A variable plane at constant distance p form the origin meets the coordinate axes at P,Q, and R. Find the locus of the point of intersection of planes drawn through P,Q, r and parallel to the coordinate planes.

A plane a constant distance p from the origin meets the coordinate axes in A, B, C. Locus of the centroid of the triangle ABC is

A variable plane is at a distance k from the origin and meets the coordinates axes is A,B,C. Then the locus of the centroid of DeltaABC is

A variable plane which remains at a constant distance P from the origin (0) cuts the coordinate axes in A, B and C

A variable plane at a constant distance p from the origin meets the coordinate axes in points A,B and C respectively.Through these points, planes are drawn parallel to the coordinate planes,show that locus of the point of intersection is (1)/(x^(2))+(1)/(y^(2))+(1)/(z^(2))=(1)/(p^(2))

A variable plane passes through a fixed point (alpha,beta,gamma) and meets the axes at A,B, and C . show that the locus of the point of intersection of the planes through A,B and C parallel to the coordinate planes is alpha x^(-1)+beta y^(-1)+gamma z^(-1)=1

If a variable plane which is at a constant distance 3p from the origin cut the co-ordinate axes at points A ,B , C , then locus of the centroid of DeltaABC is

If a variable plane, at a distance of 3 units from the origin, intersects the coordinate axes at A,B anc C, then the locus of the centroid of Delta ABC is :