I am currently writing a small tool which should help me check whether my manually calculated fourier vectors are correct. Now i need the nth 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++?



Use Euler's formula:
Then it's easy:
(replace TWOPI with either a macro available on your system or just the value of 2π however you see fit). 


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



There is a function that returns a complex number using polar coordinates:
where In this case,


