Difference between revisions of "cpp/numeric/math/hypot"
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| − | @1-3@ Computes the square root of the sum of the squares of {{c|x}} and {{c|y}}, without undue overflow or underflow at intermediate stages of the computation.{{rev inl|since=c++23| The library provides overloads of {{tt|std::hypot}} for all cv-unqualified floating-point types as the type of the parameters {{c|x}} and {{c|y}}.}} | + | @1-3@ Computes the square root of the sum of the squares of {{c|x}} and {{c|y}}, without undue overflow or underflow at intermediate stages of the computation.{{rev inl|since=c++23|The library provides overloads of {{tt|std::hypot}} for all cv-unqualified floating-point types as the type of the parameters {{c|x}} and {{c|y}}.}} |
| − | @4@ Computes the square root of the sum of the squares of {{c|x}}, {{c|y}}, and {{c|z}}, without undue overflow or underflow at intermediate stages of the computation.{{rev inl|since=c++23| The library provides overloads of {{tt|std::hypot}} for all cv-unqualified floating-point types as the type of the parameters {{c|x}}, {{c|y}} and {{c|z}}.}} | + | @4@ Computes the square root of the sum of the squares of {{c|x}}, {{c|y}}, and {{c|z}}, without undue overflow or underflow at intermediate stages of the computation.{{rev inl|since=c++23|The library provides overloads of {{tt|std::hypot}} for all cv-unqualified floating-point types as the type of the parameters {{c|x}}, {{c|y}} and {{c|z}}.}} |
@A,B@ Additional overloads are provided for all other combinations of arithmetic types. | @A,B@ Additional overloads are provided for all other combinations of arithmetic types. | ||
| − | The value computed by the two-argument version of this function is the length of the hypotenuse of a right-angled triangle with sides of length {{c|x}} and {{c|y}}, or the distance of the point {{tt|(x,y)}} from the origin {{tt|(0,0)}}, or the magnitude of a complex number {{tt|x+''i''y}} | + | The value computed by the two-argument version of this function is the length of the hypotenuse of a right-angled triangle with sides of length {{c|x}} and {{c|y}}, or the distance of the point {{tt|(x,y)}} from the origin {{tt|(0,0)}}, or the magnitude of a complex number {{tt|x+''i''y}}. |
The value computed by the three-argument version of this function is the distance of the point {{tt|(x,y,z)}} from the origin {{tt|(0,0,0)}}. | The value computed by the three-argument version of this function is the distance of the point {{tt|(x,y,z)}} from the origin {{tt|(0,0,0)}}. | ||
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===Error handling=== | ===Error handling=== | ||
| − | Errors are reported as specified in {{lc|math_errhandling}} | + | Errors are reported as specified in {{lc|math_errhandling}}. |
If the implementation supports IEEE floating-point arithmetic (IEC 60559), | If the implementation supports IEEE floating-point arithmetic (IEC 60559), | ||
| − | * {{c|std::hypot(x, y)}}, {{c|std::hypot(y, x)}}, and {{c|std::hypot(x, -y)}} are equivalent | + | * {{c|std::hypot(x, y)}}, {{c|std::hypot(y, x)}}, and {{c|std::hypot(x, -y)}} are equivalent. |
| − | * if one of the arguments is ±0, {{c|std::hypot(x, y)}} is equivalent to {{lc|std::fabs}} called with the non-zero argument | + | * if one of the arguments is ±0, {{c|std::hypot(x, y)}} is equivalent to {{lc|std::fabs}} called with the non-zero argument. |
| − | * if one of the arguments is ±∞, {{c|std::hypot(x, y)}} returns +∞ even if the other argument is NaN | + | * if one of the arguments is ±∞, {{c|std::hypot(x, y)}} returns +∞ even if the other argument is NaN. |
| − | * otherwise, if any of the arguments is NaN, NaN is returned | + | * otherwise, if any of the arguments is NaN, NaN is returned. |
===Notes=== | ===Notes=== | ||
| − | Implementations usually guarantee precision of less than 1 {{enwiki|Unit in the last place|ulp}} (Unit in the Last Place — Unit of Least Precision): [https://sourceware.org/git/?p=glibc.git;a=blob_plain;f=sysdeps/ieee754/dbl-64/e_hypot.c GNU], [ | + | Implementations usually guarantee precision of less than 1 {{enwiki|Unit in the last place|ulp}} (Unit in the Last Place — Unit of Least Precision): [https://sourceware.org/git/?p=glibc.git;a=blob_plain;f=sysdeps/ieee754/dbl-64/e_hypot.c GNU], [https://www.freebsd.org/cgi/cvsweb.cgi/src/lib/msun/src/e_hypot.c BSD]. |
{{c|std::hypot(x, y)}} is equivalent to {{c|std::abs(std::complex<double>(x, y))}}. | {{c|std::hypot(x, y)}} is equivalent to {{c|std::abs(std::complex<double>(x, y))}}. | ||
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===Example=== | ===Example=== | ||
{{example | {{example | ||
| − | |||
|code= | |code= | ||
#include <cerrno> | #include <cerrno> | ||
Latest revision as of 08:05, 14 September 2023
| Defined in header <cmath>
|
||
| (1) | ||
float hypot ( float x, float y ); double hypot ( double x, double y ); |
(since C++11) (until C++23) |
|
| /* floating-point-type */ hypot ( /* floating-point-type */ x, |
(since C++23) (constexpr since C++26) |
|
| float hypotf( float x, float y ); |
(2) | (since C++11) (constexpr since C++26) |
| long double hypotl( long double x, long double y ); |
(3) | (since C++11) (constexpr since C++26) |
| (4) | ||
float hypot ( float x, float y, float z ); double hypot ( double x, double y, double z ); |
(since C++17) (until C++23) |
|
| /* floating-point-type */ hypot ( /* floating-point-type */ x, |
(since C++23) (constexpr since C++26) |
|
| Defined in header <cmath>
|
||
| template< class Arithmetic1, Arithmetic2 > /* common-floating-point-type */ |
(A) | (since C++11) (constexpr since C++26) |
| template< class Arithmetic1, Arithmetic2, Arithmetic3 > /* common-floating-point-type */ |
(B) | (since C++17) (constexpr since C++26) |
1-3) Computes the square root of the sum of the squares of x and y, without undue overflow or underflow at intermediate stages of the computation.The library provides overloads of
std::hypot for all cv-unqualified floating-point types as the type of the parameters x and y.(since C++23)4) Computes the square root of the sum of the squares of x, y, and z, without undue overflow or underflow at intermediate stages of the computation.The library provides overloads of
std::hypot for all cv-unqualified floating-point types as the type of the parameters x, y and z.(since C++23)A,B) Additional overloads are provided for all other combinations of arithmetic types.
