Complex No's Question (1 Viewer)

shaon0 · Aug 2, 2009

Q5:
bi) Show that the roots of z^10=1 are given by:
z=cis(r*pi/5), r=1,2,3,...,9
DONE

ii) Explain why the equation ((z-1)/z)^10=1. Only has nine roots. Show that the roots of ((z-1)/z)^10=1 are given by z=(0.5)(1+icot(r*pi/5)), r=1,2,...,9

I can't show that the roots are given by z=(0.5)(1+icot(r*pi/5)), r=1,2,...,9.
Any help would be appreciated.

Drongoski · Aug 2, 2009

Why only 9 roots

$\100dpi \left ( \frac{z-1}{z} \right )^{10}\ =\ 1\ \ \Rightarrow\ \ (z-1)^{10}\ =\ z^{10}\ \ \Rightarrow -10z^{9}+45z^{8}+\cdots \ +1\ =\ 0\\ \\ i.e. \ \ a\ polynomial\ eqn\ of\ degree \ 9\ \Rightarrow \ 9\ roots$

untouchablecuz · Aug 2, 2009

shaon0 said:
Q5:
bi) Show that the roots of z^10=1 are given by:
z=cis(r*pi/5), r=1,2,3,...,9
DONE

ii) Explain why the equation ((z-1)/z)^10=1. Only has nine roots. Show that the roots of ((z-1)/z)^10=1 are given by z=(0.5)(1+icot(r*pi/5)), r=1,2,...,9

I can't show that the roots are given by z=(0.5)(1+icot(r*pi/5)), r=1,2,...,9.
Any help would be appreciated.

here you go

untouchablecuz · Aug 2, 2009

for k = 2m = 2, 4, 6, 8, ..., 18

therefore

z = (0.5)(1+cot(kpi/5)), k = m = 1, 2, 3, ..., 9

shaon0 · Aug 2, 2009

Thanks untouchablecuz and 3unitz.

Complex No's Question (1 Viewer)

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