MedVision ad

Complex Cube Root Of Unity (1 Viewer)

ADrew

Member
Joined
Feb 18, 2011
Messages
292
Location
sydney
Gender
Male
HSC
1998
Uni Grad
2004
Hey all :D, can't figure out these two questions, was wondering if some kind person (spiral im looking at you :D) may help ;) :

1) If 1, w, w^2 are the three cube roots of unity, prove that:
(a+b+c)(a+bw+cw^2)(a+bw^2+cw)=a^3+b^3+c^3-3abc

And I know the following isnt a root of unity type question, but anyway:

2) Find x, where 0<=x<=2pi, if (3+2i sinx)/(1-2i sinx) is purely imaginary.

Thankyou for any help in advanced!!
 
Last edited:

IamBread

Member
Joined
Oct 24, 2011
Messages
757
Location
UNSW
Gender
Male
HSC
2011
Haven't done question 1, but here's 2.















Will now attempt the next one.
 
Last edited:

SpiralFlex

Well-Known Member
Joined
Dec 18, 2010
Messages
6,960
Gender
Female
HSC
N/A
What's up duck?! (bugs bunny!) *RAWR!*

Want the solution or a hint? :D
 

ADrew

Member
Joined
Feb 18, 2011
Messages
292
Location
sydney
Gender
Male
HSC
1998
Uni Grad
2004
Thanks IamBread! SpiralFlex, just post whatever you feel. :D
 

ADrew

Member
Joined
Feb 18, 2011
Messages
292
Location
sydney
Gender
Male
HSC
1998
Uni Grad
2004
Thanks so much! Appreciate your response :D
BTW rep to both of you
 
Last edited:

SpiralFlex

Well-Known Member
Joined
Dec 18, 2010
Messages
6,960
Gender
Female
HSC
N/A
I'm going to sleep now, hopefully i'll get some study done once I wake up and not play games. :(

Be back at 6.


To infinity and beyond!

Swoosh!
 
Last edited:

RealiseNothing

what is that?It is Cowpea
Joined
Jul 10, 2011
Messages
4,591
Location
Sydney
Gender
Male
HSC
2013
Alternatively:

The 3 roots are equally spaced around the unit circle (any complex circle for that matter).

So the first root = 1, second root (w) = cis120 , and third root (w^2) = cis240

Working out each root and putting it into a+bi form:

cis120 = -1/2 + (rt3)i/2 = w

cis240 = -1/2 - (rt3)i/2 = w^2

Substitute these values into the original equation. Solve the last two brackets first as they are more complicated.

We can actually do a little tampering with the signs of the roots, so that w = w^2. The imaginary part of w is actually the co-efficient of (b-c) and the imaginary part of w^2 is the co-efficient of (c-b). So by taking out a negative from (c-b), we get the negative of the imaginary part of w^2 as the co-efficient of (b-c). But the negative of the imaginary part of w^2 is w. So now w=w^2.

This leaves you with the two last brackets as just a difference of two squares. When you solve this it simplifies to a^2 + b^2 + c^2 - ab - ac - bc. All you need to do now is multiply this with the very first bracket (a+b+c) which gives the answer of:

a^3 + b^3 + c^3 - 3abc.

QED.

This method cancels out all the 'i' from the equation when you use the difference of two squares as they just become -1, leaving you with only a, b, and c to work with. More of an algebraic approach.
 

ADrew

Member
Joined
Feb 18, 2011
Messages
292
Location
sydney
Gender
Male
HSC
1998
Uni Grad
2004
Just one more thing, but why does w^4=w ? I realise this may be obvious, but I cant see it?
Also, thanks for the response RealiseNothing :)
 
Last edited:

RealiseNothing

what is that?It is Cowpea
Joined
Jul 10, 2011
Messages
4,591
Location
Sydney
Gender
Male
HSC
2013
Just one more thing, but why does w^4=w ? I realise this may be obvious, but I cant see it?
The roots of a complex number can be graphed around a circle on the argand diagram right? And you know how they are equally spaced around it?

Well when you get to the last root (in this case w^2), you go back to the beginning where your first root is, so w^3=1.

Then you repeat the cycle, so w^4=w, w^5=w^2, and so on.
 

ADrew

Member
Joined
Feb 18, 2011
Messages
292
Location
sydney
Gender
Male
HSC
1998
Uni Grad
2004
Lolz, basic algebra escaped my mind for a moment there (facepalm) Anyway thanks again :D
 

Users Who Are Viewing This Thread (Users: 0, Guests: 1)

Top