The direction rations of the diagonals of a cube which joins the origin to the opposite corner are (when the three concurrent edges of the cube are coordinate axes)

Find the angle between the diagonals of a cube with edges of length "a".

A cube is placed so that one corner is at the origin and three edges are along the x-,y-, and ,z-axes of a coordinate system (figure).Use vector to compute a.The angle between the edge along the z-axis (line ab) and the diagonal from the origin to the opposite corner (line ad). b. The angle between line ac (the diagonal of a face ) and line ad.

If each edge of a cube is 6 cm, then find the diagonal of cube.

The angle between a diagonal of a cube and one of its edges is

If the length of the diagonal of a cube is 6sqrt(3) cm , then length of the edge of the cube is 6 cm .

If three concurrent edges of a parallelopiped of volume V represent vectors veca,vecb,vecc then the volume of the parallelopiped whose three concurrent edges are the three concurrent diagonals of the three faces of the given parallelopiped is

The shortest distance between a diagonal of a unit cube and the edge skew to it,is