A vector `vecA` points vertically upward and `vecB` oints towards north. The vector product `vecAxxvecB` is

A vector vec(A) points verically upward and vec(B) points towards north. The vector product vec(A) xx vec(B) is

A Vector bar(P) points vertically downwards and another vector bar(Q) points towards north then. The vector bar(P)timesbar(Q) points towards.

If vecA along North and vecB vertically upward then the directions of vecAxxvecB is along

A vector vecA is along the positive z-axis and its vector product with another vector vecB is zero, then vector vecB could be :

If for two vector vecA and vecB , vecAxxvecB=0 then

vecA and vecB and vectors expressed as vecA = 2hati + hatj and vecB = hati - hatj Unit vector perpendicular to vecA and vecB is:

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

If veca vecb be any two mutually perpendiculr vectors and vecalpha be any vector then |vecaxxvecb|^2 ((veca.vecalpha)veca)/(veca|^2)+|vecaxvecb|^2 ((vecb.vecalpha)vecb)/(|vecb|^2)-|vecaxxvecb|^2vecalpha= (A) |(veca.vecb)vecalpha|(vecaxxvecb) (B) [veca vecb vecalpha](vecbxxveca) (C) [veca vecb vecalpha](vecaxxvecb) (D) none of these

The vector vecA and vecB are such that |vecA+vecB|=|vecA-vecB| . The angle between vectors vecA and vecB is -