Assertion: `vectau=vec(r)xxvec(F)` and `vectau!=vec(F)xxvec(r )`
Reason: Cross product of vectors is commutative.

The angle between Vectors (vec(A)xxvec(B)) and (vec(B)xxvec(A)) is

If for two vectors vec(A) and vec(B), vec(A)xxvec(B)=0 , the vectors

if vec a xxvec b = vec c and vec b xxvec c = vec a then

(vec and xxvec b) * (vec and xxvec c) =

If vec(p)!= vec(0) and the conditions vec(p).vec(q)=vec(p).vec(r) and vec(p)xxvec(q)=vec(p)xxvec(r) hold simultaneously, then which one of the following is correct?

Assertion: vec(A)xxvec(B) is perpendicualr to both vec(A)-vec(B) as well as vec(A)-vec(B) Reason: vec(A)xxvec(B) as well as vec(A)-vec(B) lie in the plane containing vec(A) and vec(B) , but vec(A)xxvec(B) lies perpendicular to the plane containing vec(A) and vec(B) .

If vec a xxvec b = vec c, vec b xxvec c = vec a, then

Let vec(p),vec(q),vec(r) be three unit vectors such that vec(p)xxvec(q)=vec(r) . If vec(a) is any vector such that [vec(a)vec(q)vec(r )]=1,[vec(a)vec(r)vec(p )]=2 , and [vec(a)vec(p)vec(q )]=3 , then vec(a)=

vec r=vec linesvec r=vec a+lambda(vec b xxvec c) and vec r=vec b+mu(vec c xxvec a) will intersect if a.vec a xxvec c=vec b xxvec c b.vec a*vec c=vec b*vec c c.b xxvec a=vec c xxvec a d.none of these