Vectors
P1^
8
ExamPlE 8.5 Points L, M and N have co-ordinates (4, 3), (−2, −1) and (2, 2).
(i) Write down, in component form, the position vector of L and the vector M
→
N.
(ii) What do your answers to part (i) tell you about the lines OL and MN?
SOlUTION
(i) The position vector of L is O
→
L = 4
3
.
The vector M
→
N is also 4
3
(see figure 8.10).
(ii) Since O
→
L = M
→
N, lines OL and MN are parallel and equal in length.
Note
A line joining two points, like MN in figure 8.10, is often called a line segment,
meaning that it is just that particular part of the infinite straight line that passes
through those two points.
The vector M
→
N is an example of a displacement vector. Its length represents the
magnitude of the displacement when you move from M to N.
The length of a vector
In two dimensions, the use of Pythagoras’ theorem leads to the result that a
vector a 1 i + a 2 j has length | a | given by
| a | = aa 12 +^22.
y
4
3
2
1
–1
–2 –1 O 1 2 3 4 x
M
N
L
Figure 8.10