z = x + iy = |z| (\cos \phi + i\sin \phi ) = r e^{i \phi} \ \bar{z} = x - iy = |z| (\cos \phi - i\sin \phi ) = r e^{-i \phi} \
where
x = \mathrm{Re}\{z\} \, the real party = \mathrm{Im}\{z\} \, the imaginary partr = |z| = \sqrt{x^2+y^2} the magnitude of z\phi = \arg z = \, atan2(y, x)
It's that simple.
where
x = \mathrm{Re}\{z\} \, the real party = \mathrm{Im}\{z\} \, the imaginary partr = |z| = \sqrt{x^2+y^2} the magnitude of z\phi = \arg z = \, atan2(y, x)
It's that simple.
That shit is bout all greek to me.
I aint doin puzzles.
My life is hard enough.
I got a 15 year old intellectual when I need a mind-fuck thank you very much.
Just give me the damn address Lucy.
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