MedVision ad

Polynomials (1 Viewer)

Lukybear

Active Member
Joined
May 6, 2008
Messages
1,466
Gender
Male
HSC
2010
If w is a compelx cube root of 1, form a cubic with root (a+b)^-1, (aw+b)^-1, (aw^2 + b)^-1
 

pwoh

O_O
Joined
Jun 28, 2008
Messages
709
Location
Behind you
Gender
Female
HSC
2010
Uni Grad
2016
a and b are just arbitrary constants right?

Btw I have no idea, I hope someone answers this..
 

Trebla

Administrator
Administrator
Joined
Feb 16, 2005
Messages
8,391
Gender
Male
HSC
2006
If w is a compelx cube root of 1, form a cubic with root (a+b)^-1, (aw+b)^-1, (aw^2 + b)^-1
If w is a complex root of a cubic polynomial of unity (x3 - 1 = 0) then so is 1 and w2 i.e. the polynomial has roots 1, w and w2. It might make it easier to picture by calling them α, β and γ which means you want an equation with roots (aα + b)-1, (aβ + b)-1 and (aγ + b)-1 which is now a standard problem of forming polynomial equations.

Let y = (ax + b)-1, make x the subject and sub it into the polynomial equation.
 

Lukybear

Active Member
Joined
May 6, 2008
Messages
1,466
Gender
Male
HSC
2010
What about this: Find the conditions for the roots of the cubic equation ax^3 + bx^2 +cx + d = 0 to be in geometric sequence
 

Lukybear

Active Member
Joined
May 6, 2008
Messages
1,466
Gender
Male
HSC
2010
And also prove that

if w is a root of P(z) = z^8-5/2z^4+1
then 1/w is also a root

Also find one of the roots of P(z)=0 in exact form
 
Last edited:
Joined
Dec 20, 2008
Messages
207
Gender
Male
HSC
2010
sub in w and then sub in 1/w. For the 1/w equation times the whole thing by w^8 then ull get the same equation.
 
Last edited:

shaon0

...
Joined
Mar 26, 2008
Messages
2,029
Location
Guess
Gender
Male
HSC
2009
And also prove that

if w is a root of P(z) = z^8-5/2z^4+1
then 1/w is also a root

Also find one of the roots of P(z)=0 in exact form
P(z)=(z^4-5/4)^2-(3/4)^2
=(z^4-2)(z^4-1/2)

For roots to be in GS:
Let roots be; A/r,A,Ar.
And you'll get A=cbrt(-d/a) [Using sum of roots]
If this is not enough;
r+r^-1=b^3/(a^2.d)-1 [Using prod and sum of roots]
And; A=sqrt((adc/(b^3-a^2.d)))
And; A=-b/c [Using sum of roots twice and sum of roots]
This question seems pretty vague but the conditions above (if they're correct) are probs enough unless they're asking for a Geometric argument.
 
Last edited:

nrlwinner

Member
Joined
Apr 18, 2009
Messages
194
Gender
Male
HSC
2010
What about this: Find the conditions for the roots of the cubic equation ax^3 + bx^2 +cx + d = 0 to be in geometric sequence


Let roots be

Using product of roots...





Subbing it back into the equation, as a is a root







Then cubing








Hopefully that's right.
 

MOP777

New Member
Joined
Mar 31, 2009
Messages
20
Gender
Male
HSC
2010
And also prove that

if w is a root of P(z) = z^8-5/2z^4+1
then 1/w is also a root

Also find one of the roots of P(z)=0 in exact form
Isn't it quicker for this equation to prove 1/w = conjugate(w)
Then use the fact that a poly with real coefficients has roots occuring in conjugate pairs?
 

Affinity

Active Member
Joined
Jun 9, 2003
Messages
2,062
Location
Oslo
Gender
Undisclosed
HSC
2003
Isn't it quicker for this equation to prove 1/w = conjugate(w)
Then use the fact that a poly with real coefficients has roots occuring in conjugate pairs?
The only problem is that 1/w = conjugate(w) only when |w| = 1.

So that doesn't work

sub in w and then sub in 1/w. For the 1/w equation times the whole thing by w^8 then ull get the same equation.
Minor detail: since (w =/= 0)
 
Last edited:

shaon0

...
Joined
Mar 26, 2008
Messages
2,029
Location
Guess
Gender
Male
HSC
2009
For this one, what do we do from here?

sorry for idiocy.
Well, confirming 1/w is easy.
P(x)=(z^4-2)(z^4-1/2)
=(z^2-sqrt(2))(z^2+sqrt(2))(z^2-1/sqrt(2))(z^2+1/sqrt(2))
From here roots are:
z=+-2^(1/4),+-2^(-1/4),+-i.2^(1/4),+-i.2^(-1/4).
 

Lukybear

Active Member
Joined
May 6, 2008
Messages
1,466
Gender
Male
HSC
2010
Sorry shaon0, could you just expand on how to confirm 1/w. Im thinking to do that question w^8 =1. But w is not a root of unity, but a root of p(z).

nd thxs for the roots bit. Ive got that.
 

shaon0

...
Joined
Mar 26, 2008
Messages
2,029
Location
Guess
Gender
Male
HSC
2009
Sorry shaon0, could you just expand on how to confirm 1/w. Im thinking to do that question w^8 =1. But w is not a root of unity, but a root of p(z).

nd thxs for the roots bit. Ive got that.
Well, you've found complex roots;
Say, w=+-i(2)^(1/4), 1/w=1/(+-i.2^(1/4))=-+i.2^(-1/4) (as listed)
Try prod. of roots and sum.
 
Last edited:

Lukybear

Active Member
Joined
May 6, 2008
Messages
1,466
Gender
Male
HSC
2010
Sorry still no clue.

Testing 1/w was a root was part a of the question. So...
 

MetroMattums

Member
Joined
Apr 29, 2009
Messages
233
Gender
Male
HSC
2010
Sub 1/w in the equation, then take (1/w)^8 out of it, then you get the original equation, which is equal to 0. Hence, 1/w is a root.





For the first first first post, let x be a root of x^3 - 1 = 0 then let the roots of the new equation have a general form y = 1/(ax+b). Then, get those roots in terms of x then sub it into x^3 - 1 = 0. You should get the equation.
 
Last edited:

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

Top