`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.

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

The sum of focal distances of any point on the ellipse 9x^(2) + 16y^(2) = 144 is

Find the sum of the focal distances of any point on the ellipse 9x^2+16 y^2=144.

Find the sum of the focal distances of any point on the ellipse 9x^2+16 y^2=144.

2z+ 1 =z What value of z satisfies the equation above?

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

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

Statement 1 : In a triangle A B C , if base B C is fixed and the perimeter of the triangle is constant, then vertex A moves on an ellipse. Statement 2 : If the sum of the distances of a point P from two fixed points is constant, then the locus of P is a real ellipse.

The locus of z which satisfies the inequality log _(0.3) abs(z-1) gt log _(0.3) abs(z-i) is given by :

Statement-1: The locus of point z satisfying |(3z+i)/(2z+3+4i)|=3/2 is a straight line. Statement-2 : The locus of a point equidistant from two fixed points is a straight line representing the perpendicular bisector of the segment joining the given points.