locus of the point `z` satisfying the equation `|z-1|+|z-i|=2` is

Locus of the point z satisfying the equation |zi-i|+ |z-i| =2 is (1) A line segment (2) A circle (3) An eplipse (4) A pair of straight line

The maximum distance from the origin of coordinates to the point z satisfying the equation |z+1/z|=a is

The locus of the points z satisfying the condition arg ((z-1)/(z+1))=pi/3 is, a

Find the complex number z satisfying the equation |(z-12)/(z-8i)|= (5)/(3), |(z-4)/(z-8)|=1

bb"statement-1" Locus of z satisfying the equation abs(z-1)+abs(z-8)=5 is an ellipse. bb"statement-2" Sum of focal distances of any point on ellipse is constant for an ellipse.

If z is complex number, then the locus of z satisfying the condition |2z-1|=|z-1| is (a)perpendicular bisector of line segment joining 1/2 and 1 (b)circle (c)parabola (d)none of the above curves

The locus represented by the equation |z-1| = |z-i| is

Variable complex number z satisfies the equation |z-1+2i|+|z+3-i|=10 . Prove that locus of complex number z is ellipse. Also, find the centre, foci and eccentricity of the ellipse.

The solution of the equation |z|-z=1+2i is

The locus of point z satisfying Re (z^(2))=0 , is