Let `z` be a moving point in complex plane. If `|Re(z)|+|lm(z)|=2` , then the locus of point `z` is

If |z^(2)|=2Re(z) then the locus of z 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

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

If P (z) is a variable point in the complex plane such that IM (-1/z)=1/4 , then the value of the perimeter of the locus of P (z) is (use pi=3.14 )

If z is a complex number such that Re(z)=Im(2), then

The point z in the complex plane satisfying |z+2|-|z-2|=+3 lies on