If `|(z-2)/(z+2)|=(pi)/(6)`, then the locus of `z` is

If the amplitude of z-2-3 i is (pi)/(4) , then the locus of z=x+i y is

If P(x, y) denotes z=x+i y in Argand's plane and |(z-1)/(z+2 i)|=1 , then the locus of P is/an

If Im((z-1)/(2 z+1))=-4 then the locus of z is

If |z-(4)/(z)|=2 then the maximum value of |z| is

If the imaginary part of (2z+1)/(iz+1) is -2 , then the locus of the point representing z in the complex plane is

If z_(1)=8+4 i, z_(2)=6+4 i and arg ((z-z_(1))/(z-z_(2)))=(pi)/(4) then z satisfies

Let omega be the complex number cos (2 pi)/(3)+i sin (2 pi)/(3) . Then the number of distinct complex number z satisfying [[z+1,omega,omega^(2)],[omega,z+omega^2,1],[omega^(2),1,z+omega]] = 0 is equal to

If |z_(1)|=|z_(2)|=|z_(3)|=|z_(4)| , then the points representing z_(1),z_(2),z_(3),z_(4) are :

If z ne 0 and arg z=(pi)/(4) , then

If |z^(2)-1|=|z|^(2)+1 , then z lies on :