. P is a point which moves in the x-y p...

. P is a point which moves in the `x-y` plane such that the point P is nearer to the centre of a square than any of the sides. The four vertices of the square are `(+-a,+-a)`. Then region in which P will move is bounded by parts of parabolas of which one has the equation

Similar Questions

Explore conceptually related problems

A point P(x , y) moves in the xy-plane such that x=acos^2theta and y=2asintheta, where theta is a parameter. The locus of the point P is a/an

The locus of a point which moves such that the sum of the squares of the distances from the three vertices of a triangle is constant, is a circle whose centre is at the:

Find the locus a point which moves in such a way that the sum of squares of its distances s from the four sides of a square is constant. Does it represent a circle?

The locus of a point, which moves in such a way that the sum of the squares of its distances from the four sides of a square is consant (=2c^(2)) is

A point P(x,y) moves in the xy - plane in such a way that its distance from the point (0,4) is equal to (2)/(3) rd of its distance from the x axis , find the equation to the locus of P.

A point P is moving in a plane such that the difference of its distances from two fixed points in the same plane is a constant. The path traced by the point P is a/an

Find the equation of the locus of a point P if the sum of squares of distances of the point P from the axes is p^2 .

. P is a point which moves in the `x-y` plane such that the point P is nearer to the centre of a square than any of the sides. The four vertices of the square are `(+-a,+-a)`. Then region in which P will move is bounded by parts of parabolas of which one has the equation

Similar Questions

Recommended Questions