The volume of the parallelopiped, if `a=3hati,b=5hatj and c=4hatk` are coterminous edges of the parallelopiped is

hata, hatb and hata-hatb are unit vectors. The volume of the parallelopiped, formed with hata, hatb and hata xx hatb as coterminous edges is :

hata, hatb and hata-hatb are unit vectors. The volume of the parallelopiped, formed with hata, hatb and hata xx hatb as coterminous edges is :

If the volume of the parallelopiped with a, b and c as coterminous edges is 40 cubic units, then the volume of the parallelopiped having b+c, c+a and a+b as coterminous edges in cubic units is

If the volume of the parallelopiped with veca,vecb and vecc as coterminous edges is 40 cubic units, then the volume of he parallelopiped having vecb+vecc,vecc+veca and veca+vecb as coterminous edges in cubic units is

The three conterminous edges of parallelopiped are a=2hati-6hatj+3hatk, b=5hatj,c=-2hati+hatk Calculate the volumeof parallelopiped

If [a b c] = 3, then the volume (in cube units) of the parallelopiped with 2a + b, 2b + c and 2c + a as coteminous edges is

If the volume of the parallelopiped formed by the vectors veca, vecb, vecc as three coterminous edges is 27 units, then the volume of the parallelopiped having vec(alpha)=veca+2vecb-vecc, vec(beta)=veca-vecb and vec(gamma)=veca-vecb-vecc as three coterminous edges, is

If the volume of the parallelopiped formed by the vectors veca, vecb, vecc as three coterminous edges is 27 units, then the volume of the parallelopiped having vec(alpha)=veca+2vecb-vecc, vec(beta)=veca-vecb and vec(gamma)=veca-vecb-vecc as three coterminous edges, is