Show that the locus of the point, the powers of which with respect to two given circles are equal, is a staight line.

The locus of the centre of a circle which touches two given circles externally is a

Show that the locus of points from which the tangents drawn to a circle are orthogonal, is a concentric circle. Or Find the equation of the director circle of the circle x^2 + y^2 = a^2 .

Show that the locus of a point such that the ratio of its distances from two given points is constant, is a circle. Hence show that the circle cannot pass through the given points.

Prove that the locus of centre of the circle which toches two given disjoint circles externally is hyperbola.

The locus of the point at which two given unequal circles subtend equal angles is: (A) a straight line(B) a circle (C) a parabola (D) an ellipse

Prove that the locus of the center of the circle which touches the given circle externally and the given line is a parabola.

The locus of the centre of a circle the touches the given circle externally is a _______

The locus of the centre of the circles which touches both the axes is given by

Statement 1: Each point on the line y-x+12=0 is equidistant from the lines 4y+3x-12=0,3y+4x-24=0 Statement 2: The locus of a point which is equidistant from two given lines is the angular bisector of the two lines.

Let a given line L_1 intersect the X and Y axes at P and Q respectively. Let another line L_2 perpendicular to L_1 cut the X and Y-axes at Rand S, respectively. Show that the locus of the point of intersection of the line PS and QR is a circle passing through the origin