A plane passes through a fixed point `(a, b, c)` and cuts the axes in A, B, C. The locus of a point equidistant from origin A, B, C must be

A variable plane passes through a fixed point (a, b, c) and cuts the axes in A. B and C respectively. The locus of the centre of the sphere OABC. O being the origin.is

A variable plane passes through a fixed point (a,b,c) and meets the co-ordinate axes in A, B, C. Show that the locus of the point common to the planes through A, B, C parallel to the co-ordiante planes is (a)/(x) + (b)/(y)+ (c)/(z) = 1 .

A variable plane passes through a fixed point (a,b,c) and cuts the coordinate axes at points A,B, and C. Show that eh locus of the centre of the sphere OABCis(a)/(x)+(b)/(y)+(c)/(z)=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

A plane passes through a fixed point (a,b,c). Show that the locus of the foot of the perpendicular to it from the origin is the sphere x^(2)+y^(2)+z^(2)-ax-by-cz=0