Cambridge International AS and A Level Mathematics Pure Mathematics 1

Vector

(^) calculations
265
P1^
8
When you find the vector
represented by the line segment
joining two points, you are in
effect subtracting their position
vectors. If, for example,
P is the point (2, 1) and Q is the
point (3, 5), P
→
Q is 1
4







,^ as^

figure 8.16 shows.

You find this by saying

P

→

Q = P

→

O + O

→

Q = −p + q.

In this case, this gives

P

→

Q = –

2

1

3

5

1

4









+







=







as expected.

This is an important result:

P

→

Q = q − p

where p and q are the position vectors of P and Q.

Geometrical figures

It is often useful to be able to express lines in a geometrical figure in terms of

given vectors.

aCTIVITY 8.1 The diagram shows a cuboid OABCDEFG. P, Q, R, S and T are the mid-points of
the edges they lie on. The origin is at O and the axes lie along OA, OC and OD, as
shown in figure 8.17.

O

→

A =

6

0

0

















,

O

→

C =

0

5

0

















,

O

→

D =

0

0

4

















y

2

4

6

1

3

5

(^012345) x
1
4 ))
P(2, 1)
Q(3, 5)
Figure 8.16
D E
*^6
7
)
2 A
C B
5
4
x 3
y
z
Figure 8.17