ABCD are four points in a plane and Q is the point of intersection of the lines joining the mid-points of AB and CD ; BC and AD. Show that 
where P is any point.
Let E, F, G and H be the midpoints of sides AB, BC, CD and DA respectively of quadrilateral ABCD.
Let the position vectors of these vertices and midpoints be as shown in the figure.
As E is the midpoint of AB, using midpoint formula, we have
Similarly, 
, 
and 
.
We know that the line segments joining the midpoints of opposite sides of a quadrilateral bisect each other.
⇒ Q is the midpoint of EG and HF.
Once again using midpoint formula, we get 
But, we found 
and 
.
Now, consider the vector 
.
Let the position vector of point P be 
.
Recall the vector 
is given by
Similarly, 
, 
and 
.
But, we found 
Observe, 
Thus, 