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complex Class

The class template describes an object that stores two objects of type Type, one that represents the real part of a complex number and one that represents the imaginary part.

Syntax

template <class Type>
class complex

Remarks

An object of class Type:

  • Has a public default constructor, destructor, copy constructor, and assignment operator with conventional behavior.

  • Can be assigned integer or floating-point values, or type cast to such values with conventional behavior.

  • Defines the arithmetic operators and math functions, as needed, that are defined for the floating-point types with conventional behavior.

In particular, no subtle differences may exist between copy construction and default construction followed by assignment. None of the operations on objects of class Type may throw exceptions.

Explicit specializations of class template complex exist for the three floating-point types. In this implementation, a value of any other type Type is typecast to double for actual calculations, with the double result assigned back to the stored object of type Type.

Members

Constructors

Name Description
complex Constructs a complex number with specified real and imaginary parts or as a copy of some other complex number.

Typedefs

Name Description
value_type A type that represents the data type used to represent the real and imaginary parts of a complex number.

Functions

Name Description
imag Extracts the imaginary component of a complex number.
real Extracts the real component of a complex number.

Operators

Name Description
operator*= Multiplies a target complex number by a factor, which may be complex or be the same type as are the real and imaginary parts of the complex number.
operator+= Adds a number to a target complex number, where the number added may be complex or of the same type as are the real and imaginary parts of the complex number to which it's added.
operator-= Subtracts a number from a target complex number, where the number subtracted may be complex or of the same type as are the real and imaginary parts of the complex number to which it's added.
operator/= Divides a target complex number by a divisor, which may be complex or be the same type as are the real and imaginary parts of the complex number.
operator= Assigns a number to a target complex number, where the number assigned may be complex or of the same type as are the real and imaginary parts of the complex number to which it's being assigned.

complex

Constructs a complex number with specified real and imaginary parts or as a copy of some other complex number.

constexpr complex(
    const T& _RealVal = 0,
    const T& _ImagVal = 0);

template <class Other>
constexpr complex(
    const complex<Other>& complexNum);

Parameters

_RealVal
The value of the real part used to initialize the complex number being constructed.

_ImagVal
The value of the imaginary part used to initialize the complex number being constructed.

complexNum
The complex number whose real and imaginary parts are used to initialize the complex number being constructed.

Remarks

The first constructor initializes the stored real part to _RealVal and the stored imaginary part to _Imagval. The second constructor initializes the stored real part to complexNum.real() and the stored imaginary part to complexNum.imag().

In this implementation, if a translator doesn't support member template functions, the template:

template <class Other>
complex(const complex<Other>& right);

is replaced with:

complex(const complex& right);

which is the copy constructor.

Example

// complex_complex.cpp
// compile with: /EHsc
#include <complex>
#include <iostream>

int main( )
{
    using namespace std;
    double pi = 3.14159265359;

    // The first constructor specifies real & imaginary parts
    complex<double> c1( 4.0 , 5.0 );
    cout << "Specifying initial real & imaginary parts,"
        << "c1 = " << c1 << endl;

    // The second constructor initializes values of the real &
    // imaginary parts using those of another complex number
    complex<double> c2( c1 );
    cout << "Initializing with the real and imaginary parts of c1,"
        << " c2 = " << c2 << endl;

    // Complex numbers can be initialized in polar form
    // but will be stored in Cartesian form
    complex<double> c3( polar( sqrt( (double)8 ) , pi / 4 ) );
    cout << "c3 = polar( sqrt( 8 ) , pi / 4 ) = " << c3 << endl;

    // The modulus and argument of a complex number can be recovered
    double absc3 = abs( c3 );
    double argc3 = arg( c3 );
    cout << "The modulus of c3 is recovered from c3 using: abs( c3 ) = "
        << absc3 << endl;
    cout << "Argument of c3 is recovered from c3 using:\n arg( c3 ) = "
        << argc3 << " radians, which is " << argc3 * 180 / pi
        << " degrees." << endl;
}

imag

Extracts the imaginary component of a complex number.

T imag() const;

T imag(const T& right);

Parameters

right
A complex number whose imaginary value is to be extracted.

Return Value

The imaginary part of the complex number.

Remarks

For a complex number a + bi, the imaginary part or component is Im(a + bi) = b.

