CLarification need please for complex numbers (1 Viewer)

HeroicPandas · Aug 17, 2012

for this question

If α is a complex root of z⁷-1=0, show that:

a) α³ is also a complex root and hence state all the complex roots of z⁷-1=0 in terms of α. (answer = α, α², α³,α⁴,α⁵,α⁶)

b) The quadratic equation whose roots are α+α²+α⁴ and α³+α⁵+α⁶ is z²+z+2=0

for part a)
can i write: if α is a complex number α must satisfy z^7-1=0

hence, therefore

α^7-1=0
factorise
(α-1)(1+α+α^2+...+α^6)=0

if α is a root of z^7-1=0, therefore a^2, a^3, a^4, a^5, a^6 are also roots. AS REQUIRED

α is a complex, therefore a cannot eual to 1

can i write this in the hsc?

math man · Aug 17, 2012

no that doesnt prove those are the other roots, it only proves their sum is 0.

D94 · Aug 17, 2012

What you have shown isn't greatly relevant to the first part.

You need to find the roots not by factorising, but by solving z⁷-1=0. Then you will see that your first solution will be z = 1, then your next solution is z = a, and then z = a² and so on until z = a⁶, which are your required roots.

HeroicPandas · Aug 17, 2012

dam then i gotta to that way...i was trying to find out a different method

D94 · Aug 17, 2012

HeroicPandas said:
dam then i gotta to that way...i was trying to find out a different method

The generally preferred method is rather quick though. With practice, and of course understanding what you're doing, it will become second nature to quickly solve the roots of unity.

HeroicPandas · Aug 17, 2012

D94 said:
The generally preferred method is rather quick though. With practice, and of course understanding what you're doing, it will become second nature to quickly solve the roots of unity.

aight cool thanks

asianese · Aug 17, 2012

Do we need to go into details like this?

$(1)^7-1=0 \therefore z=1 $ is a root. $.\\$Let $ z=cis\theta \\ z^7=r^7cis7\theta=cis2\pi k, $ k integral $\\ 7\theta=2\pik \Rightarrow \theta = \frac{2\pi k}{7} \\ \therefore cis\theta = cis\frac{2\pi}{7}, cis\frac{4\pi}{7}, cis\frac{6\pi}{7}, cis\frac{8\pi}{7}, cis\frac{10\pi}{7}, cis\frac{12\pi}{7}.\\ $But by de Moivre's theorem, $ \alpha=cis\frac{2\pi}{7} \Rightarrow \alpha^2=cis{4\pi}{7} $ etc. So clearly the roots of $ z^7-1=0 $ are 1, \alpha, \alpha^2...\alpha^6$

Carrotsticks · Aug 18, 2012

Looks good.

But I would probably specify:

$cis \theta_i $ where $ 1 \leq i \leq 7$

You also left out the trivial solution. I know the Q just wants complex solutions, but you omitted it without explanation.

karnbmx · Aug 18, 2012

Carrotsticks said:
Looks good.

But I would probably specify:

$cis \theta_i $ where $ 1 \leq i \leq 7$

You also left out the trivial solution. I know the Q just wants complex solutions, but you omitted it without explanation.

How can $i$ have multiple values?

I think what you meant to say was 1 <= n < 7 =)

Carrotsticks · Aug 18, 2012

karnbmx said:
How can $i$ have multiple values?

I think what you meant to say was 1 <= n < 7 =)

Because there are 7 solutions, by the Fundamental Theorem of Algebra, so there are 7 solutions.

ie: 7 values of theta.

RealiseNothing · Aug 18, 2012

karnbmx said:
How can $i$ have multiple values?

I think what you meant to say was 1 <= n < 7 =)

Subscript 'i', not imaginary unit 'i'.

CLarification need please for complex numbers (1 Viewer)

HeroicPandas

Heroic!

math man

Member

D94

New Member

HeroicPandas

Heroic!

D94

New Member

HeroicPandas

Heroic!

asianese

Σ

Carrotsticks

Retired

karnbmx

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Carrotsticks

Retired

RealiseNothing

what is that?It is Cowpea

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