Angle between the vectors `sqrt3(veca xx vec b) " and " vec b - (veca .vecb)veca` is

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

Let veca and vecb be non collinear vectors of which veca is a unit vector. The angle of the triangle whose sides are represented by sqrt(3)(veca xx vecb) and vecb-(veca.vecb)veca are:

Let veca= 2hati+hatj -2hatk and vecb=hati+hatj . If vec c is a vector such that veca*vec c=|vec c|, |vec c-veca|=2sqrt(2) and the angle between vec a xx vec b and vec c is 30^(@) then |(veca xx vec b) xx vec c| is equal to :

Angle between vectors veca and vecb " where " veca,vecb and vecc are unit vectors satisfying veca + vecb + sqrt3 vecc = vec0 is

The angle between the vectors vecA and vecB is theta. The value of vecA(vecAxx vec B) is -

Let veca = 2i + j + k, and b = i+ j if c is a vector such that veca .vecc = |vecc|, |vecc -veca| = 2sqrt2 and the angle between veca xx vecb and vec is 30^(@) , then |(veca xx vecb)|xx vecc| is equal to

Let veca and vecb be two non-zero vectors perpendicular to each other and |veca|=|vecb| . If |veca xx vecb|=|veca| , then the angle between the vectors (veca +vecb+(veca xx vecb)) and veca is equal to :

If the two adjacent sides of two rectangles are reprresented by vectors vecp=5veca-3vecb, vecq=-veca-2vecband vecr=-4 veca-vecb,vecs=-veca+vecb , respectively, then the angle between the vectors vecx=1/3(vecp+vecr+vecs) and vecy=1/5(vecr+vecs) is

The angle between (vecA xx vec B) and (vecB xx vecA ) is :

If veca and vecb are unit vectors such that (veca +vecb). (2veca + 3vecb)xx(3veca - 2vecb)=vec0 then angle between veca and vecb is