The volume of a parallelopiped whose co-terminus edges are `2bari - 3barj , bari + barj - bark` and `3bari - bark` is :

The volume of a parallelopiped with coterminous edges bari+xbarj-x^(2)bark,,bari+barj-bark and bari-barj+bark is 4 cubic units then x=

Find the volume of the parallelopiped having coterminus edges 2bari-3barj,bari+barj-bark,3bari-bark

If bara=2bari-3barj+5bark,barb=3bari-4barj+5bark and barc = 5bari - 3barj -2bark , then the volume of the parallelopiped with co-terminus edges bara+ barb, barb + barc, barc + bara is

Find the volume of the parallelopiped having co-terminus edges bari+barj+bark, bari-barj,bari+2barj-bark .

The volume of a parallelopiped whose edges are represented by -12bari+lamdabark,3barj-bark and 2bari + barj -15bark is 546, then lamda =

Find the volume of the tetrahedron having the coterminus edges 2bari + barj +bark, bari -3barj +2bark, bari -bark .

[bari-barj bark]+[-bari-barj bark]+[bari-bark bark] =

The four points whose position vectors are 6bari -7 barj, 16bari -29barj-4bark, 3barj-6bark, 2bari +5barj +10bark are

Find the volume of tetrahedron formed by the four planes barr. (bari + barj) = 0 , barr. (barj + bark) = 0, barr. (bari + bark) = 0 and barr. (bari + barj + bark) = 4.

Prove that the vectors bara= 2bari - barj + bark, barb = bari -3barj -5bark and barc=3bari -4barj -4bark are coplanar.