std::ratio_add
Defined in header <ratio> |
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|---|---|---|
template< class R1, class R2 > using ratio_add = /* see below */; |
(since C++11) |
The alias template std::ratio_add denotes the result of adding two exact rational fractions represented by the std::ratio specializations R1 and R2.
The result is a std::ratio specialization std::ratio<U, V>, such that given Num == R1::num * R2::den + R2::num * R1::den and Denom == R1::den * R2::den (computed without arithmetic overflow), U is std::ratio<Num, Denom>::num and V is std::ratio<Num, Denom>::den.
Notes
If U or V is not representable in std::intmax_t, the program is ill-formed. If Num or Denom is not representable in std::intmax_t, the program is ill-formed unless the implementation yields correct values for U and V.
The above definition requires that the result of std::ratio_add<R1, R2> be already reduced to lowest terms; for example, std::ratio_add<std::ratio<1, 3>, std::ratio<1, 6>> is the same type as std::ratio<1, 2>.
Example
#include <iostream>
#include <ratio>
int main()
{
using two_third = std::ratio<2, 3>;
using one_sixth = std::ratio<1, 6>;
using sum = std::ratio_add<two_third, one_sixth>;
std::cout << "2/3 + 1/6 = " << sum::num << '/' << sum::den << '\n';
}
Output:
2/3 + 1/6 = 5/6
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