The value computed by the two-argument version of this function is the length of the hypotenuse of a right-angled triangle with sides of length x and y, or the distance of the point (x,y) from the origin (0,0), or the magnitude of a complex number x+iy.
The value computed by the three-argument version of this function is the distance of the point (x,y,z) from the origin (0,0,0).
Contents |
[edit] Parameters
| x, y, z | - | floating-point or integer values |
[edit] Return value
1-3,A) If no errors occur, the hypotenuse of a right-angled triangle, √x2+y2, is returned.
4,B) If no errors occur, the distance from origin in 3D space, √x2+y2+z2, is returned.
If a range error due to overflow occurs, +HUGE_VAL, +HUGE_VALF, or +HUGE_VALL is returned.
If a range error due to underflow occurs, the correct result (after rounding) is returned.
[edit] Error handling
Errors are reported as specified in math_errhandling.
If the implementation supports IEEE floating-point arithmetic (IEC 60559),
- std::hypot(x, y), std::hypot(y, x), and std::hypot(x, -y) are equivalent.
- if one of the arguments is ±0, std::hypot(x, y) is equivalent to std::fabs called with the non-zero argument.
- if one of the arguments is ±∞, std::hypot(x, y) returns +∞ even if the other argument is NaN.
- otherwise, if any of the arguments is NaN, NaN is returned.
[edit] Notes
Implementations usually guarantee precision of less than 1 ulp (Unit in the Last Place — Unit of Least Precision): GNU, BSD.
std::hypot(x, y) is equivalent to std::abs(std::complex<double>(x, y)).
POSIX specifies that underflow may only occur when both arguments are subnormal and the correct result is also subnormal (this forbids naive implementations).
|
Distance between two points |
(since C++17) |
The additional overloads are not required to be provided exactly as (A,B). They only need to be sufficient to ensure that for their first argument num1, second argument num2 and the optional third argument num3:
|
(until C++23) |
|
If num1, num2 and num3 have arithmetic types, then
where /* common-floating-point-type */ is the floating-point type with the greatest floating-point conversion rank and greatest floating-point conversion subrank among the types of num1, num2 and num3, arguments of integer type are considered to have the same floating-point conversion rank as double. If no such floating-point type with the greatest rank and subrank exists, then overload resolution does not result in a usable candidate from the overloads provided. |
(since C++23) |
| Feature-test macro | Value | Std | Feature |
|---|---|---|---|
__cpp_lib_hypot |
201603L | (C++17) | 3-argument overload of std::hypot
|
[edit] Example
Run this code
#include <cerrno> #include <cfenv> #include <cfloat> #include <cmath> #include <cstring> #include <iostream> // #pragma STDC FENV_ACCESS ON struct Point3D { float x, y, z; }; int main() { // typical usage std::cout << "(1,1) cartesian is (" << std::hypot(1,1) << ',' << std::atan2(1,1) << ") polar\n"; Point3D a{3.14, 2.71, 9.87}, b{1.14, 5.71, 3.87}; // C++17 has 3-argument hypot overload: std::cout << "distance(a,b) = " << std::hypot(a.x - b.x, a.y - b.y, a.z - b.z) << '\n'; // special values std::cout << "hypot(NAN,INFINITY) = " << std::hypot(NAN, INFINITY) << '\n'; // error handling errno = 0; std::feclearexcept(FE_ALL_EXCEPT); std::cout << "hypot(DBL_MAX,DBL_MAX) = " << std::hypot(DBL_MAX, DBL_MAX) << '\n'; if (errno == ERANGE) std::cout << " errno = ERANGE " << std::strerror(errno) << '\n'; if (std::fetestexcept(FE_OVERFLOW)) std::cout << " FE_OVERFLOW raised\n"; }
Output:
(1,1) cartesian is (1.41421,0.785398) polar
distance(a,b) = 7
hypot(NAN,INFINITY) = inf
hypot(DBL_MAX,DBL_MAX) = inf
errno = ERANGE Numerical result out of range
FE_OVERFLOW raised[edit] See also
| (C++11)(C++11) |
raises a number to the given power (xy) (function) |
| (C++11)(C++11) |
computes square root (√x) (function) |
| (C++11)(C++11)(C++11) |
computes cube root (3√x) (function) |
| returns the magnitude of a complex number (function template) | |
| C documentation for hypot
| |
