The vector `veca+vecb` bisects the angle between the non-collinear vectors `vecaandvecb`, if……..

The vector veca+vecb bisects the angle between the vectors hata and hatb if (A) |veca|+|vecb|=0 (B) angle between veca and vecb is zero (C) |veca|=|vecb|=0 (D) none of these

Find the vector of magnitude 3, bisecting the angle between the vectors veca=2hati+hatj-hatk and vecb=hati-2hatj+hatk .

Given : vecP=vecA+vecBandvecQ=vecA-vecB . If the magnitudes of vectors vecP and vecQ are equal, what is the angle between vectors vecAandvecB ?

If veca and vecb are two vectors, such that veca.vecblt0 and |veca.vecb|=|vecaxxvecb| then the angle between angles between the vectors veca and vecb is

If the angle between two vectors vecA and vecB " is " 90^(@) then

if veca and vecb non-zero ad non-collinear vectors, then

Consider three vectors veca, vecb and vecc . Vectors veca and vecb are unit vectors having an angle theta between them For vector veca, |veca|^2=veca.veca If veca_|_vecb and veca_|_vecc then veca||vecbxxvecc If veca||vecb, then veca=tvecb Now answer the following question: If vecc is a unit vector and equal to the sum of veca and vecb the magnitude of difference between veca and vecb is (A) 1 (B) sqrt(2) (C) sqrt(3) (D) 1/sqrt(2)

The angle between vector (vecA) and (vecA-vecB) is :