nichorowitz
Member
- Joined
- Sep 24, 2010
- Messages
- 67
- Gender
- Male
- HSC
- 2011
The question is describe the locus of Im (z+1/z) = 0
i.e.
http://www4c.wolframalpha.com/Calcu...bhh358f?MSPStoreType=image/gif&s=33&w=94&h=36
Now, the obvious method is to let z + x+iy and after a couple of lines of working you arrive at the answer
y(x^2 + y^2 - 1) = 0
http://www4c.wolframalpha.com/Calcu...a974ee?MSPStoreType=image/gif&s=37&w=120&h=22
Giving you the graph of the unit circle centred at the origin.
and the line y=0
simple right?
I then thought about this question in a different manner and thought about using the result
z+1/z = 2cos(Ɵ)
Proof goes like this:
let z = rcisƟ
and then by De Moivre's Theorem
z + 1/z = z + z^-1
= cisƟ + cis(-Ɵ)
= cosƟ + isinƟ + cosƟ - isinƟ
= 2cosƟ
therefore Im(z + 1/z) = 0
now in regards to question I apparently am supposed to describe the locus of the equation 0 = 0?
even wolfram alpha gives the odd locus.
http://www.wolframalpha.com/input/?i=Im(z+1/z)+=+0
Just upon typing this i figured out what was wrong with my working. Still gonna post anyway to see if you guys can figure it out as well.
Have fun.
i.e.
http://www4c.wolframalpha.com/Calcu...bhh358f?MSPStoreType=image/gif&s=33&w=94&h=36
Now, the obvious method is to let z + x+iy and after a couple of lines of working you arrive at the answer
y(x^2 + y^2 - 1) = 0
http://www4c.wolframalpha.com/Calcu...a974ee?MSPStoreType=image/gif&s=37&w=120&h=22
Giving you the graph of the unit circle centred at the origin.
and the line y=0
simple right?
I then thought about this question in a different manner and thought about using the result
z+1/z = 2cos(Ɵ)
Proof goes like this:
let z = rcisƟ
and then by De Moivre's Theorem
z + 1/z = z + z^-1
= cisƟ + cis(-Ɵ)
= cosƟ + isinƟ + cosƟ - isinƟ
= 2cosƟ
therefore Im(z + 1/z) = 0
now in regards to question I apparently am supposed to describe the locus of the equation 0 = 0?
even wolfram alpha gives the odd locus.
http://www.wolframalpha.com/input/?i=Im(z+1/z)+=+0
Just upon typing this i figured out what was wrong with my working. Still gonna post anyway to see if you guys can figure it out as well.
Have fun.