MATHEMATICS

Grade 9

QUADRILATERALS, PERSPECTIVE DRAWING,TRANSFORMATIONS

Module 22

COMPARE QUADRILATERALS FOR SIMILARITIES AND DIFFERENCES

ACTIVITY 1

To compare quadrilaterals for similarities and differences

[LO 3.4]

1. Comparisons

For the next exercise you can form small groups. You are given pairs of quadrilaterals, which you have to compare. Write down in which ways they are alike and in which ways they are different. If you can say exactly by what process you can change the one into the other, then that will show that you have really understood them. For example, look at the question on parallel sides at the end of section 3 above.

Each group should work with at least one pair of shapes. When you work with a kite, you should consider both versions of the kite.

If, in addition, you would like to compare a different pair of quadrilaterals, please do so!

1. Definitions

A very short, but accurate, description of a quadrilateral using the following characteristics, is a definition. This definition is unambiguous, meaning that it applies to one shape and one shape only, and we can use it to distinguish between the different types of quadrilateral.

The definitions are given in a certain order because the later definitions refer to the previous definitions, to make them shorter and easier to understand. There is more than one set of definitions, and this is one of them.

ACTIVITY 2

To develop formulas for the area of quadrilaterals intuitively

[LO 3.4]

Calculating areas of plane shapes.

Figure 1

Figure 2

Pick one of the triangles above, and calculate its area three times. Measure the lengths with your ruler, each time using another base/height pair. Do you find that answers agree closely? If they don’t, measure more carefully and try again.

The height is often a line drawn inside the triangle. This is the case in four of the six triangles above. But if the triangle is right-angled, the height can be one of the sides. This can be seen in the fourth triangle. In the sixth triangle you can see that the height line needs to be drawn outside the triangle.

Summary:

In summary, if you want to use the area formula you need to have a base and a height that make a pair, and you must have (or be able to calculate) their lengths. In some of the following problems, you will have to calculate the area of a triangle on the way to an answer.

Here is a reminder of the Theorem of Pythagoras; it applies only to right-angled triangles, but you will encounter many of those from now on.

I

In a right-angled triangle, the square on the hypotenuse is equal to the sum of the squares on the other two sides.

If you are a bit vague about applying the theorem, go back to the work you did on it before and refresh your memory.

A = 2 × area of 1 triangle = 2 (½ × base × height) = 2 × ½ × s × s = s² = side squared.

You probably knew this already!

Figure 4

A = first triangle + second triangle

= (½ × base × height) + (½ × base × height)

= (½ × b × ℓℓ size 12{ℓ} {}) + (½ × ℓℓ size 12{ℓ} {} × b) = ½ bℓℓ size 12{ℓ} {} + ½ bℓℓ size 12{ℓ} {} = bℓℓ size 12{ℓ} {}

= breadth times length.

You probably knew this already!

Figure 5

A = triangle₁ + triangle₂ = ½ × Ps₁ × h + ½ × Ps₂ × h

= ½ h (Ps₁ + Ps₂) = half height times sum of parallel sides.

(Did you notice the factorising?)

Figure 7

Area = 2 identical triangles

= 2( ½ × sl × h) = 2 × ½ × sl × ½ × sd

= sl × ½ × sd = ½ × sl × sd

= half long diagonal times short diagonal.

In the following exercise the questions start easy but become harder – you have to remember Pythagoras’ theorem when you work with right angles.

Calculate the areas of the following quadrilaterals:

1 A square with side length 13 cm

2 A square with a diagonal of 13 cm (first use Pythagoras)

3 A rectangle with length 5 cm and width 6,5 cm

4 A rectangle with length 12 cm and diagonal 13 cm (Pythagoras)

5 A parallelogram with height 4 cm and base length 9 cm

6 A parallelogram with height 2,3 cm and base length 7,2 cm

7 A rhombus with sides 5 cm and height 3,5 cm

8 A rhombus with diagonals 11 cm and 12 cm

(What fact do you know about the diagonals of a rhombus?)

9 A trapezium with the two parallel sides 18 cm and 23 cm that are 7,5 cm apart

10 A kite with diagonals 25 cm and 17 cm

Assessment