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I am currently writing a small tool which should help me check whether my manually calculated fourier vectors are correct. Now i need the n-th Root of Unity specified by omega = exp(2*pi*i / n). Can somebody explain me how to represent this omega as a complex in C++?

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3 Answers 3

up vote 4 down vote accepted

Use Euler's formula:

exp(2πi/n) = cos(2π/n) + i sin(2π/n)

Then it's easy:

complex<double> rootOfUnity(cos(TWOPI/n), sin(TWOPI/n));

(replace TWOPI with either a macro available on your system or just the value of 2π however you see fit).

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Any specific suggestion how to compute pi? Would 4*atan(1.0) suffice? –  Christian Ivicevic Sep 15 '11 at 21:24
You can either hard-code it, or just use M_PI. –  Mysticial Sep 15 '11 at 21:25
Using Visual Studio 2010 on Windows 8 with Microsofts C++ Compiler. Including cmath.h does not provide M_PI! –  Christian Ivicevic Sep 15 '11 at 21:26
@Christian: yes, using 4.0*atan(1.0) will work fine. Or you can just use double TWOPI = 6.283185307179586476925286766559. –  Stephen Canon Sep 15 '11 at 21:29
@Christian: I didn't realize that! :) Because I always define my own Pi macro hard-coded to 50 some digits... lol –  Mysticial Sep 15 '11 at 21:31

Well, the real and imaginary parts of the twiddle factor omega is just:

double angle = 2*pi/n;

double real = cos(angle);
double imaj = sin(angle);

complex<double> omega(real, imaj);
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There is a function that returns a complex number using polar coordinates:

complex polar(const T& rho)
complex polar(const T& rho, const T& theta)

where rho is the magnitude, and theta is the angle in radians.

In this case, rho is always 1.0.

const double pi = 3.141592653589793238462643383279;
double omega = polar(1.0, 2*pi*i/n);
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