Answer to Question #116824 in Complex Analysis for desmond

Question #116824

Use De Moivre’s theorem to simplify the following
(a) (cos π/5+i sin π/5)10, (b) (cos π/9+i sin π/9)−3, (c) {cos(−π/6) + i sin(−π/6)}−4

Expert's answer

Use De Moivre’s theorem: "(\\cos x+i \\sin x)^n=\\cos(nx )+i \\sin(nx)"

(a) "(\\cos \\pi\/5+i \\sin \\pi\/5)^{10}=\\cos(10\\times \\pi\/5 )+i \\sin(10\\times \\pi\/5)=\\cos (2\\pi)+i \\sin(2\\pi)=1"

(b) "(\\cos \\pi\/9+i \\sin \\pi\/9)^{-3}=\\cos(-3\\times \\pi\/9 )+i \\sin(-3\\times \\pi\/9)=\\cos (-\\pi\/3)+i \\sin(-\\pi\/3)=\\frac{1}{2}-i \\frac{\\sqrt 3}{2}"

(c) "(\\cos (-\\pi\/6)+i \\sin (-\\pi\/6))^{-4}=\\cos(-4\\times (-\\pi\/6) )+i \\sin(-4\\times (-\\pi\/6))=\\cos (2\\pi\/3)+i \\sin(2\\pi\/3)=-\\frac{1}{2}+i \\frac{\\sqrt 3}{2}"

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Answer to Question #116824 in Complex Analysis for desmond

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