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:

If veca and vecb are non - zero vectors such that |veca + vecb| = |veca - 2vecb| then

Let veca and vecb be two non-collinear unit vectors. If vecu=veca-(veca.vecb)vecb and vec=vecaxxvecb , then |vecv| is

If veca, vecb are unit vertors such that veca -vecb is also a unit vector, then the angle between veca and vecb , is

If veca and vecb are two non collinear unit vectors and iveca+vecbi=sqrt(3) then find the value of (veca-vecb).(2veca+vecb)

If veca and vecb are two non collinear unit vectors and |veca+vecb|= sqrt3 , then find the value of (veca- vecb)*(2veca+ vecb)

If vectors veca and vecb are non collinear then veca/(|veca|)+vecb/(|vecb|) is (A) a unit vector in the plane of veca and vecb (B) in the plane of veca and vecb (C) equally inclined ot vecas and vecb (D) perpendiculat to veca xx vecb

If veca and vecb are two vectors such that |veca xx vecb|= veca.vecb , then what is the angle between veca and vecb ?

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

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 :