Let `vecv = 2hati + 2hatj - hatk and vecw = hati + 3hatk. If vecu` is a unit vector, then the maximum value of the scalar triple product `[vecu vecv vecw]` is :

Let vecu = hati+ hatj, vecv = hati - hatj and vecw= hati + 2 hatj + 3 hatk. If hatn is a unit vector such that vecu.hatn=0 and vecc.hatn=0, then |vecw.hatn| is equal to :

Let veca = 2hati + hatj -hatk , vecb = hati + 2hatj - hatk , and vecc = hati + hatj - 2hatk , be three vectors . A vector in the plane of b and c whose projection an a is of magnitude sqrt(2//3) is

Find a value of "x"for which x( hati + hatj+ hatk) is a unit vector .

Let veca = hati + hatj + hatk, vecb = hati - ahtj + hatk and hati - hatj - hatk be three vectors. A vector vecv in the plane of veca and vecb, whose projection on vecc is (1)/(sqrt3), is given by :

The sides of a parallelogram are 2hati +4hatj -5hatk and hati + 2hatj +3hatk . The unit vector parallel to one of the diagonals is