Complex help (1 Viewer)

fullonoob

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i) find the five fifth roots of unity
ii) if w = cis 2pi/5, show that 1+w+w^2+w^3+w^4 = 0
iii) show that z1 = w +w^4 and z2 = w2+w3 are the roots of the equation z^2+z-1 = 0

Just help with ii) and iii) please
ii) is just sum of roots = 0 but i dont really get that still :hammer:
 

fullonoob

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the polynomial is w^5 - 1=0

then factorising that, you get (w-1)(1+w+w^2+w^3+w^4)=0

since w is not 1, but w is a root, the 1+w+w^2+w^3+w^4 must equal zero.
Yeah i kinda got that but how do you do iii)
 

Trebla

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i) find the five fifth roots of unity
ii) if w = cis 2pi/5, show that 1+w+w^2+w^3+w^4 = 0
iii) show that z1 = w +w^4 and z2 = w2+w3 are the roots of the equation z^2+z-1 = 0

Just help with ii) and iii) please
ii) is just sum of roots = 0 but i dont really get that still :hammer:
If roots are z1 and z2 then
Sum of roots:
z1 + z2 = w + w4 + w2 + w3
= w + w2 + w3 + w4
= - 1 (using the result in ii))

Product of roots:
z1z2 = (w + w4)(w2 + w3)
= w3 + w4 + w6 + w7
= w3 + w4 + w(w5) + w2(w5)
= w + w2 + w3 + w4
(since w5 = 1 as w satisfies a fifth root of unity)
= - 1 (using the result in ii))

We now have:
z1 + z2 = - 1
z1z2 = - 1

We can now deduce the quadratic equation using relationships between roots and coefficients:
z2 + z - 1 = 0
 
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