Complex number equation and roots of unity

AI Thread Summary
The discussion revolves around solving a complex number equation, specifically z* = z^3, where z is a complex number. Participants explore the implications of multiplying both sides by z, leading to the realization that |z|^2 equals z^4, indicating that z^4 is a real number. Additionally, there is confusion regarding the primitive 9th root of unity and how to sum the series 1 + 2P + 3P^2 + ... + 9P^8, with a focus on understanding the definition and properties of primitive roots. The conversation highlights the need for clarity in mathematical concepts and the importance of showing effort in problem-solving. Understanding these concepts is crucial for mastering the material before upcoming tests.
math_nuub
Messages
3
Reaction score
0
I have some math problems

What is the solution to this equation :

z dash(complex conjugate) = z^3 Z is complex number

I try to multiply both sides by Z in the left i get Z dash Z => |Z| but i don't see the solution

----

P is primitive 9th root of unity.
Calculate the sum 1 + 2P +3P^2 + ... + 9P^8


---
Thx.
 
Physics news on Phys.org
The easiest approach is using polar notation.
Alternatively, consider the magnitude of z. Notice anything?
And you already got |z|2 = z4, right? What interesting fact does that tell you about the complex number z4?
 
I don't know what is the interesting fact behind Z^4?
 
math_nuub said:
I don't know what is the interesting fact behind Z^4?
It's a complex number, and yet it equals |z|2, so in fact ... ?
 
math_nuub said:
I have some math problems

What is the solution to this equation :

z dash(complex conjugate) = z^3 Z is complex number

I try to multiply both sides by Z in the left i get Z dash Z => |Z| but i don't see the solution
----
P is primitive 9th root of unity.
Calculate the sum 1 + 2P +3P^2 + ... + 9P^8
---
Thx.
Hello math_nuub. Welcome to PF !

According to the rules for Homework Help on this Forum, you need to show some effort before we can help.

What have you tried?

Where are you stuck?
 
I am really trying to understand but my test is approaching and i could.t wrap my head around this material

It's a complex number, and yet it equals |z|2, so in fact ... ?

|Z|^2 is a Real number so you mean that |z|^4 is Real number also?


What have you tried?

Where are you stuck?

I am trying from two days to understand those rots of unity.

I don't understand whiht is the 9th primitive root of unity. I think there are several of them (1,2,4,5,7,8), but how could i sum them, There are in trigonometric form.
 
math_nuub said:
I am really trying to understand but my test is approaching and i could't wrap my head around this material

|Z|^2 is a Real number so you mean that |z|^4 is Real number also?
Of course |z|4 is a real number.

It means that z4 is a real number.
I am trying from two days to understand those rots of unity.

I don't understand what is the 9th primitive root of unity. I think there are several of them (1,2,4,5,7,8), but how could i sum them, There are in trigonometric form.
What is the definition of a "primitive root of unity" ?
 

Similar threads

How to find z^n of a complex number
Replies
12
Views
3K
How Can I Solve a System of Equations With Complex Numbers?
Replies
19
Views
2K
What Is the Smallest Positive Argument for the Sum of Complex Roots of Unity?
Replies
27
Views
4K
Help Checking a Complex Numbers Problems
Replies
7
Views
3K
Using Complex Conjugates to Decompose a Fraction
Replies
8
Views
2K
Complex number multiple choice
Replies
12
Views
2K
Finding Product of Complex Polynomial Roots
Replies
14
Views
2K
How to represent this complex number?
Replies
18
Views
3K
Complex number and its conjugate problem help
Replies
8
Views
2K
A straight line in the complex plane
Replies
4
Views
2K

Hot Threads

Recent Insights

Back
Top