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9.02 Introducing the circle

Worksheet
Features of the circle
1

Name the indicated part of the following circles:

a
b
c
d
2

Find the radius of the following circles:

a
b
3

Find diameter of the following circle:

4

The radius of the smaller circle shown in the figure is 16 \text{ cm}:

If CD = 4 \text{ cm}, find AD, the diameter of the larger circle.

5

Complete the following tables:

a
Diameter (cm)Radius (cm)
Circle 111
Circle 217
Circle 319
Circle 421
Circle 523
b
Diameter (cm)Radius (cm)
Circle 122
Circle 226
Circle 328
Circle 436
Circle 542
Circumference
6

Determine whether the following statements are true about \pi.

a

\pi is equal to 3.142.

b

\pi cannot be expressed as a fraction using whole numbers.

c

\pi is the ratio between the circumference and the diameter of a circle.

d

\pi is equal to \dfrac{22}{7}.

e

\pi is the ratio between the circumference and the radius of a circle.

f

\pi is equal to 3.14.

7

For each of the following circle:

i

Calculate the exact circumference in terms of \pi.

ii

Hence, calculate the circumference rounded to two decimal places.

a
b
c

A circle with a diameter of 7.7 \,\text{cm}.

d

A circle with a radius of 4.1 \,\text{cm}.

8

Calculate the exact circumference of the following circles:

a

A circle with a diameter of 59 \,\text{cm}.

b

A circle with a radius of 22 \,\text{cm}.

9

Calculate the circumference of the following circles, correct to two two decimal places:

a

A circle with a diameter of 38 \text{ cm}.

b

A circle with a diameter of 45 \text{ cm}.

c

A circle with a radius of 27 \text{ cm}.

d

A circle with a radius of 1.8 \text{ cm}.

10

Caitlin and David calculate the circumference of this circle using different formulas.

a

Caitlin uses the formula C = \pi d to calculate the circumference.

Find her result as an exact value

b

David uses the formula C = 2 \pi r to calculate the circumference, where r is the radius.

Find his result as an exact value.

c

Compare the results of their calculations and explain what you notice.

11

A circle has a circumference of 52 \,\text{cm}.

a

Calculate the exact radius of the circle.

b

Hence, calculate the radius rounded to two decimal place.

12

Calculate the exact radius of the following circles:

a

A circle with circumference of 12 \pi\,\text{cm}.

b

A circle with circumference of 12 \,\text{cm}.

c

A circle with circumference of 32 \pi \,\text{cm}

d

A circle with circumference of 26 \,\text{cm}

13

Calculate the radius of the following circles, correct to two decimal places:

a

A circle with circumference of 14 \text{ cm}.

b

A circle with circumference of 18 \text{ cm}.

c

A circle with circumference of 14.9 \text{ cm}.

d

A circle with circumference of 98 \text{ cm}.

14

A circle has a circumference of 36 \,\text{cm}.

a

Calculate the exact diameter of the circle.

b

Hence, calculate the diameter rounded to two decimal place.

15

Calculate the exact diameter of the following circles:

a

A circle with circumference of 18 \pi \,\text{cm}.

b

A circle with circumference 18 \,\text{cm}.

c

A circle with circumference of 17 \pi \,\text{cm}.

d

A circle with circumference of 14 \,\text{cm}.

16

Calculate the diameter of the following circles, correct to two decimal places:

a

A circle with circumference of 37 \text{ cm}.

b

A circle with circumference of 44 \text{ cm}.

c

A circle with circumference of 70 \text{ cm}.

d

A circle with circumference of 24.5 \text{ cm}.

17

Complete the following table that lists the exact radii, diameters, and circumferences of various circles:

Radius (cm)Diameter (cm)Circumference (cm)
Circle 124
Circle 28
Circle 382
Circle 4340
18

Consider the given circle:

a

Find the diameter D, correct to two decimal places.

b

Find the radius r, correct to two decimal places.

Applications
19

The bottom of a flower pot has a radius of 16 \text{ cm}. Find the circumference of the bottom of the flower pot, correct to one decimal place.

20

A scooter tyre has a diameter of 34 \text{ cm}. Find the circumference of the tyre, correct to one decimal place.

21

Find the circumference of the Ferris wheel, correct to one decimal place.

22

Find the length of the strip of seaweed around the outside of the sushi shown. Round your answer correct to one decimal place.

23

A coin has a diameter of 2.2 \text{ cm}. If the coin is rolled through 45 complete revolutions, find the distance it will travel. Round your answer to one decimal place.

24

A circular running track has a diameter of 23 \text{ m}. How many laps must be completed to run 1600 \text{ m}? Round your answer to one decimal place.

25

The diameter of the front wheel of a car is 0.4 \text{ m}. How many complete revolutions will the wheel make if the car travels a distance of 50 \text{ km}?

26

The wheel of Roxanne's bicycle has a radius of 22 cm. How far would she cycle if the wheels made 250 complete revolutions? Give your answer in metres, correct to one decimal place.

27

Carl is performing an experiment by spinning a metal weight around on the end of a nylon thread. How far does the metal weight travel if it completes 40 revolutions on the end of a 0.65 \text{ m} thread? Round your answer to one decimal place.

28

A shallow circular wading pool has a diameter of 4 \text{ m}. A deeper circular swimming pool has a radius of 16 \text{ m}. How many times greater is the circumference of the swimming pool than the wading pool?

29

A record has a diameter of 30 \text{ cm} and is played at a speed of 33\dfrac{1}{3} revolutions per minute. Through what total distance will a point on the rim of the record travel if the record takes 28minutes to play? Give your answer in metres, correct to one decimal place.

30

A satellite is orbiting the Earth at a height of h \text{ km} above the Earth's surface. In one complete orbit, the satellite travels a distance of 41\,664 \text{ km}. If the radius of the Earth is 6400 \text{ km}, find the height of the satellite above the Earth. Round your answer to one decimal place.

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Outcomes

MA4-12MG

calculates the perimeters of plane shapes and the circumferences of circles

MA4-13MG

uses formulas to calculate the areas of quadrilaterals and circles, and converts between units of area

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