If `z_(1) , z_(2), z_(3)` are three complex numbers in A.P., then they lie on :

theta in [0,2pi] and z_(1) , z_(2) , z_(3) are three complex numbers such that they are collinear and (1+|sin theta|)z_(1)+(|cos theta|-1)z_(2)-sqrt(2)z_(3)=0 . If at least one of the complex numbers z_(1) , z_(2) , z_(3) is nonzero, then number of possible values of theta is

If z_(1),z_(2),z_(3) are three complex numbers such that there exists a complex number z with |(:z_(1)-z|=||z_(2)-z|=|backslash z_(3)-z| show that z_(1),z_(2),z_(3) lie on a circle in the Argand diagram.

Let z_(1),z_(2) " and " z_(3) be three complex numbers in AP. bb"Statement-1" Points representing z_(1),z_(2) " and " z_(3) are collinear bb"Statement-2" Three numbers a,b and c are in AP, if b-a=c-b

If arg(z_(2)-z_(1))+arg(z_(3)-z_(1))=2arg(z-z_(1)) where z,z_(1),z_(2) and z_(3) ,are complex numbers, then the locus of z is