1. VECTORS
OBJECTIVES; By the end of this lesson you should be able to:
- Add and subtract vectors using line segments
- Identify coplanar and parallel vectors using scalar multiple.
- Express coplanar and parallel vectors as ratio.
2/27/2016
2. Match the words to the definitions
• Magnitude
• Scalar
• Resultant
• Vector
• Scalar Multiple
• Displacement
• Velocity
• Column Vector
• speed combined with direction
• a directed quantity
• a single vector which represents
multiple vectors
• a quantity only
• a parallel vector i.e. same direction,
different size
• distance combined with direction
• a vector represented as two vectors
in the horizontal (x) and vertical (y)
directions
• size
2/27/2016
3. Write the following vectors in terms of a and b
1) i) AC ii) FA iii) FD
iv) DC v) AE
A B
C
D
a
E
F
b
4a
3a
b
(i) AC = a + b
(ii) FA = 3a - b
(iii) FD = b + 3a
(v) AE =
2b - 3a
(iv) DC = a - b
2/27/2016
4. Example 1
A B
CD
i) Show that YX is parallel to AC
ii) What is the ratio YX:AC
AB = r
AD = s
X
Y
AY:YD = 1:2
DX:XB = 1:2
2/27/2016
ABCB is a rhombus
5. Solutions
A B
CD
i) Show that YX is parallel to AC
ii) What is the ratio YX:AC
X
Y
AC = r + s
YX = 2/3r + 1/3(r – s)
r
s
DB = r - s
YX = 1/3(r + s)
i) AC and YX are scalar multiples => parallel
ii) YX : AC = 1 : 3
2/27/2016
6. C
A
B
m
n
P
Write BP in terms of m and n
CA = n + m
BP = - n + ¾ (n + m)
= -¼ n + ¾ m
or
¼ (3m - n)
CP = ¾ CA = ¾ (n + m)
Example 2
In triangle ABC, P is a point on
AC such that CP:PA = 3:1
Find BP in terms of m and n
2/27/2016