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Complex Help (1 Viewer)
- Thread starter Lukybear
- Start date
Change (z-1+i)/(z+1-i)=ki to (z-(1-i))/(z-(1+i))=ki --> (z-(1-i))=ki*(z-(1+i)) --> rotation by 90 degrees since k is real.
This means the angle between vectors (z-(1-i)) and (z-(-1+i)) is 90 degrees since k is real
This is same as sketching Arg[(z-1+i)/(z+1-i)]=pi/2 or -pi where the points 1-i and -1+i are included
Plotting the locus of z on Argand diagram we get the diagram below
In other words, z is a point on the circle centred at the origin, with the diameter being the line joining 1-i and -1+i.
k will only change the position of z on the circle but |z| should be sqrt(2)
This means the angle between vectors (z-(1-i)) and (z-(-1+i)) is 90 degrees since k is real
This is same as sketching Arg[(z-1+i)/(z+1-i)]=pi/2 or -pi where the points 1-i and -1+i are included
Plotting the locus of z on Argand diagram we get the diagram below
In other words, z is a point on the circle centred at the origin, with the diameter being the line joining 1-i and -1+i.
k will only change the position of z on the circle but |z| should be sqrt(2)
