Q25 of 181 Page 1073

If and then prove that and are coplanar.

If three planes lie in a single plane, then the volume of parallelepiped will be zero. So, planes are coplanar if

The volume of parallelepiped

= (- 2. - 2 - 4.4)4 - (- 2. - 2 - 4. - 2) - 2 + (4. - 2 - (- 2). - 2) - 2

= (4 - 16)4 + (4 + 8)2 - (- 8 - 4)2

= - 48 + 24 - (- 24)

= - 48 + 48 = 0

So, planes are coplanar.

Write the value of

Find the volume of the parallelepiped whose edges are represented by the vectors and

If and are such that then find the values of λ and μ.

If θ is the angle between and and then what is the value of θ?