Hi guys,
I know that if the angle of the roots (ie. argument) adds up to 2pi, then they are conjugates.
For example, if z1=cis(pi/2) and z2=cis(3pi/2) then z2 is a conjugate of z1...
Now, I've noticed that if the angles add upto pi, then the real part of one root and the other root are opposite in signs... What would that be called, and what does it mean?
For example, if z1=cis(pi/4) and z2=cis(3pi/4), then the real part of them are opposite in sign...
Thanks
I know that if the angle of the roots (ie. argument) adds up to 2pi, then they are conjugates.
For example, if z1=cis(pi/2) and z2=cis(3pi/2) then z2 is a conjugate of z1...
Now, I've noticed that if the angles add upto pi, then the real part of one root and the other root are opposite in signs... What would that be called, and what does it mean?
For example, if z1=cis(pi/4) and z2=cis(3pi/4), then the real part of them are opposite in sign...
Thanks