`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 :

The value of a, such that the volume of the parallelopiped formed by the vectors hati+hatj+hatk, hatj+ahatk and ahati+hatk becomes minimum, is

If |veca|=5, |vecb|=3, |vecc|=4 and veca is perpendicular to vecb and vecc such that angle between vecb and vecc is (5pi)/6 , then the volume of the parallelopiped having veca, vecb and vecc as three coterminous edges is

Assertion: For a=- 1/sqrt(3) the volume of the parallelopiped formed by vectors hati+ahatj, ahati+hatj+hatk and hatj+ahatk is maximum. Reason. The volume o the parallelopiped having the three coterminous edges veca.vecb and vecc=|[veca vecb vecc]| (A) Both A and R are true and R is the correct explanation of A (B) Both A and R are true R is not te correct explanation of A (C) A is true but R is false. (D) A is false but R is true.

If veca=2hati-3hatj+5hatk , vecb=3hati-4hatj+5hatk and vecc=5hati-3hatj-2hatk , then the volume of the parallelopiped with coterminous edges veca+vecb,vecb+vecc,vecc+veca is

If hata and hatb are unit vectors then the vector defined as vecV=(hata xx hatb) xx (hata+hatb) is collinear to the vector :

Volume of the parallelopiped whose adjacent edges are vectors veca , vecb , vecc is

If hat a and hatb are two unit vectors inclined at an angle theta , then sin(theta/2)

If [(veca,vecb,vecc)]=3 , then the volume (in cubic units) of the parallelopiped with 2veca+vecb,2vecb+vecc and 2vecc+veca as coterminous edges is

The volume of a tetrahedron formed by the coterminous edges vec a , vec b ,a n d vec c is 3. Then the volume of the parallelepiped formed by the coterminous edges vec a+ vec b , vec b+ vec ca n d vec c+ vec a is 6 b. 18 c. 36 d. 9

If hata, hatb and hatc are non-coplanar unti vectors such that [hata hatb hatc]=[hatb xx hatc" "hatc xx hata" "hata xx hatb] , then find the projection of hatb+hatc on hata xx hatb .