If `|z+4i| = min {|z+3i|, |z+5i|,` then `z` satisfies Im `z=-7/2`

If z + 2|z| = pi + 4i , then Im (z) equals

If z_1 = 8 + 4i, z_2 = 6 + 4iand arg ((z-z_1) / (z-z_2)) = pi / 4, then 'z' satisfies 1) | z-7-4i | = 1 2) | z-7-5i | = sqrt (2) 3) | z-4i | = 8 4) | z-7i | = sqrt (18)

If the complex numbers z_1 , z_2, z_3 and z_4 denote the vertices of a square taken in order. If z_1 = 3+4i and z_3 = 5+ 6i , then the other two vertices z_2 and z_4 are respectively a) 5+4i, 5+6i b) 5+4i, 3+6i c) 5+6i, 3+5i d) 3+6i, 5+3i

If z satisfies the relation |z-i|z||=|z+i|z|| then

If z satisfies |z-6+4i|+|z-3+2i|=13 then the locus of z is

if |z-i Re(z)|=|z-Im(z)| where i=sqrt(-1) then z lies on

If z_(1) = 3+4i and z_(2) = 2+i , and z satisfy the equation 2(z+bar(z)) + 3(z-bar(z))i = 0 , Then for Minimum value of |z-z_(1)| + |z-z_(2)| , possible value of z can be

Let Z be a complex number satisfying |Z-1| <= |Z-3|, |Z-3| <= |Z-5|, |Z+ i| <= |Z- i|, |Z- i| <= |Z- 5i| . Then area of region in which Z lies is A square units, Where A is equal to :

Let Z be a complex number satisfying |Z-1| <= |Z-3|, |Z-3| <= |Z-5|, |Z+ i| <= |Z- i|, |Z- i| <= |Z- 5i| . Then area of region in which Z lies is A square units, Where A is equal to :

Let Z be a complex number satisfying |Z-1| <= |Z-3|, |Z-3| <= |Z-5|, |Z+ i| <= |Z- i|, |Z- i| <= |Z- 5i|. Then area of region in which Z lies is A square units, Where A is equal to :