Complex numbers question: (1 Viewer)

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a) Find the least positive integer k such that cos(4pi/9) + isin(4pi/9) is a solution of z^k =1

b) Show that if the complex number w is a solution of z^n =1, then so is w^m, where m and n are arbitrary integers.
 

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a) Find the least positive integer k such that cos(4pi/9) + isin(4pi/9) is a solution of z^k =1

b) Show that if the complex number w is a solution of z^n =1, then so is w^m, where m and n are arbitrary integers.
(cos 4π/9 + i sin 4π/9)k = (cos 4πk/9 + i sin 4πk/9) by DeMoivre's Theorem
For this to equal 1, we would like 4πk/9 = 4π
(for positive integer k and to find the least value of k, note that the choices 0 and 2π are valid but do not yield positive integers of k)
=> k = 9

b) zn = 1
Exponentiate both sides to power of some integer m
(zn)m = 1m
=> zmn = 1 (note the solution set has not changed)
Since z = w satisfies this equation then
wmn = 1
=> (wm)n = 1
This means that z = wm satisifies zn = 1
 

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