xref: /freebsd/lib/msun/man/csqrt.3 (revision 0b3105a37d7adcadcb720112fed4dc4e8040be99)
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25.\" $FreeBSD$
26.\"
27.Dd March 30, 2008
28.Dt CSQRT 3
29.Os
30.Sh NAME
31.Nm csqrt ,
32.Nm csqrtf ,
33.Nm csqrtl
34.Nd complex square root functions
35.Sh LIBRARY
36.Lb libm
37.Sh SYNOPSIS
38.In complex.h
39.Ft double complex
40.Fn csqrt "double complex z"
41.Ft float complex
42.Fn csqrtf "float complex z"
43.Ft long double complex
44.Fn csqrtl "long double complex z"
45.Sh DESCRIPTION
46The
47.Fn csqrt ,
48.Fn csqrtf ,
49and
50.Fn csqrtl
51functions compute the square root of
52.Fa z
53in the complex plane, with a branch cut along the negative real axis.
54In other words,
55.Fn csqrt ,
56.Fn csqrtf ,
57and
58.Fn csqrtl
59always return the square root whose real part is non-negative.
60.Sh RETURN VALUES
61These functions return the requested square root.
62The square root of 0 is
63.Li +0 \*(Pm 0 ,
64where the imaginary parts of the input and respective result have
65the same sign.
66For infinities and \*(Nas, the following rules apply, with the
67earlier rules having precedence:
68.Bl -column -offset indent "-\*(If + \*(Na*I" "\*(If \*(Pm \*(If*I  " "(for all k)"
69.Em "Input" Ta Em "Result" Ta \&
70k + \*(If*I	\*(If + \*(If*I	(for all k)
71-\*(If + \*(Na*I	\*(Na \*(Pm \*(If*I	\&
72\*(If + \*(Na*I	\*(If + \*(Na*I	\&
73k + \*(Na*I	\*(Na + \*(Na*I	\&
74\*(Na + k*I	\*(Na + \*(Na*I	\&
75-\*(If + k*I	+0 + \*(If*I	\&
76\*(If + k*I	\*(If + 0*I	\&
77.El
78.Pp
79For numbers with negative imaginary parts, the above special cases
80apply given the identity:
81.Dl csqrt(conj(z) = conj(sqrt(z))
82Note that the sign of \*(Na is indeterminate.
83Also, if the real or imaginary part of the input is finite and
84an \*(Na is generated, an invalid exception will be thrown.
85.Sh SEE ALSO
86.Xr cabs 3 ,
87.Xr fenv 3 ,
88.Xr math 3
89.Sh STANDARDS
90The
91.Fn csqrt ,
92.Fn csqrtf ,
93and
94.Fn csqrtl
95functions conform to
96.St -isoC-99 .
97.Sh BUGS
98For
99.Fn csqrt
100and
101.Fn csqrtl ,
102inexact results are not always correctly rounded.
103