operator* (<complex>)
Multiplica dos números complejos, uno o que puede pertenecer al subconjunto de tipo para las partes real e imaginarias.
template<class Type>
complex<Type> operator*(
const complex<Type>& _Left,
const complex<Type>& _Right
);
template<class Type>
complex<Type> operator*(
const complex<Type>& _Left,
const Type& _Right
);
template<class Type>
complex<Type> operator*(
const Type& _Left,
const complex<Type>& _Right
);
Parámetros
_Left
El primer de dos números complejos o un número que es del tipo de parámetro para un número complejo que se multiplica por * operación._Right
El segundo de los dos números complejos o un número que es del tipo de parámetro para un número complejo que se multiplica por * operación.
Valor devuelto
El número complejo que resultados de multiplicación de los dos números cuyo valor y las entradas de parámetro especifica un tipo.
Comentarios
Se sobrecarga la operación para poder ejecutarse operaciones aritméticas simples sin conversión de datos en un formato determinado.
Ejemplo
// complex_op_mult.cpp
// compile with: /EHsc
#include <complex>
#include <iostream>
int main( )
{
using namespace std;
double pi = 3.14159265359;
// Example of the first member function
// type complex<double> times type complex<double>
complex <double> cl1 ( polar (3.0 , pi / 6 ) );
complex <double> cr1 ( polar (2.0 , pi / 3 ) );
complex <double> cs1 = cl1 * cr1;
cout << "The left-side complex number is cl1 = " << cl1 << endl;
cout << "The right-side complex number is cr1 = " << cr1 << endl;
cout << "Product of two complex numbers is: cs1 = " << cs1 << endl;
double abscs1 = abs ( cs1 );
double argcs1 = arg ( cs1 );
cout << "The modulus of cs1 is: " << abscs1 << endl;
cout << "The argument of cs1 is: "<< argcs1 << " radians, which is "
<< argcs1 * 180 / pi << " degrees." << endl << endl;
// Example of the second member function
// type complex<double> times type double
complex <double> cl2 ( polar ( 3.0 , pi / 6 ) );
double cr2 =5;
complex <double> cs2 = cl2 * cr2;
cout << "The left-side complex number is cl2 = " << cl2 << endl;
cout << "The right-side complex number is cr2 = " << cr2 << endl;
cout << "Product of two complex numbers is: cs2 = " << cs2 << endl;
double abscs2 = abs ( cs2 );
double argcs2 = arg ( cs2 );
cout << "The modulus of cs2 is: " << abscs2 << endl;
cout << "The argument of cs2 is: "<< argcs2 << " radians, which is "
<< argcs2 * 180 / pi << " degrees." << endl << endl;
// Example of the third member function
// type double times type complex<double>
double cl3 = 5;
complex <double> cr3 ( polar (3.0 , pi / 6 ) );
complex <double> cs3 = cl3 * cr3;
cout << "The left-side complex number is cl3 = " << cl3 << endl;
cout << "The right-side complex number is cr3 = " << cr3 << endl;
cout << "Product of two complex numbers is: cs3 = " << cs3 << endl;
double abscs3 = abs ( cs3 );
double argcs3 = arg ( cs3 );
cout << "The modulus of cs3 is: " << abscs3 << endl;
cout << "The argument of cs3 is: "<< argcs3 << " radians, which is "
<< argcs3 * 180 / pi << " degrees." << endl << endl;
}
Resultados del ejemplo
A continuación se genera en x86.
The left-side complex number is cl1 = (2.59808,1.5)
The right-side complex number is cr1 = (1,1.73205)
Product of two complex numbers is: cs1 = (-6.20837e-013,6)
The modulus of cs1 is: 6
The argument of cs1 is: 1.5708 radians, which is 90 degrees.
The left-side complex number is cl2 = (2.59808,1.5)
The right-side complex number is cr2 = 5
Product of two complex numbers is: cs2 = (12.9904,7.5)
The modulus of cs2 is: 15
The argument of cs2 is: 0.523599 radians, which is 30 degrees.
The left-side complex number is cl3 = 5
The right-side complex number is cr3 = (2.59808,1.5)
Product of two complex numbers is: cs3 = (12.9904,7.5)
The modulus of cs3 is: 15
The argument of cs3 is: 0.523599 radians, which is 30 degrees.
Requisitos
complejo <deEncabezado: >
Espacio de nombres: std