The region of the complex plane for which `|(z-a)/(z+veca)|=1,(Re(a) != 0)` is

The region of the complex plane for which |(z-a)/(z+vec a)|=1,(Re(a)!=0) is

If a point P denoting the complex number z moves on the complex plane such that,|Re(z)|+|Im(z)|=1 then locus of P is

If a point P denoting the complex number z moves on the complex plane such that |RE(z)|+|IM(z)|=1 then locus of P is

Consider the region S of complex numbers a such that |z^(2) - az + 1|=1 , where |z|=1 . Then area of S in the Argand plane is

If a point P denoting the complex number z moves on the complex plane such tha "Re"(z^(2))="Re"(z+bar(z)) , then the locus of P (z) is

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

The conjugate of a complex number z is (2)/(1-i) . Then Re(z) equals

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 conjugate of a complex number z is (2+5i)/(4-3i) , then |Re(z) + Im(z)| is equal to ____________