The vectors a,b and a+b are

Let a,b,c are three vectors of which every pair is non-collinear, if the vectors a+b and b+c are collinear with c annd a respectively, then find a+b+c.

If a and b are two non-zero and non-collinear vectors then a+b and a-b are

Let the vectors a and b be such that |a|=3 and |b|=(sqrt(2))/(3) , then axxb is a unit vector, if the angle between a and b is

Let the vectors vec a and vec b be such that |vec a| = 3 and |vec b| = sqrt2/3 , then vec a xx vec b is a unit vector, if the angle between vec a and vec b is

If theta is the angle between the vectors vec a and vec b then (|vec a xx vec b|)/(|vec a . vec b|) =

Angle between the vectors vec a and vec b , where vec a, vec b and vec c are unit vectors satisfying vec a + vec b + sqrt3 vec c = vec 0 is

Find the angle between two vectors a and b with magnitudes sqrt(3) and 2 respectively, having a.b=sqrt(6) .

Given that a.b=0 and axxb=0 . What can you conclude about the vectors a and b?