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Complex (1 Viewer)

azureus88

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Given z^7 = 1 where z is not=1, deduce that z^3 + z^2 + z + 1 + 1/z + 1/z^2 + 1/z^3 = 0.

How would you set out this question without assuming z is the complex root with smallest argument (cause it only says z is not=1)? Im a bit rusty on this topic so any help would be nice?

thanks in advance
 

Trebla

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Given z^7 = 1 where z is not=1, deduce that z^3 + z^2 + z + 1 + 1/z + 1/z^2 + 1/z^3 = 0.

How would you set out this question without assuming z is the complex root with smallest argument (cause it only says z is not=1)? Im a bit rusty on this topic so any help would be nice?

thanks in advance
z7 - 1 = 0
(z - 1)(z6 + z5 + z4 + z3 + z2 + z + 1) = 0
Since z =/= 1, then
z6 + z5 + z4 + z3 + z2 + z + 1 = 0
Divide both sides by z3 (and obviously z =/= 0) gives:
z3 + z2 + z + 1 + 1/z + 1/z2 + 1/z3 = 0
 

azureus88

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if they ask a question lik "show that if @ is one of the complex roots of..., then @^2, @^3, @^4... are the other complex roots"

can you just let @ be the root with smallest argument and go from there. or do you have to consider other cases?
 

tommykins

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w (omega) is the root with the smallest argument.
 

BeDifferent

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Hey doing similar question but there is an extension to this question, let x=z+1/z
....
blah blah

i got something like x^3+x^2-2x-1=0

and then the last part is

hence deduce
cos pi/7*cos2pi/7*cos3pi/7=1/8

:) help please
 

azureus88

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ok i'll start from the part where you got your roots of unity as 1, cis(2pi/7), cis(-2pi/7), cis(4pi/7), cis(-4pi/7), cis(6pi/7), cis(-6pi/7).

let w=cis(2pi/7)

(w + w^(-1))(w^2 + w^(-2))(w^3 + w^(-3)) = (2cos(2pi/7))(2cos(4pi/7))(2cos(6pi/7))

by expanding you get

1+(1+w+w^2+w^3+w^4+w^5+w^6)=(2cos(2pi/7))(-2cos(3pi/7))(-2cos(pi/7))

but (1+w+w^2+w^3+w^4+w^5+w^6)=0 by sum of roots of w^7 - 1=0

(cospi/7)(cos2pi/7)(cos3pi/7)=1/8
 

Trebla

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if they ask a question lik "show that if @ is one of the complex roots of..., then @^2, @^3, @^4... are the other complex roots"

can you just let @ be the root with smallest argument and go from there. or do you have to consider other cases?
You have to take @ as a general root, not specifically the one with the smallest argument. Generally you wouldn't have to worry if it was the smallest argument or not, because there are ways without considering the argument at all.
 

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