @var{x})
|
|
@deftypefunx {long double} logbl (long double @var{x})
|
|
These functions extract the exponent of @var{x} and return it as a
|
|
signed integer value. If @var{x} is zero, a range error may occur.
|
|
|
|
A special case are subnormal numbers (if supported by the floating-point
|
|
format). The exponent returned is not the actual value from @var{x}.
|
|
Instead the number is first normalized as if the range of the exponent
|
|
field is large enough.
|
|
@end deftypefun
|
|
|
|
@comment math.h
|
|
@comment ISO
|
|
@deftypefun int ilogb (double @var{x})
|
|
@deftypefunx int ilogbf (float @var{x})
|
|
@deftypefunx int ilogbl (long double @var{x})
|
|
These functions are equivalent to the corresponding @code{logb}
|
|
functions except that the values are returned as signed integer values.
|
|
Since integer values cannot represent infinity and NaN, there are some
|
|
special symbols defined to help detect these situations.
|
|
|
|
@vindex FP_ILOGB0
|
|
@vindex FP_ILOGBNAN
|
|
@code{ilogb} returns @code{FP_ILOGB0} if @var{x} is @code{0} and it
|
|
returns @code{FP_ILOGBNAN} if @var{x} is @code{NaN}. These values are
|
|
system specific and no fixed value is assigned. More concrete, these
|
|
values might even have the same value. So a piece of code handling the
|
|
result of @code{ilogb} could look like this:
|
|
|
|
@smallexample
|
|
i = ilogb (f);
|
|
if (i == FP_ILOGB0 || i == FP_ILOGBNAN)
|
|
@{
|
|
if (isnan (f))
|
|
@{
|
|
/* @r{Handle NaN.} */
|
|
@}
|
|
else if (f == 0.0)
|
|
@{
|
|
/* @r{Handle 0.0.} */
|
|
@}
|
|
else
|
|
@{
|
|
/* @r{Some other value with large exponent,}
|
|
@r{perhaps +Inf.} */
|
|
@}
|
|
@}
|
|
@end smallexample
|
|
|
|
@end deftypefun
|
|
|
|
@comment math.h
|
|
@comment ISO
|
|
@deftypefun double pow (double @var{base}, double @var{power})
|
|
@deftypefunx float powf (float @var{base}, float @var{power})
|
|
@deftypefunx {long double} powl (long double @var{base}, long double @var{power})
|
|
These are general exponentiation functions, returning @var{base} raised
|
|
to @var{power}.
|
|
|
|
@need 250
|
|
The following @code{errno} error conditions are defined for this function:
|
|
|
|
@table @code
|
|
@item EDOM
|
|
The argument @var{base} is negative and @var{power} is not an integral
|
|
value. Mathematically, the result would be a complex number in this case.
|
|
|
|
@item ERANGE
|
|
An underflow or overflow condition was detected in the result.
|
|
@end table
|
|
@end deftypefun
|
|
|
|
@cindex square root function
|
|
@comment math.h
|
|
@comment ISO
|
|
@deftypefun double sqrt (double @var{x})
|
|
@deftypefunx float sqrtf (float @var{x})
|
|
@deftypefunx {long double} sqrtl (long double @var{x})
|
|
These functions return the nonnegative square root of @var{x}.
|
|
|
|
The @code{sqrt} function fails, and sets @code{errno} to @code{EDOM}, if
|
|
@var{x} is negative. Mathematically, the square root would be a complex
|
|
number.
|
|
@c (@pxref{csqrt})
|
|
@end deftypefun
|
|
|
|
@cindex cube root function
|
|
@comment math.h
|
|
@comment BSD
|
|
@deftypefun double cbrt (double @var{x})
|
|
@deftypefunx float cbrtf (float @var{x})
|
|
@deftypefunx {long double} cbrtl (long double @var{x})
|
|
These functions return the cube root of @var{x}. They cannot
|
|
fail; every representable real value has a representable real cube root.
|
|
@end deftypefun
|
|
|
|
@comment math.h
|
|
@comment ISO
|
|
@deftypefun double hypot (double @var{x}, double @var{y})
|
|
@deftypefunx float hypotf (float @var{x}, float @var{y})
|
|
@deftypefunx {long double} hypotl (long double @var{x}, long double @var{y})
|
|
These functions return @code{sqrt (@var{x}*@var{x} +
|
|
@var{y}*@var{y})}. (This is the length of the hypotenuse of a right
|
|
triangle with sides of length @var{x} and @var{y}, or the distance
|
|
of the point (@var{x}, @var{y}) from the origin.) Using this function
|
|
instead of the direct formula is highly appreciated since the error is
|
|
much smaller. See also the function @code{cabs} in @ref{Absolute Value}.
|
|
@end deftypefun
|
|
|
|
@comment math.h
|
|
@comment ISO
|
|
@deftypefun double expm1 (double @var{x})
|
|
@deftypefunx float expm1f (float @var{x})
|
|
@deftypefunx {long double} expm1l (long double @var{x})
|
|
These functions return a value equivalent to @code{exp (@var{x}) - 1}.
