i have following code

#include<math.h>
class complex
{

public:
    double getRe();
    double gerIm();
    void setRe(double value);
    void setIm(double value);
    explicit complex(double=0.0,double=0.0);
    static complex fromPolar(double radius,double angle);
    complex operator+(complex rhs);
    complex operator-(complex rhhs);
    complex operator*(complex rhs);
    complex operator+(double rhs);
    complex operator-(double rhs);
    complex operator*(double rhs);
    complex conjugate();
    double norm();
    complex operator/(double rhs);
    complex operator/(complex rhs);

private:
    double real;
    double img;

};
complex operator+(double lhs,complex rhs);
complex operator-(double lhs,complex rhs);
complex operator*(double lhs,complex rhs);
complex operator/(double lhs,complex rhs);
complex exp(complex c);
inline double complex::getRe(){return real;}
inline double complex::gerIm(){ return img;}
inline void complex::setRe(double value) {  real=value;}
inline void complex::setIm(double value) { img=value;}
 inline complex::complex(double re,double im) :real(re),img(im){}
 inline static  complex complex::fromPolar(double radius,double angle){

     return complex(radius*cos(angle),radius*sin(angle));

 }
 inline complex complex::operator+(complex rhs)
 {
     return complex(this->real+rhs.real,this->img+rhs.img);

 }
 inline complex complex::operator-(complex rhs)
 {
     return complex(this->real-rhs.real,this->img-rhs.img);

 }
 inline complex complex::operator*(complex rhs)
 {
     return complex(this->real*rhs.real-this->img*rhs.img,this->real*rhs.img+this->img*rhs.real);

 }
 inline complex complex::operator+(double rhs)
 {
     return complex(this->real+rhs,this->img);

 }

 inline complex complex::operator-(double rhs)
 {
     return complex(this->real-rhs,this->img);

 }
 inline complex complex::operator*(double rhs)
 {
     return complex(this->real*rhs,this->img*rhs);

 }
 inline complex complex::operator/(double rhs)
 {
     return complex(this->real/rhs,this->img/rhs);

 }
 inline complex complex::operator/(complex rhs)
 {

     return (*this)*rhs.conjugate()/rhs.norm();


 }

 inline double complex::norm()
 {
 return (this->real*this->real+this->img*this->img);
 }

 inline complex complex::conjugate()
 {

     return complex(this->real,-this->img);
 }


 inline complex operator+(double lhs,complex rhs)
 {
     return rhs+lhs;
 }

 inline complex operator-(double lhs,complex rhs)
 {
     return complex(lhs-rhs.getRe(),rhs.gerIm());

 }
 inline complex operator*(double lhs,complex rhs)
 {
     rhs*lhs;

 }

 inline complex operator/(double lhs,complex rhs)
 {
     return rhs.conjugate()*lhs/rhs.norm();

 }

but is says that

1>c:\users\daviti\documents\visual studio 2010\projects\complex_number\complex_number\complex.h(38): error C2724: 'complex::fromPolar' : 'static' should not be used on member functions defined at file scope

if i remove static keyword,it compiles fine,but i have used this static keyword in class definition,so if i remove it,would not be error?

  • 1
    Please use std::complex<double> from header <complex>. Your division for instance may over/undeflow in some cases. – Alexandre C. Apr 21 '12 at 10:05
  • in which case?for example when divisor is 0? – dato datuashvili Apr 21 '12 at 10:07
  • 1
    When both operands are eg. around 10^200 (or 10^-200), the result is well defined but your method overflows. See eg. mpi-hd.mpg.de/astrophysik/HEA/internal/Numerical_Recipes/… . Similar remarks apply when you compute the modulus (use |x| * sqrt(1 + (y/x)^2) if |x| > |y|, |y| * sqrt(1 + (x/y)^2) else instead of plain sqrt(x^2 + y^2)). As a general rule, don't write complex number classes yourself when there is a perfectly good one in the standard library (works also for matrices). – Alexandre C. Apr 21 '12 at 10:15
  • thanks a lot,but can i use it for FFT?fast fourier transform? – dato datuashvili Apr 21 '12 at 11:52
  • same for FFT, use a library and don't do it yourself. – Alexandre C. Apr 21 '12 at 12:23
up vote 5 down vote accepted

The static only needs to appear in the class definition, and not where you implement the method.

class complex
{
    //......
    static complex fromPolar(double radius,double angle);
    //.....
};

inline complex complex::fromPolar(double radius,double angle){
     return complex(radius*cos(angle),radius*sin(angle));
}

@Luchian has answered the question sufficiently well. I will discuss an alternative for fromPolar.

Probably you already know that you cannot write this:

class complex
{
    //..
    explicit complex(double real, double imaginary);
    explicit complex(double radius, double angle); //same as above
};

The second constructor is basically same as the first one (different names for parameters don't make any difference), so you cannot do this, which is why you came up with fromPolar solution.

But a subtle problem is still there even in fromPolar solution : what is the unit of angle parameter? Is it radian, degree or what?

So I would propose the following class which solves both problems discussed above and you wouldn't need fromPolar function anymore.

class complex
{
    //..
    explicit complex(double real, double imaginary);
    explicit complex(double radius, Angle angle); //now it is different
};

where Angle is another class defined as:

class Angle 
{
  double m_value; //always maintain this in radian

 public:
  Angle(double value, bool isradian = true);

  double radian(){ return m_value; }
  double degree(){ return m_value * 180 / PI; }//or maybe M_PI is the symbol
};

Hope that makes your class a little better.

  • bu i need constructor for Angle yes for each time,i call m_value as a parameter right? – dato datuashvili Apr 21 '12 at 10:32
  • @dato: No, m_value is made private, so you cannot use that. You've to use angle.radian(), or if you need angle in degree (for whatever reason), you can call angle.degree(). – Nawaz Apr 21 '12 at 10:35
  • but i have to declare constructor like Angle(double value):m_value(value){} right yes? – dato datuashvili Apr 21 '12 at 11:08
  • I don't really follow you here: afaict radians being much more common, I guess the easier is just to have one free function polar which returns a complex number from modulus and argument in radians, and let the user add the proper M_PI / 180 factor at the calling site (oh, wait, this is what std::complex does). If you do want to go with the angle solution (I'd use boost::units for this, but still), at least provide an enum, not a flag, so that the meaning of the extra parameter is clear at the calling site. – Alexandre C. Apr 21 '12 at 11:12
  • @dato: Yes. While initializing m_value, you also need to check the value of isradian. – Nawaz Apr 21 '12 at 11:13

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