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complex root of unity (1 Viewer)

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pLuvia

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Prove the follwoing, if w is a complex cube root of unity

(a+b)(aw+bw2)(aw2+bw) = a3+b3

(a+wb+w2c)(a+w2b+wc) = a2+b2+c2-ab-ac-bc
 

VivianHsu

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(a+b)(aw+bw2)(aw2+bw) = a3+b3

a3+b3 = (a+b)(a2-ab+b2)
so need to prove (aw+bw2)(aw2+bw) = (a2-ab+b2)
LHS = a2w3 + abw4 + abw2 + b2w3
= a2w3 + abw(w3) + abw2 + b2w3 then on using w3=1,
= a2 + abw + abw2 + b2
= a2 + ab(w + w2) + b2
but w+w2+w3=0 (sum of roots = 0) so w+w2=-1



(a+wb+w^2c)(a+w^2b+wc)
=a^2+abw^2+acw+abw+b^2+bcw^2+acw^2+bcw+c^2
=a^2+b^2+c^2+ab(w+w^2)+ac(w+w2)+bc(w+w^2)
=a^2+b^2+c^2-ab-ac-bc
 

VivianHsu

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kadlil said:
I don't understand this bit :confused:
sum of all complex roots of unity (and of anything actually) = 0
so sum of all complex cube roots of unity = 0
these roots are
1, cos2pi/3+isin2pi/3, cos2pi/3-isin2pi/3

in the special case of roots of unity (1), all of the roots can be expressed as powers of one of the roots with an imaginary part.
for example if w = cos2pi/3+isin2pi/3
then w^2 = cos2pi/3-isin2pi/3
and w^3 = 1

if w = cos2pi/3-isin2pi/3 then w^2 = cos2pi/3+isin2pi/3 (check it if u want)

in this q, w has to be a root with an imaginary part... probably the q isnt very clear
 
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pLuvia

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How about these questions

Solve:

(z+1)4 + 16 = 0
(1-i)z - 2i = 2
(z-1)3 + 8(z+i)3=0

Prove if w3=1

(2+5w+2w2)6 = 729
 

VivianHsu

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(z+1)^4 + 16 = 0
(z+1)^4 = -16
(z+1)^4 = 16 cis(pi+2npi), n integer
(z+1) = 16^(1/4) cis[1/4(pi+2npi)]
= 2 cis[1/4(pi+2npi)]
then put n=0,1,2,3 to get 4 roots in total


(1-i)z - 2i = 2
(1-i)z = 2(1+i)
z=2(1+i)/(1-i)
z=2(1+i)/(1-i) * (1+i)/(1+i)


(z-1)^3 + 8(z+i)^3=0
[(z-1)/(z+i)]^3 = -8 = 8cis(pi/2+2npi)
(z-1)/(z+i) = a, b, c (3 things)
say for a, (z-1)/(z+i) = a
(z-1) = a(z+i) => z(1-a)=ai+1 etc


(2+5w+2w2)6 = 729
2+5w+2w2
= 2w3+5w+2w2
= 2w3 + 2w + 2w2 + 3w
= 2(w3+w+w2)+3w
= 0+3w (sum of roots of unity = 0)
then (2+5w+2w2)6 = (3w)6 = 729w6 = 729(w3)2 = 729(1)^2
 
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pLuvia

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Really? lol, Saturday morning? You have that chinese teacher? the one that always says "is it" at the end of every sentence?
 
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Riviet

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Hehe it's a small world we live in... by the way kadlil, it IS the RYDA thing that i'm going to this friday, have you been to it? (what's ryda stand for anyway?)
 

Shrutzzz

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Help!!!! : Complex Root of unity question

Could anyone please help me solve this Cambride Book qs :(Exercise 2.4) question 4

Use DeMoivre's theorem to solve z^5 =1 by grouping the roots in complex conjugate pairs ,show that

z^5 +1 = (z+1)(z^2-2zcos pi/5 +1 ) (z^2-2zcos 3pi/5 +1 )


Thank youuuuuuuuuuuu

Shrutzzzz
 

Sober

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Shrutzzz said:
Could anyone please help me solve this Cambride Book qs :(Exercise 2.4) question 4

Use DeMoivre's theorem to solve z^5 =1 by grouping the roots in complex conjugate pairs ,show that

z^5 +1 = (z+1)(z^2-2zcos pi/5 +1 ) (z^2-2zcos 3pi/5 +1 )


Thank youuuuuuuuuuuu

Shrutzzzz
You wrote the wrong question, surely it must be z^5 = -1 ?

z = (-1)^(1/5) = cis( (1 + 2k) pi / 5 )

The roots are (underline denotes complex conjugate):

z0 = cis(pi / 5)
z1 = cis(3 pi / 5)
z2 = cis(pi) = -1
z3 = cis(7 pi / 5) = cis(-3pi / 5) = z1
z4 = cis(9 pi / 5) = cis(-pi / 5) = z0

0 = (z-z0)(z-z1)(z-z2)(z-z3)(z-z4)
= (z + 1)(z - z0)(z - z0)(z - z1)(z - z1)
= (z + 1)(z^2 + 1 + 2zcos(pi / 5) )( z^2 + 1 + 2zcos(3 pi / 5) )
 

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