|
|
It is computed in a way that is accurate even if the value of @var{x} is
|
|
near zero---a case where @code{exp (@var{x}) - 1} would be inaccurate due
|
|
to subtraction of two numbers that are nearly equal.
|
|
@end deftypefun
|
|
|
|
@comment math.h
|
|
@comment ISO
|
|
@deftypefun double log1p (double @var{x})
|
|
@deftypefunx float log1pf (float @var{x})
|
|
@deftypefunx {long double} log1pl (long double @var{x})
|
|
This function returns a value equivalent to @w{@code{log (1 + @var{x})}}.
|
|
It is computed in a way that is accurate even if the value of @var{x} is
|
|
near zero.
|
|
@end deftypefun
|
|
|
|
@cindex complex exponentiation functions
|
|
@cindex complex logarithm functions
|
|
|
|
@w{ISO C 9X} defines variants of some of the exponentiation and
|
|
logarithm functions. As for the other functions handling complex
|
|
numbers these functions are perhaps better optimized and provide better
|
|
error checking than a direct use of the formulas of the mathematical
|
|
definition.
|
|
|
|
@comment complex.h
|
|
@comment ISO
|
|
@deftypefun {complex double} cexp (complex double @var{z})
|
|
@deftypefunx {complex float} cexpf (complex float @var{z})
|
|
@deftypefunx {complex long double} cexpl (complex long double @var{z})
|
|
These functions return the value of @code{e} (the base of natural
|
|
logarithms) raised to power of the complex value @var{z}.
|
|
|
|
@noindent
|
|
Mathematically this corresponds to the value
|
|
|
|
@ifinfo
|
|
@math{exp (z) = exp (creal (z)) * (cos (cimag (z)) + I * sin (cimag (z)))}
|
|
@end ifinfo
|
|
@iftex
|
|
@tex
|
|
$$\exp(z) = e^z = e^{{\rm Re} z} (\cos ({\rm Im} z) + i \sin ({\rm Im} z))$$
|
|
@end tex
|
|
@end iftex
|
|
@end deftypefun
|
|
|
|
@comment complex.h
|
|
@comment ISO
|
|
@deftypefun {complex double} clog (complex double @var{z})
|
|
@deftypefunx {complex float} clogf (complex float @var{z})
|
|
@deftypefunx {complex long double} clogl (complex long double @var{z})
|
|
These functions return the natural logarithm of the complex value
|
|
@var{z}. Unlike the real value version @code{log} and its variants,
|
|
@code{clog} has no limit for the range of its argument @var{z}.
|
|
|
|
@noindent
|
|
Mathematically this corresponds to the value
|
|
|
|
@ifinfo
|
|
@math{log (z) = log (cabs (z)) + I * carg (z)}
|
|
@end ifinfo
|
|
@iftex
|
|
@tex
|
|
$$\log(z) = \log(|z|) + i \arg(z)$$
|
|
@end tex
|
|
@end iftex
|
|
@end deftypefun
|
|
|
|
|
|
@comment complex.h
|
|
@comment GNU
|
|
@deftypefun {complex double} clog10 (complex double @var{z})
|
|
@deftypefunx {complex float} clog10f (complex float @var{z})
|
|
@deftypefunx {complex long double} clog10l (complex long double @var{z})
|
|
These functions return the base 10 logarithm of the complex value
|
|
@var{z}. Unlike the real value version @code{log} and its variants,
|
|
@code{clog} has no limit for the range of its argument @var{z}.
|
|
|
|
@noindent
|
|
Mathematically this corresponds to the value
|
|
|
|
@ifinfo
|
|
@math{log (z) = log10 (cabs (z)) + I * carg (z)}
|
|
@end ifinfo
|
|
@iftex
|
|
@tex
|
|
$$\log_{10}(z) = \log_{10}(|z|) + i \arg(z)$$
|
|
@end tex
|
|
@end iftex
|
|
|
|
This function is a GNU extension.
|
|
@end deftypefun
|
|
|
|
@comment complex.h
|
|
@comment ISO
|
|
@deftypefun {complex double} csqrt (complex double @var{z})
|
|
@deftypefunx {complex float} csqrtf (complex float @var{z})
|
|
@deftypefunx {complex long double} csqrtl (complex long double @var{z})
|
|
These functions return the complex root of the argument @var{z}. Unlike
|
|
the @code{sqrt} function these functions do not have any restriction on
|
|
the value of the argument.
|
|
@end deftypefun
|
|
|
|
@comment complex.h
|
|
@comment ISO
|
|
@deftypefun {complex double} cpow (complex double @var{base}, complex double @var{power})
|
|
@deftypefunx {complex float} cpowf (complex float @var{base}, complex float @var{power})
|
|
@deftypefunx {complex long double} cpowl (complex long double @var{base}, complex long double @var{power})
|
|
These functions return the complex value @var{base} raised to the power of
|
|
@var{power}. This is computed as
|
|
|
|
@ifinfo
|
|
@math{cpow (x, y) = cexp (y * clog (x))}
|
|
@end ifinfo
|
|
@iftex
|
|
@tex
|
|
$${\rm cpow}(x, y) = e^{y \log(x)}$$
|
|
@end tex
|
|
@end iftex
|
|
@end deftypefun
|
|
|
|
|
|
@node Hyperbolic Functions
|
|
@section Hyperbolic Functions
|
|
@cindex hyperbolic functions
|
|
|
|
The functions in this section are related to the exponential functions;
|
|
see @ref{Exponents and Logarithms}.
