The points of intersection of the two curves `|z-3|=2` and `|z|=2` in an argand plane are:

A point z moves on the curve |z-4-3i| =2 in an argand plane. The maximum and minimum values of z are

A point z moves on the curve |z-4-3i|=2 in an argand plane.The maximum and minimum values of z are

If |z+3i|+|z-i|=8 , then the locus of z, in the Argand plane, is

If |z+3i|+|z-i|=8 , then the locus of z, in the Argand plane, 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)|= constant (ne |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)|

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)| = constant ne (|z_(1)-z_(2)|)

If P(z) is a variable point and A(z_(1)) and B(z_(2)) are the two fixed points in the argand plane arg((z-z_(1))/(z-z_(2)))=alpha

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)|