If `|veca|=4,|vecb|=2` and angle between `veca and vecb is pi/6 then (vecaxxvecb)^2` is (A) 48 (B) `(veca)^2` (C) 16 (D) 32

If veca . vecb =ab then the angle between veca and vecb is

If vecA*vecB=|vecAxxvecB| . Then angle between vecA and vecB is

If veca is perpendicuar to vecb and vecc |veca|=2, |vecb|=3,|vecc|=4 and the angle between vecb and vecc is (2pi)/3, then [veca vecb vecc] is equal to (A) 4sqrt(3) (B) 6sqrt(3) (C) 12sqrt(3) (D) 18sqrt(3)

If |veca - vecb|=|veca| =|vecb|=1 , then the angle between veca and vecb , is

If |vecA+vecB|=|vecA|+|vecB| , then angle between vecA and vecB will be

If |veca|=3, |vecb|=4 and the angle between veca and vecb is 120^(@) . Then find the value of |4 veca + 3vecb|

If |vecA+vecB|=|vecA|=|vecB| then angle between A and B will be

If veca * vecb = |veca xx vecb| , then this angle between veca and vecb is,

If |veca.vecb|=sqrt(3)|vecaxxvecb| then the angle between veca and vecb is (A) pi/6 (B) pi/4 (C) pi/3 (D) pi/2

If |vecA xx vecB| = vecA.vecB then the angle between vecA and vecB is :