|
|
|
|
@comment math.h
|
|
@comment ISO
|
|
@deftypefun double sinh (double @var{x})
|
|
@deftypefunx float sinhf (float @var{x})
|
|
@deftypefunx {long double} sinhl (long double @var{x})
|
|
These functions return the hyperbolic sine of @var{x}, defined
|
|
mathematically as @w{@code{(exp (@var{x}) - exp (-@var{x})) / 2}}. The
|
|
function fails, and sets @code{errno} to @code{ERANGE}, if the value of
|
|
@var{x} is too large; that is, if overflow occurs.
|
|
@end deftypefun
|
|
|
|
@comment math.h
|
|
@comment ISO
|
|
@deftypefun double cosh (double @var{x})
|
|
@deftypefunx float coshf (float @var{x})
|
|
@deftypefunx {long double} coshl (long double @var{x})
|
|
These function return the hyperbolic cosine of @var{x},
|
|
defined mathematically as @w{@code{(exp (@var{x}) + exp (-@var{x})) / 2}}.
|
|
The function fails, and sets @code{errno} to @code{ERANGE}, if the value
|
|
of @var{x} is too large; that is, if overflow occurs.
|
|
@end deftypefun
|
|
|
|
@comment math.h
|
|
@comment ISO
|
|
@deftypefun double tanh (double @var{x})
|
|
@deftypefunx float tanhf (float @var{x})
|
|
@deftypefunx {long double} tanhl (long double @var{x})
|
|
These functions return the hyperbolic tangent of @var{x}, whose
|
|
mathematical definition is @w{@code{sinh (@var{x}) / cosh (@var{x})}}.
|
|
@end deftypefun
|
|
|
|
@cindex hyperbolic functions
|
|
|
|
There are counterparts for these hyperbolic functions which work with
|
|
complex valued arguments. They should always be used instead of the
|
|
obvious mathematical formula since the implementations in the math
|
|
library are optimized for accuracy and speed.
|
|
|
|
@comment complex.h
|
|
@comment ISO
|
|
@deftypefun {complex double} csinh (complex double @var{z})
|
|
@deftypefunx {complex float} csinhf (complex float @var{z})
|
|
@deftypefunx {complex long double} csinhl (complex long double @var{z})
|
|
These functions return the complex hyperbolic sine of @var{z}, defined
|
|
mathematically as @w{@code{(exp (@var{z}) - exp (-@var{z})) / 2}}. The
|
|
function fails, and sets @code{errno} to @code{ERANGE}, if the value of
|
|
result is too large.
|
|
@end deftypefun
|
|
|
|
@comment complex.h
|
|
@comment ISO
|
|
@deftypefun {complex double} ccosh (complex double @var{z})
|
|
@deftypefunx {complex float} ccoshf (complex float @var{z})
|
|
@deftypefunx {complex long double} ccoshl (complex long double @var{z})
|
|
These functions return the complex hyperbolic cosine of @var{z}, defined
|
|
mathematically as @w{@code{(exp (@var{z}) + exp (-@var{z})) / 2}}. The
|
|
function fails, and sets @code{errno} to @code{ERANGE}, if the value of
|
|
result is too large.
|
|
@end deftypefun
|
|
|
|
@comment complex.h
|
|
@comment ISO
|
|
@deftypefun {complex double} ctanh (complex double @var{z})
|
|
@deftypefunx {complex float} ctanhf (complex float @var{z})
|
|
@deftypefunx {complex long double} ctanhl (complex long double @var{z})
|
|
These functions return the complex hyperbolic tangent of @var{z}, whose
|
|
mathematical definition is @w{@code{csinh (@var{z}) / ccosh (@var{z})}}.
|
|
@end deftypefun
|
|
|
|
|
|
@cindex inverse hyperbolic functions
|
|
|
|
@comment math.h
|
|
@comment ISO
|
|
@deftypefun double asinh (double @var{x})
|
|
@deftypefunx float asinhf (float @var{x})
|
|
@deftypefunx {long double} asinhl (long double @var{x})
|
|
These functions return the inverse hyperbolic sine of @var{x}---the
|
|
value whose hyperbolic sine is @var{x}.
|
|
@end deftypefun
|
|
|
|
@comment math.h
|
|
@comment ISO
|
|
@deftypefun double acosh (double @var{x})
|
|
@deftypefunx float acoshf (float @var{x})
|
|
@deftypefunx {long double} acoshl (long double @var{x})
|
|
These functions return the inverse hyperbolic cosine of @var{x}---the
|
|
value whose hyperbolic cosine is @var{x}. If @var{x} is less than
|
|
@code{1}, @code{acosh} returns @code{HUGE_VAL}.
