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Vectors.. (1 Viewer)
- Thread starter Just.Snaz
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arg [(z1+z2)/(z1-z2)] = arg (z1+z2) - arg(z1-z2)
From your rhombus, you know the diagonal meet at right angles, so just translate vector AB to the origin and prove that the difference of their arguments is 90 degrees.
From your rhombus, you know the diagonal meet at right angles, so just translate vector AB to the origin and prove that the difference of their arguments is 90 degrees.
On the diagram draw a line parallel to the line z1 - z2, with what was z1 at the origin (so the line is going into the second quadrant - althouhg you are gonna have to expand your x axis so you have a second quadrant).
The you just have to prove that the angle between the new line you have drawn and z1 + z2 is pi/2, which is easy, as the new line youve drawn is parallel to z1 - z2
The you just have to prove that the angle between the new line you have drawn and z1 + z2 is pi/2, which is easy, as the new line youve drawn is parallel to z1 - z2
Complex no.s as vectors can be represented in the form rcis(theta) wher r is the length and theta is the angle they make with the positive x axis. You can shift vectors around the complex plane AS long as u dont change the direction or magnitude.Just.Snaz said:
I will use z and w for z1 and z2 and z' w' to denote their conjugates
(z+w)/(z-w)
= (z+w)(z'-w') / |z-w|^2
= (|z|^2 - |w|^2 - zw' + wz') / |z-w|^2
----since |z| = |w|-----
= (wz' - zw')/|z-w|^2
= [wz' - (wz')']/|z-w|^2
which must be pure imaginary because it's the difference between a number and it's conjugate
(z+w)/(z-w)
= (z+w)(z'-w') / |z-w|^2
= (|z|^2 - |w|^2 - zw' + wz') / |z-w|^2
----since |z| = |w|-----
= (wz' - zw')/|z-w|^2
= [wz' - (wz')']/|z-w|^2
which must be pure imaginary because it's the difference between a number and it's conjugate