Let `vecA=hatiA Cos theta+hatjA Sintheta`, be any vector, Another vector `vecB` which is normal to `vecA` is :

The values of x for which the angle between the vectors veca =xhati - 3hatj-hatk and vecb = 2x hati + x hatj -hatk is acute, and the angle, between the vector vecb and the axis of ordinates is obtuse, are

Find the unit vector in the direction of the vector veca=hati+hatj+2hatk .

If hatn is a unit vector in the direction of the vector vecA , then hatn is

The angle made by the vector vecA=hati+hatj with x-axis is

If vecA=2hati-2hatj-hatk and vecB=hati+hatj , then : (a) Find angle between vecA and vecB . (b) Find the projection of resultant vector of vecA and vecB on x-axis. (c) Find a vector which is, if added to vecA , gives a unit vector along y-axis.

If the vectors hati-hatj, hatj+hatk and veca form a triangle then veca may be

If veca and vecb are two unit vectors and theta is the angle between them, then the unit vector along the angular bisector of veca and vecb will be given by

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

There are two vectors vecA=3hati+hatj and vecB=hatj+2hatk . For these two vectors- (a) Find the component of vecA along vecB in vector form. (b) If vecA & vecB are the adjacent sides of a parallalogram then find the magnitude of its area. (c) Find a unit vector which is perpendicular to both vecA & vecB .

Show that the area of the triangle contained between the vectors veca and vecb is one half of the magnitude of vecaxxvecb .