Vectors

1. Given that and
   (a) Find .
   (b) The vector is parallel to the vector . Find .
   Find and such that .
2. The points and C have coordinates and respectively.
   (a) Write down the vectors and .
   (b) Write down an equation linking vectors and .
   Find a unit vector in the direction of .
   (d) A fourth point D is positioned so that ABCD is a trapezium with AD parallel to BC and .
   

Find the coordinates of D .
3. OABC is a quadrilateral. Relative to point O , points and C have position vectors respectively. The midpoints of and OA are the points and S respectively.
(a) Show P has position vector
(b) Hence write down the position vectors of and S .
Show that .
(d) State, with a reason, what geometrical shape PQRS is.
4. Relative to the point O , points and C have position vectors and respectively. M is the midpoint of BC .

(a) You are given that . Explain why O , A and M must form a straight line.
(b) Hence find the value of .
5. The corners of triangle PQR lie on a circle. and .
(a) Find the lengths of and PR and explain how this shows that the triangle is rightangled.
(b) Hence find the area of the circle.

Total 40 marks