If 
are non-coplanar vectors, prove that the points having the following position vectors are collinear:
Let us understand that, two more points are said to be collinear if they all lie on a single straight line.
Given that, 
, 
and 
are non-coplanar vectors.
And we know that, vectors that do not lie on the same plane or line are called non-coplanar vectors.
To Prove: 
, 
and 
are collinear.
Proof: Let the points be A, B and C.
Then,
So, in this case if we prove that 
and 
are parallel to each other, then we can easily show that A, B and C are collinear.
Therefore, 
is given by
And 
is given by
Let us note the relation between 
and 
.
We know, 
Or 
Or 
Or 
[∵, 
]
This relation shows that 
and 
are parallel to each other.
But also, 
is the common vector in 
and 
.
⇒ 
and 
are not parallel but lies on a straight line.
Thus, A, B and C are collinear.