Example

// complex_imag.cpp
// compile with: /EHsc
#include <complex>
#include <iostream>

int main( )
{
    using namespace std;

    complex<double> c1( 4.0 , 3.0 );
    cout << "The complex number c1 = " << c1 << endl;

    double dr1 = c1.real();
    cout << "The real part of c1 is c1.real() = "
        << dr1 << "." << endl;

    double di1 = c1.imag();
    cout << "The imaginary part of c1 is c1.imag() = "
        << di1 << "." << endl;
}
The complex number c1 = (4,3)
The real part of c1 is c1.real() = 4.
The imaginary part of c1 is c1.imag() = 3.

operator*=

Multiplies a target complex number by a factor, which may be complex or be the same type as are the real and imaginary parts of the complex number.

template <class Other>
complex& operator*=(const complex<Other>& right);

complex<Type>& operator*=(const Type& right);

complex<Type>& operator*=(const complex<Type>& right);

Parameters

right
A complex number or a number that is of the same type as the parameter of the target complex number.

Return Value

A complex number that has been multiplied by the number specified as a parameter.

Remarks

The operation is overloaded so that simple arithmetic operations can be executed without the conversion of the data to a particular format.

Example

// complex_op_me.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> multiplied by type complex<double>
    complex<double> cl1( polar ( 3.0 , pi / 6 ) );
    complex<double> cr1( polar ( 2.0 , pi / 3 ) );
    cout << "The left-side complex number is cl1 = " << cl1 << endl;
    cout << "The right-side complex number is cr1 = " << cr1 << endl;

    complex<double> cs1 = cl1 * cr1;
    cout << "Quotient of two complex numbers is: cs1 = cl1 * cr1 = "
        << cs1 << endl;

    // This is equivalent to the following operation
    cl1 *= cr1;
    cout << "Quotient of two complex numbers is also: cl1 *= cr1 = "
        << cl1 << endl;

    double abscl1 = abs ( cl1 );
    double argcl1 = arg ( cl1 );
    cout << "The modulus of cl1 is: " << abscl1 << endl;
    cout << "The argument of cl1 is: "<< argcl1 << " radians, which is "
        << argcl1 * 180 / pi << " degrees." << endl << endl;

    // Example of the second member function
    // type complex<double> multiplied by type double
    complex<double> cl2 ( polar ( 3.0 , pi / 6 ) );
    double cr2 = 5.0;
    cout << "The left-side complex number is cl2 = " << cl2 << endl;
    cout << "The right-side complex number is cr2 = " << cr2 << endl;

    complex<double> cs2 = cl2 * cr2;
    cout << "Quotient of two complex numbers is: cs2 = cl2 * cr2 = "
        << cs2 << endl;

    // This is equivalent to the following operation
    cl2 *= cr2;
    cout << "Quotient of two complex numbers is also: cl2 *= cr2 = "
        << cl2 << endl;

    double abscl2 = abs ( cl2 );
    double argcl2 = arg ( cl2 );
    cout << "The modulus of cl2 is: " << abscl2 << endl;
    cout << "The argument of cl2 is: "<< argcl2 << " radians, which is "
        << argcl2 * 180 / pi << " degrees." << endl;
}

operator+=

Adds a number to a target complex number, where the number added may be complex or of the same type as are the real and imaginary parts of the complex number to which it's added.

template <class Other>
complex<Type>& operator+=(const complex<Other>& right);

complex<Type>& operator+=(const Type& right);

complex<Type>& operator+=(const complex<Type>& right);

Parameters

right
A complex number or a number that is of the same type as the parameter of the target complex number.

Return Value

A complex number that has had the number specified as a parameter added.

Remarks

The operation is overloaded so that simple arithmetic operations can be executed without the conversion of the data to a particular format.

