`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

If A(z_(1)) and B(z_(2)) are two fixed points in the Argand plane the locus of point P(z) satisfying |z-z_(1)|+|z-z_(2)|=|z_(1)-z_(2)| , is

If z_(1) and z_(2) are two fixed points in the Argand plane, then find the locus of a point z in each of the following |z-z_(1)| - |z-z_(2)|= |z_(1)-z_(2)|

If z_(1) and z_(2) are two fixed points in the Argand plane, then find the locus of a point z in each of the following |z-z_(1)| + |z-z_(2)| = |z_(1)-z_(2)|

A(z_(1)) and B(z_(2)) are two points in the argand plane then the locius of the complex number z satisfying arg (z-z_(1))/(z-z_(2))=0 or pi is

Points z in the complex plane satisfying Re(z+1)^(2)=|z|^(2)+1 lies on

If z_(1) and z_(2) are two fixed points in the Argand plane, then find the locus of a point z in each of the following |z-z_(1)| = |z-z_(2)|

Points z in the complex plane satisfying "Re"(z+1)^(2)=|z|^(2)+1 lie on

Points z in the complex plane satisfying "Re"(z+1)^(2)=|z|^(2)+1 lie on

Points z in the complex plane satisfying "Re"(z+1)^(2)=|z|^(2)+1 lie on

A(z_(1)) and B(z_(2)) are two fixed points in the Argand plane and a point P(z) moves in the plane such that |z-z_(1)|+|z-z_(2)| = Constant (ne|z_(1)-z_(2)|) , then the locus of P, is