A point `P(1, 2, 3)` is one of a cuboid formed by the coordinate planes and the planes passing through P and parallel to the coordinate planes. What is the length of one of the diagonals of the cuboid?

A point P(1,2,3) is one of a cuboid formed by the coordinate planes and the planes passing through P and parallel to the cordinate planes.What is the length of one of the diagonals of the cuboid?

A point P(1,2,3) is one vertex of a cuboids formed by the coordinates planes and the planes passing through P and parallel to the coordinates planes. What is the length of one of the diagonals of the cuoids?

A points P(1,2,3) is one vertex of a cuboid formed by the coordinate planes and the planes passing through P and parallel to the coordinate planes. What is the equation of the plane passing through P(1,2,3) and parallel to xy-plane ?

A points P(1,2,3) is one vertex of a cuboid formed by the coordinate planes and the planes passing through P and parallel to the coordinate planes. What are the co-ordinates of the foot of the perpendicular drawn from the point (3,5,4) on the plane z = 0 ?

A points P(1,2,3) is one vertex of a cuboid formed by the coordinate planes and the planes passing through P and parallel to the coordinate planes. The lengths of the intercepts on the co-ordinate axes made by the plane 5x+2y+z-13=0 are

A point P(1,2,3) is one vertex of a cuboids formed by the coordinates planes and the planes passing through P and parallel to the coordinates planes. What is the equation of plane passing through P(1,2,3) and parallel to XY-plane?

A points P(1,2,3) is one vertex of a cuboid formed by the coordinate planes and the planes passing through P and parallel to the coordinate planes. The direction ratios of the line perpendicular to the lines with direction ratios lt1,-2,2gt and lt0,2,1gt are

A points P(1,2,3) is one vertex of a cuboid formed by the coordinate planes and the planes passing through P and parallel to the coordinate planes. The radius of the sphere 3x^2+3y^2+3z^2-8x+4y+8z-15=0 is

Equation of plane passing through P(a,b,c) and parallel to xy plane is

If a parallelopiped is formed by planes drawn through the points (2, 5, 3) and (6, 7, 9) parallel to the coordinate planes, then the length of its diagonal is