A point P moves such that its distances from two given points A and B are equal. Then what is the locus of the point P ?

A points P moves such that its distances from (1,2) and (-2,3) are equal.Then,the locus of P is

A point moves in a plane so that its distances PA and PB from two fixed points A and B in the plane satisfy the relation PA-PB=k(k ne 0) , then the locus of P , is

The locus of a point which moves such that its distance from a given point is constant is

A point moves so that its distance from y-axis is half of its distance from the origin.Find the locus of the point.

If a point P moves such that its distance from (a, 0) is always equal to a+x -coordinate of P , show that the locus of P is y^2 = 4ax .

Find the equation of the set of points P which moves so that its distances from the points A(3,4,-5) and B(-2,1,4) are equal.

A point moves in the xy-plane such that the sum of its distance from two mutually perpendicular lines is always equal to 3. The area of the locus of the point is

Let a point P be such that its distance from the point (5, 0) is thrice the distance of P from the point (-5, 0). If the locus of the point P is a circle of radius r, then 4r^2 is equal to _______ .