Two circles in the complex plane are
`{:(C_(1) : |z-i|=2),(C_(2) : |z-1-2i|=4):}` then

A(z_(1)) and B(z_(2)) are two given points in the complex plane. The locus of a point P(z) in the complex plane satisfying |z-z_(1)|-|z-z_(2)| ='|z1-z2 |, is

Find the complex number z for which |z| = z + 1 + 2i.

Let z _(1) and z _(2) be two complex numberjs satisfying |z _(1)|=3 and |z _(2) -3-4i|=4. Then the minimum value of |z_(1) -z _(2)| is

z_(1) , z_(2) are two distinct points in complex plane such that 2|z_(1)|=3|z_(2)| and z in C be any point z=(2z_(1))/(3z_(2))+(3z_(2))/(2z_(1)) such that

If A(2+3i) and B(3+4i) are two vertices of a square ABCD (taken in anticlockwise order)in a complex plane, then the value of |Z_(3)|^(2)-|Z_(4)|^(2) (Where C is Z_(3) and D is Z_(4) ) is equal to

If z_1 and z_2 are two complex numbers for which |(z_1-z_2)(1-z_1z_2)|=1 and |z_2|!=1 then (A) |z_2|=2 (B) |z_1|=1 (C) z_1=e^(itheta) (D) z_2=e^(itheta)

The points A,B and C represent the complex numbers z_(1),z_(2),(1-i)z_(1)+iz_(2) respectively, on the complex plane (where, i=sqrt(-1) ). The /_\ABC , is

If z_(1) and z_(2) are two complex numbers such that |(z_(1)-z_(2))/(z_(1)+z_(2))|=1 , then

If z_(1) and z_(2) are two complex numbers such that |(z_(1)-z_(2))/(z_(1)+z_(2))|=1, then