Example

// complex_op_pe.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> added to type complex<double>
   complex<double> cl1( 3.0 , 4.0 );
   complex<double> cr1( 2.0 , -1.0 );
   cout << "The left-side complex number is cl1 = " << cl1 << endl;
   cout << "The right-side complex number is cr1 = " << cr1 << endl;

   complex<double> cs1 = cl1 + cr1;
   cout << "The sum of the two complex numbers is: cs1 = cl1 + cr1 = "
        << cs1 << endl;

   // This is equivalent to the following operation
   cl1 += cr1;
   cout << "The complex number cr1 added to the complex number cl1 is:"
        << "\n cl1 += cr1 = " << cl1 << endl;

   double abscl1 = abs( cl1 );
   double argcl1 = arg( cl1 );
   cout << "The modulus of cl1 is: " << abscl1 << endl;
   cout << "The argument of cl1 is: "<< argcl1 << " radians, which is "
        << argcl1 * 180 / pi << " degrees." << endl << endl;

   // Example of the second member function
   // type double added to type complex<double>
   complex<double> cl2( -2 , 4 );
   double cr2 =5.0;
   cout << "The left-side complex number is cl2 = " << cl2 << endl;
   cout << "The right-side complex number is cr2 = " << cr2 << endl;

   complex<double> cs2 = cl2 + cr2;
   cout << "The sum of the two complex numbers is: cs2 = cl2 + cr2 = "
        << cs2 << endl;

   // This is equivalent to the following operation
   cl2 += cr2;
   cout << "The complex number cr2 added to the complex number cl2 is:"
        << "\n cl2 += cr2 = " << cl2 << endl;

   double abscl2 = abs( cl2 );
   double argcl2 = arg( cl2 );
   cout << "The modulus of cl2 is: " << abscl2 << endl;
   cout << "The argument of cl2 is: "<< argcl2 << " radians, which is "
        << argcl2 * 180 / pi << " degrees." << endl << endl;
}
The left-side complex number is cl1 = (3,4)
The right-side complex number is cr1 = (2,-1)
The sum of the two complex numbers is: cs1 = cl1 + cr1 = (5,3)
The complex number cr1 added to the complex number cl1 is:
cl1 += cr1 = (5,3)
The modulus of cl1 is: 5.83095
The argument of cl1 is: 0.54042 radians, which is 30.9638 degrees.

The left-side complex number is cl2 = (-2,4)
The right-side complex number is cr2 = 5
The sum of the two complex numbers is: cs2 = cl2 + cr2 = (3,4)
The complex number cr2 added to the complex number cl2 is:
cl2 += cr2 = (3,4)
The modulus of cl2 is: 5
The argument of cl2 is: 0.927295 radians, which is 53.1301 degrees.

operator-=

Subtracts a number from a target complex number, where the number subtracted may be complex or of the same type as are the real and imaginary parts of the complex number to which it's added.

template <class Other>
complex<Type>& operator-=(const complex<Other>& complexNum);

complex<Type>& operator-=(const Type& _RealPart);

complex<Type>& operator-=(const complex<Type>& complexNum);

Parameters

complexNum
A complex number to be subtracted from the target complex number.

_RealPart
A real number to be subtracted from the target complex number.

Return Value

A complex number that has had the number specified as a parameter subtracted from it.

Remarks

The operation is overloaded so that simple arithmetic operations can be executed without the conversion of the data to a particular format.

Example

// complex_op_se.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> subtracted from type complex<double>
   complex<double> cl1( 3.0 , 4.0 );
   complex<double> cr1( 2.0 , -1.0 );
   cout << "The left-side complex number is cl1 = " << cl1 << endl;
   cout << "The right-side complex number is cr1 = " << cr1 << endl;

   complex<double> cs1 = cl1 - cr1;
   cout << "The difference between the two complex numbers is:"
        << "\n cs1 = cl1 - cr1 = " << cs1 << endl;

   // This is equivalent to the following operation
   cl1 -= cr1;
   cout << "Complex number cr1 subtracted from complex number cl1 is:"
        << "\n cl1 -= cr1 = " << cl1 << endl;

   double abscl1 = abs( cl1 );
   double argcl1 = arg( cl1 );
   cout << "The modulus of cl1 is: " << abscl1 << endl;
   cout << "The argument of cl1 is: "<< argcl1 << " radians, which is "
        << argcl1 * 180 / pi << " degrees." << endl << endl;

   // Example of the second member function
   // type double subtracted from type complex<double>
   complex<double> cl2( 2.0 , 4.0 );
   double cr2 = 5.0;
   cout << "The left-side complex number is cl2 = " << cl2 << endl;
   cout << "The right-side complex number is cr2 = " << cr2 << endl;

   complex<double> cs2 = cl2 - cr2;
   cout << "The difference between the two complex numbers is:"
        << "\n cs2 = cl2 - cr2 = " << cs2 << endl;

