Let `vec(A), vec(B)` and `vec(C)`, be unit vectors. Suppose that `vec(A).vec(B)=vec(A).vec(C)=0` and the angle between `vec(B)` and `vec(C)` is `pi/6` then

Let vec A,vec B,vec C be unit vectors suppose that vec A*vec B=vec A*vec C=0 and angle between vec B and vec C is (pi)/(6) then vec A=k(vec B xxvec C) and k=

If vec(a) , vec(b), vec(c) are unit vectors such that vec(a) is perpendicular to the plane of vec(b), vec(c) , and the angle between vec(b) and vec(c) is (pi)/(3) Then, what is |vec(a)+vec(b)+vec(c)| ?

If vec(a).vec(b) and vec(c ) are unit vectors such that vec(a) is perpendicular to the plane of vec(b) , vec(c ) and the angle between vec(b) and vec(c ) is (pi)/(3) . Then what is |vec(a) +vec(b)+vec(c )| ?

Let vec a,vec b,vec c be unit vectors such that vec a*vec b=vec a*vec c=0 and the angle between vec b and vec c is (pi)/(6), that vec a=+-2(vec b xxvec c)

If vec(A)=vec(B)+vec(C ) , and the magnitudes of vec(A) , vec(B) , vec(C ) are 5,4, and 3 units, then the angle between vec(A) and vec(C ) is

If vec a,vec b,vec c are three vectors such that vec a=vec b+vec c and the angle between vec b and vec c is (pi)/(2), then

If vec(a), vec(b) and vec(c) are unit vectors such that vec(a)+2vec(b)+2vec(c)=0 then |vec(a)timesvec(c)| is equal to

Consider the following for the next two items that follow Let vec(a).vec(b) and vec(c ) be three vectors such that vec(a) +vec(b) + vec(c )= vec(0) and |vec(a)|= 10 |vec(b)| =6 and |vec(c )|=14 . What is the angle between vec(a) and vec(b) ?