|
|
@end deftypefun
|
|
|
|
@comment math.h
|
|
@comment ISO
|
|
@deftypefun double atanh (double @var{x})
|
|
@deftypefunx float atanhf (float @var{x})
|
|
@deftypefunx {long double} atanhl (long double @var{x})
|
|
These functions return the inverse hyperbolic tangent of @var{x}---the
|
|
value whose hyperbolic tangent is @var{x}. If the absolute value of
|
|
@var{x} is greater than or equal to @code{1}, @code{atanh} returns
|
|
@code{HUGE_VAL}.
|
|
@end deftypefun
|
|
|
|
@cindex inverse complex hyperbolic functions
|
|
|
|
@comment complex.h
|
|
@comment ISO
|
|
@deftypefun {complex double} casinh (complex double @var{z})
|
|
@deftypefunx {complex float} casinhf (complex float @var{z})
|
|
@deftypefunx {complex long double} casinhl (complex long double @var{z})
|
|
These functions return the inverse complex hyperbolic sine of
|
|
@var{z}---the value whose complex hyperbolic sine is @var{z}.
|
|
@end deftypefun
|
|
|
|
@comment complex.h
|
|
@comment ISO
|
|
@deftypefun {complex double} cacosh (complex double @var{z})
|
|
@deftypefunx {complex float} cacoshf (complex float @var{z})
|
|
@deftypefunx {complex long double} cacoshl (complex long double @var{z})
|
|
These functions return the inverse complex hyperbolic cosine of
|
|
@var{z}---the value whose complex hyperbolic cosine is @var{z}. Unlike
|
|
the real valued function @code{acosh} there is not limit for the range
|
|
of the argument.
|
|
@end deftypefun
|
|
|
|
@comment complex.h
|
|
@comment ISO
|
|
@deftypefun {complex double} catanh (complex double @var{z})
|
|
@deftypefunx {complex float} catanhf (complex float @var{z})
|
|
@deftypefunx {complex long double} catanhl (complex long double @var{z})
|
|
These functions return the inverse complex hyperbolic tangent of
|
|
@var{z}---the value whose complex hyperbolic tangent is @var{z}. Unlike
|
|
the real valued function @code{atanh} there is not limit for the range
|
|
of the argument.
|
|
@end deftypefun
|
|
|
|
|
|
@node Pseudo-Random Numbers
|
|
@section Pseudo-Random Numbers
|
|
@cindex random numbers
|
|
@cindex pseudo-random numbers
|
|
@cindex seed (for random numbers)
|
|
|
|
This section describes the GNU facilities for generating a series of
|
|
pseudo-random numbers. The numbers generated are not truly random;
|
|
typically, they form a sequence that repeats periodically, with a
|
|
period so large that you can ignore it for ordinary purposes. The
|
|
random number generator works by remembering at all times a @dfn{seed}
|
|
value which it uses to compute the next random number and also to
|
|
compute a new seed.
|
|
|
|
Although the generated numbers look unpredictable within one run of a
|
|
program, the sequence of numbers is @emph{exactly the same} from one run
|
|
to the next. This is because the initial seed is always the same. This
|
|
is convenient when you are debugging a program, but it is unhelpful if
|
|
you want the program to behave unpredictably. If you want truly random
|
|
numbers, not just pseudo-random, specify a seed based on the current
|
|
time.
|
|
|
|
You can get repeatable sequences of numbers on a particular machine type
|
|
by specifying the same initial seed value for the random number
|
|
generator. There is no standard meaning for a particular seed value;
|
|
the same seed, used in different C libraries or on different CPU types,
|
|
will give you different random numbers.
|
|
|
|
The GNU library supports the standard @w{ISO C} random number functions
|
|
plus two other sets derived from BSD and SVID. We recommend you use the
|
|
standard ones, @code{rand} and @code{srand} if only a small number of
|
|
random bits are required. The SVID functions provide an interface which
|
|
allows better random number generator algorithms and they return up to
|
|
48 random bits in one calls and they also return random floating-point
|
|
numbers if wanted. The SVID function might not be available on some BSD
|
|
derived systems but since they are required in the XPG they are
|
|
available on all Unix-conformant systems.
|
|
|
|
@menu
|
|
* ISO Random:: @code{rand} and friends.
|
|
* BSD Random:: @code{random} and friends.
|
|
* SVID Random:: @code{drand48} and friends.
|
|
@end menu
|
|
|
|
@node ISO Random
|
|
@subsection ISO C Random Number Functions
|
|
|
|
This section describes the random number functions that are part of
|
|
the @w{ISO C} standard.
|
|
|
|
To use these facilities, you should include the header file
|
|
@file{stdlib.h} in your program.
