e^iθ = cosθ + i sinθ
so,
(1-i)e^iθ = cosθ + i sinθ - i cosθ - i^2 sinθ = (sinθ+cosθ) + (sinθ-cosθ) i
Im[(1 − i)e^iθ]. Your answer should include the term θ.
2 answers
or, since 1-i = √2 e^(i π/4), you have
(1-i)e^iθ = √2 e^(i π/4) e^iθ = √2 e^(θ+π/4)i
(1-i)e^iθ = √2 e^(i π/4) e^iθ = √2 e^(θ+π/4)i
21 answers