• Congratulations to the Class of 2024 on your results!
    Let us know how you went here
    Got a question about your uni preferences? Ask us here

Question (1 Viewer)

ProGT408

New Member
Joined
Jan 9, 2024
Messages
9
Gender
Male
HSC
2024
a) fully factorise z^6-1=0 over the rational field
b) solve z^2+z^4+z^6 over the complex field

how do you use part a to do part b?
 

synthesisFR

afterhscivemostlybeentrollingdonttakeitsrsly
Joined
Oct 28, 2022
Messages
3,312
Location
Getting deported
Gender
Female
HSC
2028
a) fully factorise z^6-1=0 over the rational field
b) solve z^2+z^4+z^6 over the complex field

how do you use part a to do part b?
Cuz for Part a u do (z^2)^3 - 1 = 0
Then use the difference of two cubes formula thing ye
For part b factorise z^2 out to get 1 + z^2 + z^4 which is in the bracket of the part a one mad ting innit
Then use the solutions from a to get the ones in part two by doing normal roots of unit minus the solution z=1 cus that’s the other bracket cuh
Then u basically get the rest of the solutions fam
Free the mandem while your at it
 

liamkk112

Well-Known Member
Joined
Mar 26, 2022
Messages
1,059
Gender
Female
HSC
2023
a) fully factorise z^6-1=0 over the rational field
b) solve z^2+z^4+z^6 over the complex field

how do you use part a to do part b?
for a) z^6-1 = 0 -> (z^3-1)(z^3+1)=0 -> (z-1)(z^2+z+1)(z+1)(z^2-z+1)=0 using difference of squares, now z^2+z+1 and z^2-z+1 have complex roots so we do not factorise any further
then for b) using a) to expand some brackets: (z-1)(z+1)(z^4+z^2+1)=0
hence the solutions to z^4+z^2+1 = 0 are the complex 6ths roots of units, namely those with modulus 1 and argument pi/3, 2pi/3, -pi/3, and -2pi/3 (since z = -1, z = 1 are the solutions to z-1 = 0, z+1 = 0, meaning z^4+z^2+1 must have the other solutions to z^6 = 1)

now z^2+z^4+z^6 = z^2 (z^4 + z^2 +1) hence the solutions are z = 0 and the complex 6th roots of unity above
 

ivanradoszyce

Member
Joined
Oct 18, 2023
Messages
43
Gender
Undisclosed
HSC
2018
For part a), write
as

a difference of 2 cubes.

Recall that , therefore

The roots where are .

b) Consider

as

In this case we need to find the 6th roots of unity. So let , there for .



Therefore



For the Principle Argument of




Therefore , which means

The values of and , represent the values of and

The values of are the solutions to


Let's now consider



Using the results from part (a)

 

Luukas.2

Well-Known Member
Joined
Sep 21, 2023
Messages
443
Gender
Male
HSC
2023
Recognising the GP in the second polynomial allows the link between the two parts to be seen more easily:


Henxe, the roots of are the six roots of , with the two roots of , that is, at , removed, and a double root at
 

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

Top