Vectors
P1^
8
The next example shows you how to use it to find the angle between two vectors
given numerically.
ExamPlE 8.11 Find the angle between the vectors ^34
and (^) – 125 .
SOlUTION
Let a=^34 ⇒ | a | = 3422 + = 5
and b=– 125 ⇒ | b | = 5122 +(– 2 ) = 13.
The scalar product
3
4
5
12
. –
= 3 × 5 + 4 × (−12)
= 15 − 48
= −33.
Substituting in a. b = | a | | b | cos θ gives
− 33 = 5 × 13 × cos θ
cosθ=–^33
65
⇒ θ = 120.5°.
Perpendicular vectors
Since cos 90° = 0, it follows that if vectors a and b are perpendicular then
a. b = 0.
Conversely, if the scalar product of two non-zero vectors is zero, they are
perpendicular.
ExamPlE 8.12 Show that the vectors aa=
2
4
and bb=
6
– 3
are perpendicular.
SOlUTION
The scalar product of the vectors is
aa..bb=
2
4
6
3
.
–
= 2 × 6 + 4 × (−3)
= 12 − 12 = 0.
Therefore the vectors are perpendicular.