|
|
@pindex stdlib.h
|
|
|
|
@comment stdlib.h
|
|
@comment ISO
|
|
@deftypevr Macro int RAND_MAX
|
|
The value of this macro is an integer constant expression that
|
|
represents the maximum possible value returned by the @code{rand}
|
|
function. In the GNU library, it is @code{037777777}, which is the
|
|
largest signed integer representable in 32 bits. In other libraries, it
|
|
may be as low as @code{32767}.
|
|
@end deftypevr
|
|
|
|
@comment stdlib.h
|
|
@comment ISO
|
|
@deftypefun int rand (void)
|
|
The @code{rand} function returns the next pseudo-random number in the
|
|
series. The value is in the range from @code{0} to @code{RAND_MAX}.
|
|
@end deftypefun
|
|
|
|
@comment stdlib.h
|
|
@comment ISO
|
|
@deftypefun void srand (unsigned int @var{seed})
|
|
This function establishes @var{seed} as the seed for a new series of
|
|
pseudo-random numbers. If you call @code{rand} before a seed has been
|
|
established with @code{srand}, it uses the value @code{1} as a default
|
|
seed.
|
|
|
|
To produce truly random numbers (not just pseudo-random), do @code{srand
|
|
(time (0))}.
|
|
@end deftypefun
|
|
|
|
A completely broken interface was designed by the POSIX.1 committee to
|
|
support reproducible random numbers in multi-threaded programs.
|
|
|
|
@comment stdlib.h
|
|
@comment POSIX.1
|
|
@deftypefun int rand_r (unsigned int *@var{seed})
|
|
This function returns a random number in the range 0 to @code{RAND_MAX}
|
|
just as @code{rand} does. But this function does not keep an internal
|
|
state for the RNG. Instead the @code{unsigned int} variable pointed to
|
|
by the argument @var{seed} is the only state. Before the value is
|
|
returned the state will be updated so that the next call will return a
|
|
new number.
|
|
|
|
I.e., the state of the RNG can only have as much bits as the type
|
|
@code{unsigned int} has. This is far too few to provide a good RNG.
|
|
This interface is broken by design.
|
|
|
|
If the program requires reproducible random numbers in multi-threaded
|
|
programs the reentrant SVID functions are probably a better choice. But
|
|
these functions are GNU extensions and therefore @code{rand_r}, as being
|
|
standardized in POSIX.1, should always be kept as a default method.
|
|
@end deftypefun
|
|
|
|
|
|
@node BSD Random
|
|
@subsection BSD Random Number Functions
|
|
|
|
This section describes a set of random number generation functions that
|
|
are derived from BSD. There is no advantage to using these functions
|
|
with the GNU C library; we support them for BSD compatibility only.
|
|
|
|
The prototypes for these functions are in @file{stdlib.h}.
|
|
@pindex stdlib.h
|
|
|
|
@comment stdlib.h
|
|
@comment BSD
|
|
@deftypefun {int32_t} random (void)
|
|
This function returns the next pseudo-random number in the sequence.
|
|
The range of values returned is from @code{0} to @code{RAND_MAX}.
|
|
|
|
@strong{Please note:} Historically this function returned a @code{long
|
|
int} value. But with the appearance of 64bit machines this could lead
|
|
to severe compatibility problems and therefore the type now explicitly
|
|
limits the return value to 32bit.
|
|
@end deftypefun
|
|
|
|
@comment stdlib.h
|
|
@comment BSD
|
|
@deftypefun void srandom (unsigned int @var{seed})
|
|
The @code{srandom} function sets the seed for the current random number
|
|
state based on the integer @var{seed}. If you supply a @var{seed} value
|
|
of @code{1}, this will cause @code{random} to reproduce the default set
|
|
of random numbers.
|
|
|
|
To produce truly random numbers (not just pseudo-random), do
|
|
@code{srandom (time (0))}.
|
|
@end deftypefun
|
|
|
|
@comment stdlib.h
|
|
@comment BSD
|
|
@deftypefun {void *} initstate (unsigned int @var{seed}, void *@var{state}, size_t @var{size})
|
|
The @code{initstate} function is used to initialize the random number
|
|
generator state. The argument @var{state} is an array of @var{size}
|
|
bytes, used to hold the state information. The size must be at least 8
|
|
bytes, and optimal sizes are 8, 16, 32, 64, 128, and 256. The bigger
|
|
the @var{state} array, the better.
|
|
|
|
The return value is the previous value of the state information array.
|
|
You can use this value later as an argument to @code{setstate} to
|
|
restore that state.
|
|
@end deftypefun
|
|
|
|
@comment stdlib.h
|
|
@comment BSD
|
|
@deftypefun {void *} setstate (void *@var{state})
|
|
The @code{setstate} function restores the random number state
|
|
information @var{state}. The argument must have been the result of
|
|
a previous call to @var{initstate} or @var{setstate}.
|
|
|
|
The return value is the previous value of the state information array.
|
|
You can use this value later as an argument to @code{setstate} to
|
|
restore that state.
|
|
@end deftypefun
|
|
|
|
|
|
@node SVID Random
|
|
@subsection SVID Random Number Function
|
|
|
|
The C library on SVID systems contains yet another kind of random number
|
|
generator functions. They use a state of 48 bits of data. The user can
|
|
choose among a collection of functions which all return the random bits
|
|
in different forms.