   // This is equivalent to the following operation
   cl2  -= cr2;
   cout << "Complex number cr2 subtracted from complex number cl2 is:"
        << "\n cl2 -= cr2 = " << cl2 << endl;

   double abscl2 = abs( cl2 );
   double argcl2 = arg( cl2 );
   cout << "The modulus of cl2 is: " << abscl2 << endl;
   cout << "The argument of cl2 is: "<< argcl2 << " radians, which is "
        << argcl2 * 180 / pi << " degrees." << endl << endl;
}
The left-side complex number is cl1 = (3,4)
The right-side complex number is cr1 = (2,-1)
The difference between the two complex numbers is:
cs1 = cl1 - cr1 = (1,5)
Complex number cr1 subtracted from complex number cl1 is:
cl1 -= cr1 = (1,5)
The modulus of cl1 is: 5.09902
The argument of cl1 is: 1.3734 radians, which is 78.6901 degrees.

The left-side complex number is cl2 = (2,4)
The right-side complex number is cr2 = 5
The difference between the two complex numbers is:
cs2 = cl2 - cr2 = (-3,4)
Complex number cr2 subtracted from complex number cl2 is:
cl2 -= cr2 = (-3,4)
The modulus of cl2 is: 5
The argument of cl2 is: 2.2143 radians, which is 126.87 degrees.

operator/=

Divides a target complex number by a divisor, which may be complex or be the same type as are the real and imaginary parts of the complex number.

template <class Other>
complex<Type>& operator/=(const complex<Other>& complexNum);

complex<Type>& operator/=(const Type& _RealPart);

complex<Type>& operator/=(const complex<Type>& complexNum);

Parameters

complexNum
A complex number to be subtracted from the target complex number.

_RealPart
A real number to be subtracted from the target complex number.

Return Value

A complex number that has been divided by the number specified as a parameter.

Remarks

The operation is overloaded so that simple arithmetic operations can be executed without the conversion of the data to a particular format.

Example

// complex_op_de.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> divided by type complex<double>
   complex<double> cl1( polar (3.0 , pi / 6 ) );
   complex<double> cr1( polar (2.0 , pi / 3 ) );
   cout << "The left-side complex number is cl1 = " << cl1 << endl;
   cout << "The right-side complex number is cr1 = " << cr1 << endl;

   complex<double> cs1 = cl1 / cr1;
   cout << "The quotient of the two complex numbers is: cs1 = cl1 /cr1 = "
        << cs1 << endl;

   // This is equivalent to the following operation
   cl1 /= cr1;
   cout << "Quotient of two complex numbers is also: cl1 /= cr1 = "
        << cl1 << endl;

   double abscl1 = abs( cl1 );
   double argcl1 = arg( cl1 );
   cout << "The modulus of cl1 is: " << abscl1 << endl;
   cout << "The argument of cl1 is: "<< argcl1 << " radians, which is "
        << argcl1 * 180 / pi << " degrees." << endl << endl;

   // Example of the second member function
   // type complex<double> divided by type double
   complex<double> cl2( polar(3.0 , pi / 6 ) );
   double cr2 =5;
   cout << "The left-side complex number is cl2 = " << cl2 << endl;
   cout << "The right-side complex number is cr2 = " << cr2 << endl;

   complex<double> cs2 = cl2 / cr2;
   cout << "The quotient of the two complex numbers is: cs2 /= cl2 cr2 = "
        << cs2 << endl;

   // This is equivalent to the following operation
   cl2 /= cr2;
   cout << "Quotient of two complex numbers is also: cl2 = /cr2 = "
        << cl2 << endl;

   double abscl2 = abs( cl2 );
   double argcl2 = arg( cl2 );
   cout << "The modulus of cl2 is: " << abscl2 << endl;
   cout << "The argument of cl2 is: "<< argcl2 << " radians, which is "
        << argcl2 * 180 / pi << " degrees." << endl << endl;
}
The left-side complex number is cl1 = (2.59808,1.5)
The right-side complex number is cr1 = (1,1.73205)
The quotient of the two complex numbers is: cs1 = cl1 /cr1 = (1.29904,-0.75)
Quotient of two complex numbers is also: cl1 /= cr1 = (1.29904,-0.75)
The modulus of cl1 is: 1.5
The argument of cl1 is: -0.523599 radians, which is -30 degrees.

