8 Maths X Unit 2 Revision

Perimeter

Area

Circles

Volume

Pythagoras

100

What is perimeter?

The total length of a shape's boundary.

100

What is area?

The measure of how much space a shape takes up on a surface.

100

Recall the formula for calculating the circumference of a circle

100

What is volume?

The measure of how much 3D space an object occupies.

100

Recall Pythagorean theorem.

c² = a² + b²

200

What is the perimeter of a square with a side length of 15cm?

15x4 = 60cm

200

What is the area of a square with a side length of 4cm?

A = 4 x 4

= 16cm²

200

A circle has a diameter of 18cm. Calculate its circumference.

C = 56.55cm

200

What is the formula for volume?

V = Ah

200

Which side of the triangle is "c"?

Hypotenuse

300

A rectangular pool is 7.5m long and 3.5m wide. Calculate its perimeter.

P = 7.5 + 7.5 + 3.5 + 3.5

= 22m

300

What is the area of a circle with a diameter of 10cm? Answer to two decimal places.

A = pi x 5²

= 78.54cm²

300

A circle has an area of 200cm². Calculate the radius to three decimal places.

7.979cm

300

What is the volume of a cube with a side length of 18m?

V = 18 x 18 x 18 = 5832m³

300

A triangle has a base of 2m and a height of 5m. Calculate the length of the hypotenuse correct to two decimal places.

c² = a² + b²

c = sqr (2² + 5²)

c = 5.39m

400

A square has a side length of 9cm. Determine the side length of a equilateral triangle with the same perimeter.

Square perimeter = 9x4 = 36cm.

Equilateral triangle means it has 3 sides of the same length. Therefore, 36/3 = 12cm.

The side length of the triangle is 12cm.

400

A triangle has a base of 5m and a height of 120cm. Calculate its area to two decimal places.

Area = (5 x 1.2)/2 = 3m²

Or (500 x 120)/2 = 30 000cm²

400

You have a robot with wheels that are 4cm in diameter. You want your robot to travel 100cm. How many revolutions (full turns) must the wheels make?

Circumference of the wheels are 12.57cm. Therefore, 100cm/12.57cm is 7.96.

The wheel must make 8 revolutions.

400

A triangular prism has a cross-sectional area of 15m² and a volume of 3450m³. Calculate its height.

V = Ah

h = V/A

h = 3450m³/15m²

h= 230m

400

The distance from a point on the ground to the base of a tree is 18m.

The tree is 40m tall.

Calculate the distance from the point on the ground to the top of the tree to two decimal places.

c² = a² + b²

c = sqr (18² + 40² )

c = 53.86m

Therefore, the distance from the point on the ground to the top of the tree is 53.86m

500

A right-angled triangle has a base length of 9cm and a height of 6cm. Calculate its perimeter to two decimal places.

Hypotenuse = c² = a² + b²

c²= 9² + 6²

c = 10.82

P = 10.82 + 9 + 6 = 25.82cm

500

A rectangular room is 7m long and 2m wide. The floor is to be covered with square carpet tiles measuring 5cm by 5cm. How many tiles are needed to cover the floor assuming there are no gaps between the tiles?

Area of the room = 700 x 200 = 140,000cm²

Area of a tile = 5x5 = 25cm²

Number of tiles = 140,000/25 = 5600

Therefore, 5600 tiles are required to cover the floor.

500

You have a square with a side length of 10m. How many circles with a radius of 3m can you fit into the square? Assume there are no gaps between the circles.

Square area = 100m²

Circle area = 28.27m²

100/28.27 = 3.5

Therefore, you could fit 3 circles.

500

A cylinder with a radius of 3m and a height of 10m is filled once with water and tipped into a bigger cylinder with a cross-sectional area of 113.1m². What height would the water be in the larger cylinder? Answer to one decimal place.

Volume of smaller cylinder = Ah = pi x 3² x 10 =282.74m³

Therefore, volume within the larger cylinder will also equal 282.74m³.

Larger cylinder water height:

V = Ah

h = V/A

h = 282.74m³/113.1m²

h = 2.5m

The height of the water in the larger cylinder will be 2.5m

500

A hiker starts at point A and walks 30km south and then west, ending up 50km directly from his starting point A. How far west did he walk?

c² = a² + b²

b²= c² - a²

b²= 50²- 30²

b = 40km