|
|
|
|
Generally there are two kinds of functions: those which use a state of
|
|
the random number generator which is shared among several functions and
|
|
by all threads of the process. The second group of functions require
|
|
the user to handle the state.
|
|
|
|
All functions have in common that they use the same congruential
|
|
formula with the same constants. The formula is
|
|
|
|
@smallexample
|
|
Y = (a * X + c) mod m
|
|
@end smallexample
|
|
|
|
@noindent
|
|
where @var{X} is the state of the generator at the beginning and
|
|
@var{Y} the state at the end. @code{a} and @code{c} are constants
|
|
determining the way the generator work. By default they are
|
|
|
|
@smallexample
|
|
a = 0x5DEECE66D = 25214903917
|
|
c = 0xb = 11
|
|
@end smallexample
|
|
|
|
@noindent
|
|
but they can also be changed by the user. @code{m} is of course 2^48
|
|
since the state consists of a 48 bit array.
|
|
|
|
|
|
@comment stdlib.h
|
|
@comment SVID
|
|
@deftypefun double drand48 (void)
|
|
This function returns a @code{double} value in the range of @code{0.0}
|
|
to @code{1.0} (exclusive). The random bits are determined by the global
|
|
state of the random number generator in the C library.
|
|
|
|
Since the @code{double} type according to @w{IEEE 754} has a 52 bit
|
|
mantissa this means 4 bits are not initialized by the random number
|
|
generator. These are (of course) chosen to be the least significant
|
|
bits and they are initialized to @code{0}.
|
|
@end deftypefun
|
|
|
|
@comment stdlib.h
|
|
@comment SVID
|
|
@deftypefun double erand48 (unsigned short int @var{xsubi}[3])
|
|
This function returns a @code{double} value in the range of @code{0.0}
|
|
to @code{1.0} (exclusive), similar to @code{drand48}. The argument is
|
|
an array describing the state of the random number generator.
|
|
|
|
This function can be called subsequently since it updates the array to
|
|
guarantee random numbers. The array should have been initialized before
|
|
using to get reproducible results.
|
|
@end deftypefun
|
|
|
|
@comment stdlib.h
|
|
@comment SVID
|
|
@deftypefun {long int} lrand48 (void)
|
|
The @code{lrand48} functions return an integer value in the range of
|
|
@code{0} to @code{2^31} (exclusive). Even if the size of the @code{long
|
|
int} type can take more than 32 bits no higher numbers are returned.
|
|
The random bits are determined by the global state of the random number
|
|
generator in the C library.
|
|
@end deftypefun
|
|
|
|
@comment stdlib.h
|
|
@comment SVID
|
|
@deftypefun {long int} nrand48 (unsigned short int @var{xsubi}[3])
|
|
This function is similar to the @code{lrand48} function in that it
|
|
returns a number in the range of @code{0} to @code{2^31} (exclusive) but
|
|
the state of the random number generator used to produce the random bits
|
|
is determined by the array provided as the parameter to the function.
|
|
|
|
The numbers in the array are afterwards updated so that subsequent calls
|
|
to this function yield to different results (as it is expected by a
|
|
random number generator). The array should have been initialized before
|
|
the first call to get reproducible results.
|
|
@end deftypefun
|
|
|
|
@comment stdlib.h
|
|
@comment SVID
|
|
@deftypefun {long int} mrand48 (void)
|
|
The @code{mrand48} function is similar to @code{lrand48}. The only
|
|
difference is that the numbers returned are in the range @code{-2^31} to
|
|
@code{2^31} (exclusive).
|
|
@end deftypefun
|
|
|
|
@comment stdlib.h
|
|
@comment SVID
|
|
@deftypefun {long int} jrand48 (unsigned short int @var{xsubi}[3])
|
|
The @code{jrand48} function is similar to @code{nrand48}. The only
|
|
difference is that the numbers returned are in the range @code{-2^31} to
|
|
@code{2^31} (exclusive). For the @code{xsubi} parameter the same
|
|
requirements are necessary.
|
|
@end deftypefun
|
|
|
|
The internal state of the random number generator can be initialized in
|
|
several ways. The functions differ in the completeness of the
|
|
information provided.
|
|
|
|
@comment stdlib.h
|
|
@comment SVID
|
|
@deftypefun void srand48 (long int @var{seedval}))
|
|
The @code{srand48} function sets the most significant 32 bits of the
|
|
state internal state of the random number generator to the least
|
|
significant 32 bits of the @var{seedval} parameter. The lower 16 bits
|
|
are initialized to the value @code{0x330E}. Even if the @code{long
|
|
int} type contains more the 32 bits only the lower 32 bits are used.
|
|
|
|
Due to this limitation the initialization of the state using this
|
|
function of not very useful. But it makes it easy to use a construct
|
|
like @code{srand48 (time (0))}.
