[" 1.If "z" is a complex number satisfyi...

[" 1.If "z" is a complex number satisfying the equation "|z-(1+i)|^(2)=2" and "omega=(2)/(z)," then the locus traced by "],[" ' "[omega'" in the complex plane is "],[(" A ")~ x-y-1=0," (B) "x+y-1=0," (C) "x-y+1=0," (D) "x+y+1=0]]

Similar Questions

Explore conceptually related problems

If z = x + yi, omega = (2-iz)/(2z-i) and |omega|=1 , find the locus of z in the complex plane

If for a complex number z=x+iy , sec^(-1)((z-2)/(i)) is a real angle in (0,(pi)/(2)),(x,y in R), then locus of z

z=x+iy satisfies arg(z+2)=arg(z+i) then (A) x+2y+1=0 (B) x+2y+2=0 (C) x-2y+1=0 (D) x-2y-2=0

If z = + iy is complex number such that Im ((2z + 1)/(iz + 1)) = 0, show that the locus of z is 2x^(2) + 2y^(2) + x - 2y = 0.

The complex number which satisfies the condition |(i+z)/(i-z)|=1\ lies on a. circle \x^2+y^2=1 b. the x-axis c. the y-axis d. the line x+y=1

If the complex number z=x+i y satisfies the condition |z+1|=1, then z lies on (a)x axis (b) circle with centre (-1,0) and radius 1 (c)y-axis (d) none of these

If the complex number z=x+i y satisfies the condition |z+1|=1, then z lies on (a)x axis (b) circle with centre(-1,0) and radius1 (c)y-axis (d) none of these

A variable complex number z=x+iy is such that arg (z-1)/(z+1)= pi/2 . Show that x^2+y^2-1=0 .

[" 1.If "z" is a complex number satisfying the equation "|z-(1+i)|^(2)=2" and "omega=(2)/(z)," then the locus traced by "],[" ' "[omega'" in the complex plane is "],[(" A ")~ x-y-1=0," (B) "x+y-1=0," (C) "x-y+1=0," (D) "x+y+1=0]]

Similar Questions

Recommended Questions