A parallelepiped is formed by planes drawn parallel to coordinate axes through the points A=(1,2,3) and B=(9,8,5). The volume of that parallelepiped is equal to (in cubic units)

Planes are drawn parallel to the coordinate planes through the points (1,2,3) and (3,-4,-5). Find the lengths of the edges of the parallelopiped so formed.

planes are drawn parallel to coordinate planes through points (3,0,-1) and (-2,5,4). Find the length of the edges of parallelopiped so formed.

Planes are drawn parallel to the coordinate planes through the points (1, 2,3) and (3, -4, -5). Find th lengths of the edges of the parallelopiped so formed.

Planes are drawn parallel to the coordinate planes through the points (3,0,-1) and (-2,5,4) . Find the lengths of the edges of he parallelepiped so formed.

A parallelopiped is formed by planes drawn through the points (1,2,3) and (-2,-2,-9) parallel to co ordinate planes.Then the volume of the rectangular parallelopiped is

Planes are drawn parallel to the coordinates planes through the points (3,0,-1) and (-2,5,4) . Find the lengths of the edges of the parallelopiped so formed.

Plane are drawn parallel to the coodinate planes through the points (3,0,-1) and (-1,5,4). Find the lenght of the edges of the parallelopiped so formed.

A parallelepiped is formed by planes drawn through the points (2,3,5) and (5,9,7), parallel to the coordinate planes.The length of a diagonal of the parallelepiped is a.7unit b.sqrt(38 unit c.sqrt(155) unit d.none of these )

Planes r drawn parallel to the coordinate planes through the point P(x_(1),y_(1),z_(1) and Q(x_(2),y_(2),z_(2)). Find the length of the edges of the parallelepiped so formed.

A parallelopiped is formed by planes drawn through the points (1,2,3) and (9,8,5) parallel to the coordinate planes. The length of its diagonal is (A) 2sqrt(14) units (B) 2sqrt(26) units (C) 6sqrt(3) units (D) 2sqrt(21) units