Solving Complex Exponentials: Deduce & Explain Relation w/ Vector Diagram

  • Thread starter Thread starter kevi555
  • Start date Start date
  • Tags Tags
    Complex
Join the discussion
Ask a follow-up here, or get your own question answered by working scientists, mathematicians and engineers — people, not an autocomplete.
Real named experts · corrections over time · the nuance an AI answer skips
6 replies · 4K views
kevi555
Messages
14
Reaction score
0
Hi,

If [tex]z=Ae^{i\theta}[/tex], deduce that [tex]dz = iz d\theta[/tex], and explain the relation in a vector diagram.

I know that [tex]z = x + iy[/tex] but I don't know if that's going to help. Any hints or tips would be appreciated! Thanks!
 
on Phys.org
The derivative of z:

dz=i*A*e^(i*Θ)*dΘ

You have to ask yourself what are i,j: are they directions (r=xi+yj) or are they complex numbers ( x=a+i*b y=c+j*d).


Secondly, graphing on a polar plot one direction is for the real (x-axis) and the other for the imaginary (y-axis).
 
Last edited:
Please note, I made an error in my first post...it is now correct.
 
This may help:

z=A*cosΘ+i*A*sinΘ
 
Alright, I can picture the [tex]Acos\theta[/tex] and [tex]Asin\theta[/tex] on the horizontal and vertical axes, respectively. I don't understand how the z is still in the derivative equation?
 
Last edited:
dz is the change in z. i in a vector diagram is equal to 90deg, right. So when you take the derivative of a vector you shift 90deg.
 
kevi555 said:
Alright, I can picture the [tex]Acos\theta[/tex] and [tex]Asin\theta[/tex] on the horizontal and vertical axes, respectively. I don't understand how the z is still in the derivative equation?

Philosophaie gave you a big hint. Look at the equation in his first post real carefully. What is "z" equal to? You already told us. =)