std::tgamma, std::tgammaf, std::tgammal
Defined in header <cmath>
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(1) | ||
float tgamma ( float num ); double tgamma ( double num ); |
(until C++23) | |
/* floating-point-type */ tgamma ( /* floating-point-type */ num ); |
(since C++23) (constexpr since C++26) |
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float tgammaf( float num ); |
(2) | (since C++11) (constexpr since C++26) |
long double tgammal( long double num ); |
(3) | (since C++11) (constexpr since C++26) |
Additional overloads (since C++11) |
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Defined in header <cmath>
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template< class Integer > double tgamma ( Integer num ); |
(A) | (constexpr since C++26) |
std::tgamma
for all cv-unqualified floating-point types as the type of the parameter.(since C++23)
A) Additional overloads are provided for all integer types, which are treated as double.
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(since C++11) |
Parameters
num | - | floating-point or integer value |
Return value
If no errors occur, the value of the gamma function of num, that is ∫∞
0tnum-1
e-t dt, is returned.
If a domain error occurs, an implementation-defined value (NaN where supported) is returned.
If a pole error occurs, ±HUGE_VAL, ±HUGE_VALF
, or ±HUGE_VALL
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 value (after rounding) is returned.
Error handling
Errors are reported as specified in math_errhandling.
If num is zero or is an integer less than zero, a pole error or a domain error may occur.
If the implementation supports IEEE floating-point arithmetic (IEC 60559),
- If the argument is ±0, ±∞ is returned and FE_DIVBYZERO is raised.
- If the argument is a negative integer, NaN is returned and FE_INVALID is raised.
- If the argument is -∞, NaN is returned and FE_INVALID is raised.
- If the argument is +∞, +∞ is returned.
- If the argument is NaN, NaN is returned.
Notes
If num is a natural number, std::tgamma(num) is the factorial of num - 1. Many implementations calculate the exact integer-domain factorial if the argument is a sufficiently small integer.
For IEEE-compatible type double, overflow happens if 0 < num && num < 1 / DBL_MAX or if num > 171.7.
POSIX requires that a pole error occurs if the argument is zero, but a domain error occurs when the argument is a negative integer. It also specifies that in future, domain errors may be replaced by pole errors for negative integer arguments (in which case the return value in those cases would change from NaN to ±∞).
There is a non-standard function named gamma
in various implementations, but its definition is inconsistent. For example, glibc and 4.2BSD version of gamma
executes lgamma
, but 4.4BSD version of gamma
executes tgamma
.
The additional overloads are not required to be provided exactly as (A). They only need to be sufficient to ensure that for their argument num of integer type, std::tgamma(num) has the same effect as std::tgamma(static_cast<double>(num)).
Example
#include <cerrno> #include <cfenv> #include <cmath> #include <cstring> #include <iostream> // #pragma STDC FENV_ACCESS ON int main() { std::cout << "tgamma(10) = " << std::tgamma(10) << ", 9! = " << 2 * 3 * 4 * 5 * 6 * 7 * 8 * 9 << '\n' << "tgamma(0.5) = " << std::tgamma(0.5) << ", sqrt(pi) = " << std::sqrt(std::acos(-1)) << '\n'; // special values std::cout << "tgamma(1) = " << std::tgamma(1) << '\n' << "tgamma(+Inf) = " << std::tgamma(INFINITY) << '\n'; // error handling errno = 0; std::feclearexcept(FE_ALL_EXCEPT); std::cout << "tgamma(-1) = " << std::tgamma(-1) << '\n'; if (errno == EDOM) std::cout << " errno == EDOM: " << std::strerror(errno) << '\n'; if (std::fetestexcept(FE_INVALID)) std::cout << " FE_INVALID raised\n"; }
Possible output:
tgamma(10) = 362880, 9! = 362880 tgamma(0.5) = 1.77245, sqrt(pi) = 1.77245 tgamma(1) = 1 tgamma(+Inf) = inf tgamma(-1) = nan errno == EDOM: Numerical argument out of domain FE_INVALID raised
See also
(C++11)(C++11)(C++11) |
natural logarithm of the gamma function (function) |
(C++17)(C++17)(C++17) |
beta function (function) |
C documentation for tgamma
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External links
Weisstein, Eric W. "Gamma Function." From MathWorld — A Wolfram Web Resource. |