|
|
|
|
A side-effect of this function is that the values @code{a} and @code{c}
|
|
from the internal state, which are used in the congruential formula,
|
|
are reset to the default values given above. This is of importance once
|
|
the user called the @code{lcong48} function (see below).
|
|
@end deftypefun
|
|
|
|
@comment stdlib.h
|
|
@comment SVID
|
|
@deftypefun {unsigned short int *} seed48 (unsigned short int @var{seed16v}[3])
|
|
The @code{seed48} function initializes all 48 bits of the state of the
|
|
internal random number generator from the content of the parameter
|
|
@var{seed16v}. Here the lower 16 bits of the first element of
|
|
@var{see16v} initialize the least significant 16 bits of the internal
|
|
state, the lower 16 bits of @code{@var{seed16v}[1]} initialize the mid-order
|
|
16 bits of the state and the 16 lower bits of @code{@var{seed16v}[2]}
|
|
initialize the most significant 16 bits of the state.
|
|
|
|
Unlike @code{srand48} this function lets the user initialize all 48 bits
|
|
of the state.
|
|
|
|
The value returned by @code{seed48} is a pointer to an array containing
|
|
the values of the internal state before the change. This might be
|
|
useful to restart the random number generator at a certain state.
|
|
Otherwise, the value can simply be ignored.
|
|
|
|
As for @code{srand48}, the values @code{a} and @code{c} from the
|
|
congruential formula are reset to the default values.
|
|
@end deftypefun
|
|
|
|
There is one more function to initialize the random number generator
|
|
which allows to specify even more information by allowing to change the
|
|
parameters in the congruential formula.
|
|
|
|
@comment stdlib.h
|
|
@comment SVID
|
|
@deftypefun void lcong48 (unsigned short int @var{param}[7])
|
|
The @code{lcong48} function allows the user to change the complete state
|
|
of the random number generator. Unlike @code{srand48} and
|
|
@code{seed48}, this function also changes the constants in the
|
|
congruential formula.
|
|
|
|
From the seven elements in the array @var{param} the least significant
|
|
16 bits of the entries @code{@var{param}[0]} to @code{@var{param}[2]}
|
|
determine the the initial state, the least 16 bits of
|
|
@code{@var{param}[3]} to @code{@var{param}[5]} determine the 48 bit
|
|
constant @code{a} and @code{@var{param}[6]} determines the 16 bit value
|
|
@code{c}.
|
|
@end deftypefun
|
|
|
|
All the above functions have in common that they use the global
|
|
parameters for the congruential formula. In multi-threaded programs it
|
|
might sometimes be useful to have different parameters in different
|
|
threads. For this reason all the above functions have a counterpart
|
|
which works on a description of the random number generator in the
|
|
user-supplied buffer instead of the global state.
|
|
|
|
Please note that it is no problem if several threads use the global
|
|
state if all threads use the functions which take a pointer to an array
|
|
containing the state. The random numbers are computed following the
|
|
same loop but if the state in the array is different all threads will
|
|
get an individual random number generator.
|
|
|
|
The user supplied buffer must be of type @code{struct drand48_data}.
|
|
This type should be regarded as opaque and no member should be used
|
|
directly.
|
|
|
|
@comment stdlib.h
|
|
@comment GNU
|
|
@deftypefun int drand48_r (struct drand48_data *@var{buffer}, double *@var{result})
|
|
This function is equivalent to the @code{drand48} function with the
|
|
difference it does not modify the global random number generator
|
|
parameters but instead the parameters is the buffer supplied by the
|
|
buffer through the pointer @var{buffer}. The random number is return in
|
|
the variable pointed to by @var{result}.
|
|
|
|
The return value of the function indicate whether the call succeeded.
|
|
If the value is less than @code{0} an error occurred and @var{errno} is
|
|
set to indicate the problem.
|
|
|
|
This function is a GNU extension and should not be used in portable
|
|
programs.
|
|
@end deftypefun
|
|
|
|
@comment stdlib.h
|
|
@comment GNU
|
|
@deftypefun int erand48_r (unsigned short int @var{xsubi}[3], struct drand48_data *@var{buffer}, double *@var{result})
|
|
The @code{erand48_r} function works like the @code{erand48} and it takes
|
|
an argument @var{buffer} which describes the random number generator.
|
|
The state of the random number generator is taken from the @code{xsubi}
|
|
array, the parameters for the congruential formula from the global
|
|
random number generator data. The random number is return in the
|
|
variable pointed to by @var{result}.
|
|
|
|
The return value is non-negative is the call succeeded.
|
|
|
|
This function is a GNU extension and should not be used in portable
|
|
programs.
|
|
@end deftypefun
|
|
|
|
@comment stdlib.h
|
|
@comment GNU
|
|
@deftypefun int lrand48_r (struct drand48_data *@var{buffer}, double *@var{result})
|
|
This function is similar to @code{lrand48} and it takes a pointer to a
|
|
buffer describing the state of the random number generator as a
|
|
parameter just like @code{drand48}.
|
|
|
|
If the return value of the function is non-negative the variable pointed
|
|
to by @var{result} contains the result. Otherwise an error occurred.
