If w = z/(z-1/3i) and |w| =1, then z lie...

If `w = z/(z-1/3i)` and |w| =1, then z lies on

Text Solution

Verified by Experts

`omega = (z)/(z-(1)/(2)i)`
or ` |omega| = |(z)/(z-(1)/(3)i)|`
or ` |z| = |omega||z-(1)/(3)i|`
or ` |z| = |z-(1)/(3)i|" "(because |omega|=1)`
Hence, locous of z is perpendicular bisector of the line joining `0 + 0i` and `0+(1//3)i`. Hence z lies on a straight line .

Similar Questions

Explore conceptually related problems

If w= z/(z-i1/3) and |w|=1,then z lies on:

If w=(z)/(z-(1)/(3)i) and |w|=1 , then z lies on

If omega=z/(z-1/3i) and |omega|=1 then z lies on

If omega=(z)/(z-(1/3)i)" and "|omega|=1 , then z lies on

If w=z/[z-1/(3i)] and |w|=1, then find the locus of z

If complex variables z,w are such that w=(2z-7i)/(z+i) and |w|=2, then z lies on:

If w=(z)/(z-((1)/(3))i) and |w|=1, then find the locus of z and |w|=1, then find the

If w=z/[z-(1/3)i] and |w|=1, then find the locus of z

If `w = z/(z-1/3i)` and |w| =1, then z lies on

Text Solution

Similar Questions

Recommended Questions