The figure, not drawn to scale, is made up of two identical squares, C and E and a rectangle D. The ratio of the area C to the area of D to the area of E is 1 : 2 : 1. The ratio of the unshaded part of C to the unshaded part of E is 2 : 3 respectively. Given that half of the area of C is shaded and the total area of all the shaded parts is 39 cm
2, what is the area of the whole figure?
C |
D |
E |
1x4 = 4 u |
2x4 = 8 u |
1x4 = 4 u |
Unshaded |
Shaded |
Unshaded |
Shaded |
Unshaded |
Shaded |
|
2 |
|
|
3 |
|
1x2 |
1x2 |
|
|
|
|
2 u |
2 u |
5 u |
3 u |
3 u |
1 u |
Since half of the area of C is shaded, the other half of the area of C is unshaded.
Unshaded part of C : Shaded part of C
1 : 1
The unshaded part of C is the repeated identity.
LCM of 1 and 2 = 2
Area of C is the combined repeated identity.
LCM of 1 and 4 = 4
C : D : E
1 : 2 : 1
4 : 8 : 4
Shaded part of C : Shaded part of E
2 : 3
Total shaded area
= 2 u + 1 u
= 3 u
3 u = 39
1 u = 39 ÷ 3 = 13
Area of the whole figure
= 2 u + 8 u + 3 u
= 13 u
= 13 x 13
= 169 cm
2 Answer(s): 169 cm
2