For three vectors `overset(to)(u), overset(to)(v) , overset(to)(W)` which of the folllowing expressions is not equal to any of the remaining three ?

For three vectors vecu,vecv,vecw which of the following expressions is not eqal to any of the remaining three?

For three vectors, vecu, vecv and vecw which of the following expressions is not equal to any of the remaining three ?

For three vectors vec u,vec v and vec w which of the following expressions is not equal to any of the remaining three ? a.vec uvec v xxvec w b.(vec v xxvec w)vec u c.vec vvec u xxvec w d.(vec u xxvec v)vec w

Let overset(to)(a),overset(to)(b),overset(to)(c ) be unit vectors such that overset(to)(a)+overset(to)(b)+overset(to)(c ) = overset(to)(0). Which one of the following is correct ?

The scalar overset(to)(A) .[(overset(to)(B) xx overset(to)( C)) xx (overset(to)(A) + overset(to)(B) + overset(to)( C))] equals

If overset(to)(a) " and " overset(to)(b)_(1) are two unit vectors such that overset(to)(a) +2overset(to)(b) and 5overset(to)(a) -4overset(to)(b) are perpendicular to each other then the angle between overset(to)(a) " and " overset(to)(b) is

If the vectors overset(to)(b), overset(to)(c ) , overset(to)(d) are not coplanar then prove than the vectors (overset(to)(a) xx overset(to)(b)) xx (overset(to)(c ) xx overset(to)(d)) + (overset(to)(a) xx overset(to)(c )) xx (overset(to)(d) xx overset(to)(b)) +(overset(to)(a) xx overset(to)(d)) xx (overset(to)(b) xx overset(to)( c)) is parallel to overset(to)(a)