|
|
|
|
This function is a GNU extension and should not be used in portable
|
|
programs.
|
|
@end deftypefun
|
|
|
|
@comment stdlib.h
|
|
@comment GNU
|
|
@deftypefun int nrand48_r (unsigned short int @var{xsubi}[3], struct drand48_data *@var{buffer}, long int *@var{result})
|
|
The @code{nrand48_r} function works like @code{nrand48} in that it
|
|
produces a random number in range @code{0} to @code{2^31}. But instead
|
|
of using the global parameters for the congruential formula it uses the
|
|
information from the buffer pointed to by @var{buffer}. The state is
|
|
described by the values in @var{xsubi}.
|
|
|
|
If the return value is non-negative the variable pointed to by
|
|
@var{result} contains the result.
|
|
|
|
This function is a GNU extension and should not be used in portable
|
|
programs.
|
|
@end deftypefun
|
|
|
|
@comment stdlib.h
|
|
@comment GNU
|
|
@deftypefun int mrand48_r (struct drand48_data *@var{buffer}, double *@var{result})
|
|
This function is similar to @code{mrand48} but as the other reentrant
|
|
function it uses the random number generator described by the value in
|
|
the buffer pointed to by @var{buffer}.
|
|
|
|
If the return value is non-negative the variable pointed to by
|
|
@var{result} contains the result.
|
|
|
|
This function is a GNU extension and should not be used in portable
|
|
programs.
|
|
@end deftypefun
|
|
|
|
@comment stdlib.h
|
|
@comment GNU
|
|
@deftypefun int jrand48_r (unsigned short int @var{xsubi}[3], struct drand48_data *@var{buffer}, long int *@var{result})
|
|
The @code{jrand48_r} function is similar to @code{jrand48}. But as the
|
|
other reentrant functions of this function family it uses the
|
|
congruential formula parameters from the buffer pointed to by
|
|
@var{buffer}.
|
|
|
|
If the return value is non-negative the variable pointed to by
|
|
@var{result} contains the result.
|
|
|
|
This function is a GNU extension and should not be used in portable
|
|
programs.
|
|
@end deftypefun
|
|
|
|
Before any of the above functions should be used the buffer of type
|
|
@code{struct drand48_data} should initialized. The easiest way is to
|
|
fill the whole buffer with null bytes, e.g., using
|
|
|
|
@smallexample
|
|
memset (buffer, '\0', sizeof (struct drand48_data));
|
|
@end smallexample
|
|
|
|
@noindent
|
|
Using any of the reentrant functions of this family now will
|
|
automatically initialize the random number generator to the default
|
|
values for the state and the parameters of the congruential formula.
|
|
|
|
The other possibility is too use any of the functions which explicitely
|
|
initialize the buffer. Though it might be obvious how to initialize the
|
|
buffer from the data given as parameter from the function it is highly
|
|
recommended to use these functions since the result might not always be
|
|
what you expect.
|
|
|
|
@comment stdlib.h
|
|
@comment GNU
|
|
@deftypefun int srand48_r (long int @var{seedval}, struct drand48_data *@var{buffer})
|
|
The description of the random number generator represented by the
|
|
information in @var{buffer} is initialized similar to what the function
|
|
@code{srand48} does. The state is initialized from the parameter
|
|
@var{seedval} and the parameters for the congruential formula are
|
|
initialized to the default values.
|
|
|
|
If the return value is non-negative the function call succeeded.
|
|
|
|
This function is a GNU extension and should not be used in portable
|
|
programs.
|
|
@end deftypefun
|
|
|
|
@comment stdlib.h
|
|
@comment GNU
|
|
@deftypefun int seed48_r (unsigned short int @var{seed16v}[3], struct drand48_data *@var{buffer})
|
|
This function is similar to @code{srand48_r} but like @code{seed48} it
|
|
initializes all 48 bits of the state from the parameter @var{seed16v}.
|
|
|
|
If the return value is non-negative the function call succeeded. It
|
|
does not return a pointer to the previous state of the random number
|
|
generator like the @code{seed48} function does. if the user wants to
|
|
preserve the state for a later rerun s/he can copy the whole buffer
|
|
pointed to by @var{buffer}.
|
|
|
|
This function is a GNU extension and should not be used in portable
|
|
programs.
|
|
@end deftypefun
|
|
|
|
@comment stdlib.h
|
|
@comment GNU
|
|
@deftypefun int lcong48_r (unsigned short int @var{param}[7], struct drand48_data *@var{buffer})
|
|
This function initializes all aspects of the random number generator
|
|
described in @var{buffer} by the data in @var{param}. Here it is
|
|
especially true the function does more than just copying the contents of
|
|
@var{param} of @var{buffer}. Some more actions are required and
|
|
therefore it is important to use this function and not initialized the
|
|
random number generator directly.
|
|
|
|
If the return value is non-negative the function call succeeded.
|
|
|
|
This function is a GNU extension and should not be used in portable
|
|
programs.
|
|
@end deftypefun
|