A point moves so that the sum of the square of itsdistances from the six faces of a cube given by `x=+-1,y = +-1, z= +-1` is `10` units. The locus of the point is:

If a point moves so that the sum of the squars of its distances from the six faces of a cube having length of each edge 2 units is 104 units then the distance of the point from point (1,1,1) is (A) a variable (B) a constant equal to 7 units (C) a constant equal to 4 uinits (D) a constant equal to 49 units

If a point moves so that the sum of the squars of its distances from the six faces of a cube having length of each edge 2 units is 104 units then the distance of the point from point (1,1,1) is (A) a variable (B) a constant equal to 7 units (C) a constant equal to 4 uinits (D) a constant equal to 49 units

A point moves such that the sum of the squares of its distances from the sides of a square of side unity is equal to 9, the locus of such point

A point moves such that the sum of the squares of its distances from the sides of a square of side unity is equal to 9, the locus of such point is

A point moves such that the sum of the squares of its distances from the sides of a square of side unity is equal to 9, the locus of such point is

A point moves so that the sum of squares of its distances from the points (1, 2) and (-2, 1) is always 6. Then its locus is

A point moves so that the sum of squares of its distances from the points (1,2) and (-2,1) is always 6 . Then its locus is _

A point moves so that sum of the squares of its distances from the vertices of a triangle is always constant. Prove that the locus of the moving point is a circle whose centre is the centroid of the given triangle.

A point moves so that the sum of squares of its distances from the points (1, 2) and (-2,1) is always 6. Then its locus is