Let `vecA` be a unit vector along the axis of rotation of a purely rotating body and `vecB` be a unit vector along the velocity of a particle P of the body away from the axis. The value of `vecA.vecB` is

A body is uniformly rotating bout an axis fixed in an inertial frame of reference. Let vecA be a unit vector along the axis of rotation and vecB be the unit vector along the resultant force on a particle P of the body away from the axis. The value of vecA.vecB is

Let veca and vecb be two unit vectors and alpha be the angle between them, then veca + vecb is a unit vector , if alpha =

if veca and vecb are unit vectors such that veca. vecb = cos theta , then the value of | veca + vecb| , is

If veca and vecb are unit vectors, then angle between veca and vecb for sqrt3 ​ veca − vec b to be unit vector is

If vecA+vecB is a unit vector along x-axis and vecA=hati-hatj+hatk , then what is vecB ?

If vecA+vecB is a unit vector along x-axis and vecA = hati-hatj+hatk , then what is vecB ?

If veca and vecb are unit vectors inclined at an angle theta , then the value of |veca-vecb| is

a,b are the magnitudes of vectors veca & vecb . If vecaxxvecb=0 the value of veca.vecb is

If veca and vecb are two unit vectors, then the vector (veca+vecb)xx(vecaxxvecb) is parallel to the vector

If veca and vecb are unit vectors, then which of the following values of veca.vecb is not possible ?