If the angle between the vectors `vecA and vecB` is `theta,` the value of the product `(vecB xx vecA) * vecA` is equal to

The angle between the vector vecA and vecB is theta . The value of the triple product vecA.(vecBxxvecA) is

The angle between veca xx vecb and vecb xx veca is

The angle between the two vectors veca + vecb and veca-vecb is

The angle between vectors (vecA xx vecB) and (vecB xx vecA) is :

If theta is the angle between any two vectors veca and vec b , then | veca . vecb |=| veca xx vecb| when theta is equal to(A) 0 (B) pi/4 (C) pi/2 (D) pi

If veca, vecb and vecc are three vectors, such that |veca|=2, |vecb|=3, |vecc|=4, veca. vecc=0, veca. vecb=0 and the angle between vecb and vecc is (pi)/(3) , then the value of |veca xx (2vecb - 3 vecc)| is equal to

If theta is the angle between any two vectors veca and vecb , then |veca.vecb|=|veca xx vecb| when theta is equal to

If the vectors veca and vecb are mutually perpendicular, then veca xx {veca xx {veca xx {veca xx vecb}} is equal to:

What is the value of (vecA + vecB) * ( vecA xx vecB) ?

If veca , vecb and vecc are non- coplanar vectors and veca xx vecc is perpendicular to veca xx (vecb xx vecc) , then the value of [ veca xx ( vecb xx vecc)] xx vecc is equal to