If `vec(O)A = i + 3j - 2k, vec(O)B = 3i + j - 2k` and C is a point on AB such that OC bisects angle AOB then `vec(O)C =`

For vectors vec(A) = (2i + 3j - 2k), vec(B) = (5i + nj + k) and vec(C ) = (-I + 2j + 3k) to be coplanar, the value of n is

If vec(O)A = i + + k, vec(A)B = 3i - 2j + k, vec(B)C = i + 2j - 2k, vec(C)D = 2i + j + 3k then the position vector of D is

If vec(a) = vec(i) + 2vec(j) - 3vec(k), vec(b)= 2vec(i) + vec(j) - vec(k) and vec(u) is a vector satisfying vec(a) xx vec(u) = vec(a) xx vec(b) and vec(a).vec(u)= 0 , then 2|vec(u)|^(2) =

If vec(A) = 2i + 3j and vec(B) =2 j + 3k the component of vec(B) along along vec(A) is

Let vec(a)= 2vec(i) + vec(j)-2vec(k), vec(b)= vec(i) + vec(j) " if " vec(c ) is a vector such that vec(a).vec(c )= |vec(c )|, |vec( c)- vec(a)|= 2 sqrt2 and the angle between vec(a) xx vec(b) and vec(c ) " is " 30^(@) , then find |(vec(a) xx vec(b)) xx vec( c)|

If vec(a)= 3vec(i) -5vec(j), vec(b)= 6vec(i) + 3vec(j) are two vectors and vec(c ) is a vector such that vec(c )= vec(a) xx vec(b) , then |vec(a)|:|vec(b)|: |vec(c )| =

If vec(a)= vec(i) + vec(j)+ vec(k), vec(c )= vec(j)- vec(k) , then find vector vec(b) such that vec(a) xx vec(b)= vec(c ) and vec(a).vec(b)= 3

vec(a) = 2hat(i) - hat(j) + hat(k), vec(b) = hat(i) - 3hat(j) - 5hat(k) . Find the vector vec(c ) such that vec(a), vec(b) and vec(c) form the sides of a triangle.