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Complex numbers (1 Viewer)
- Thread starter Teoh
- Start date
Ragerunner
Your friendly HSC guide
Modulus = 1
Argument = 0
1 = 1e^2kipi
r^5 = 1
5@ = 2kpi
@ = 2kpi/5
k = -2,-1,0,1,2
Just substitute the k values into 2kpi/5
e.g. for k = -2
@ = -4pi/5
Then in polar form is e^-4pi/5
And do it for the rest of the values of k.
Argument = 0
1 = 1e^2kipi
r^5 = 1
5@ = 2kpi
@ = 2kpi/5
k = -2,-1,0,1,2
Just substitute the k values into 2kpi/5
e.g. for k = -2
@ = -4pi/5
Then in polar form is e^-4pi/5
And do it for the rest of the values of k.
Last edited:
If you're wondering what e^ix means,
e^ix = cosx + isinx = cisx
(don't worry why this is true, it isn't in the HSC syllabus)
Some people (particularly uni lecturers) prefer writing e^ix instead of cisx.
show that z^n+ 1/z^n= 2cos(n)
To show that, use De Moivre's theorem, bearing in mind that 1/z^n = z^-n.
e^ix = cosx + isinx = cisx
(don't worry why this is true, it isn't in the HSC syllabus)
Some people (particularly uni lecturers) prefer writing e^ix instead of cisx.
There's probably a misprint, it should be:
show that z^n+ 1/z^n= 2cos(n)
To show that, use De Moivre's theorem, bearing in mind that 1/z^n = z^-n.
Last edited:
Ragerunner
Your friendly HSC guide
Yes it is.
KeypadSDM
B4nn3d
Please, please use brackets.