The left-side complex number is cl2 = (2.59808,1.5)
The right-side complex number is cr2 = 5
The quotient of the two complex numbers is: cs2 /= cl2 cr2 = (0.519615,0.3)
Quotient of two complex numbers is also: cl2 = /cr2 = (0.519615,0.3)
The modulus of cl2 is: 0.6
The argument of cl2 is: 0.523599 radians, which is 30 degrees.

operator=

Assigns a number to a target complex number, where the number assigned may be complex or of the same type as are the real and imaginary parts of the complex number to which it's being assigned.

template <class Other>
complex<Type>& operator=(const complex<Other>& right);

complex<Type>& operator=(const Type& right);

Parameters

right
A complex number or a number that is of the same type as the parameter of the target complex number.

Return Value

A complex number that has been assigned the number specified as a parameter.

Remarks

The operation is overloaded so that simple arithmetic operations can be executed without the conversion of the data to a particular format.

Example

// complex_op_as.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> assigned to type complex<double>
   complex<double> cl1( 3.0 , 4.0 );
   complex<double> cr1( 2.0 , -1.0 );
   cout << "The left-side complex number is cl1 = " << cl1 << endl;
   cout << "The right-side complex number is cr1 = " << cr1 << endl;

   cl1  = cr1;
   cout << "The complex number cr1 assigned to the complex number cl1 is:"
        << "\ncl1 = cr1 = " << cl1 << endl;

   // Example of the second member function
   // type double assigned to type complex<double>
   complex<double> cl2( -2 , 4 );
   double cr2 =5.0;
   cout << "The left-side complex number is cl2 = " << cl2 << endl;
   cout << "The right-side complex number is cr2 = " << cr2 << endl;

   cl2 = cr2;
   cout << "The complex number cr2 assigned to the complex number cl2 is:"
        << "\ncl2 = cr2 = " << cl2 << endl;

   cl2 = complex<double>(3.0, 4.0);
   cout << "The complex number (3, 4) assigned to the complex number cl2 is:"
        << "\ncl2 = " << cl2 << endl;
}
The left-side complex number is cl1 = (3,4)
The right-side complex number is cr1 = (2,-1)
The complex number cr1 assigned to the complex number cl1 is:
cl1 = cr1 = (2,-1)
The left-side complex number is cl2 = (-2,4)
The right-side complex number is cr2 = 5
The complex number cr2 assigned to the complex number cl2 is:
cl2 = cr2 = (5,0)
The complex number (3, 4) assigned to the complex number cl2 is:
cl2 = (3,4)

real

Gets or sets the real component of a complex number.

constexpr T real() const;

T real(const T& right);

Parameters

right
A complex number whose real value is to be extracted.

Return Value

The real part of the complex number.

Remarks

For a complex number a + bi, the real part or component is Re(a + bi) = a.

Example

// complex_class_real.cpp
// compile with: /EHsc
#include <complex>
#include <iostream>

int main( )
{
   using namespace std;

   complex<double> c1( 4.0 , 3.0 );
   cout << "The complex number c1 = " << c1 << endl;

   double dr1 = c1.real();
   cout << "The real part of c1 is c1.real() = "
        << dr1 << "." << endl;

   double di1 = c1.imag();
   cout << "The imaginary part of c1 is c1.imag() = "
        << di1 << "." << endl;
}
The complex number c1 = (4,3)
The real part of c1 is c1.real() = 4.
The imaginary part of c1 is c1.imag() = 3.

value_type

A type that represents the data type used to represent the real and imaginary parts of a complex number.

typedef Type value_type;

Remarks

value_type is a synonym for the class complex Type template parameter.

Example

// complex_valuetype.cpp
// compile with: /EHsc
#include <complex>
#include <iostream>

int main( )
{
    using namespace std;
    complex<double>::value_type a = 3, b = 4;

    complex<double> c1 ( a , b );
    cout << "Specifying initial real & imaginary parts"
        << "\nof type value_type: "
        << "c1 = " << c1 << "." << endl;
}
Specifying initial real & imaginary parts
of type value_type: c1 = (3,4).

See also

Thread Safety in the C++ Standard Library