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

If a point moves such that twice its distance from the axis of x exceeds its distance from the axis of y by 2, then its locus is

A point on x - axis at a distance x from the origin .

A point on y axis at a distance y from the origin.

A point moves so that the sum of its distances from (a e ,0)a n d(-a e ,0) is 2a , prove that the equation to its locus is (x^2)/(a^2)+(y^2)/(b^2)=1 , where b^2=a^2(1-e^2)dot

The equation of the locus of a point which moves so that its distance from the point (ak, 0) is k times its distance from the point ((a)/(k),0) (k ne 1) is

The locus of a point which moves so that the difference of the squares of its distance from two given points is constant, is a

Find the locus of a point , which moves such that its distance from the point (0,-1) is twice its distance from the line 3x+4y+1=0

Write five distinct points whose distance from the x-axis is twice that from y-axis.

Find the locus of a point which moves such that its distance from x axis is five times its distance from y axis.

A parabola mirror is kept along y^2=4x and two light rays parallel to its axis are reflected along one straight line. If one of the incident light rays is at 3 units distance from the axis, then find the distance of the other incident ray from the axis.