e pl m sa ft
Higher
ra
MATHEMATICS
D
GCSE for OCR Student Book
Karen Morrison, Julia Smith, Pauline McLean, Rachael Horsman and Nick Asker
ΓΒ© Cambridge University Press 2015
10 Fractions GCSE Mathematics for OCR (Higher)
In this chapter you will learn how to β¦ β’ recognise equivalence between fractions and mixed numbers. β’ carry out the four basic operations on fractions and mixed numbers. β’ work out fractions of an amount.
e
or more resources relating F to this chapter, visit GCSE Mathematics Online.
pl
Using mathematics: real-life applications
m
Nurses and other medical support staff work with fractions, decimals, percentages, rates and ratios every day. They calculate medicine doses, convert between different systems of measurement and set the patientsβ drips to supply the correct amount of fluid per hour.
sa
βI have to work out a treatment plan for patients who are going to have radiation treatment for various cancers. The patient has to receive a certain fraction of the total dose of radiation at each treatment session.β (Oncologist)
ft
Before you start β¦
18 24 27 28 30 32 36
ra
Ch 2 Check that you can find common factors of sets of numbers.
1 From this set of numbers, choose numbers that have: a a common factor of 9. b common factors 2 and 3. c common factors 3, 4, and 12. d common factors 4 and 8. 2 Choose the lowest common multiple of each set of numbers. a 5 and 10 Aβ15 Bβ50 Cβ10 Dβ20 b 8 and 12 Aβ12 Bβ96 Cβ36 Dβ24 c 2, 3 and 5 Aβ1 Bβ30 Cβ10 Dβ6
Ch 1 Know the correct order for performing operations (BIDMAS).
3 Which calculation is correct in each pair? Why?
D
Ch 2 Find the lowest common multiple of sets of numbers.
Student A a
3223 62455 2 b 60 4 5 1 3 3 24 2 8 5 28 c 13 2 2 3 26 2 5 3 4 5 80
174
2
2
Student B
3 2 2 3 26 2 4 5 50 2 60 4 5 1 3 3 24 2 8 5 232 13 2 2 3 26 2 5 3 4 5 5 2
Β© Cambridge University Press 2015
10βFractions
Assess your starting point using the Launchpad Step 1 1 Which fraction does not belong in each set? 3 1 ___ 6 5 4 ___ ββ― β―β―ββ,β― __ βββ― β―βββ―, βββ― β―β―βββ―, βββ―___β―β―ββ,β―βββ―___β―β―βββ― a β 15 5 30 35 20
e
4 8 ___ 12 9 52 __ b β ββ― β―βββ―, ___ βββ― β―β―ββ,β― βββ― β―βββ―, βββ―___β―β―ββ,β―___ βββ― β―βββ― 7 14 21 16 91 33 18 22 11 _3 ___ ββ―___β―ββ,β―___ β―ββ― c β βββ― β―ββ,β― β2ββ― β―ββ,β― βββ― β―ββ,β― 2βββ―__ 10 4 4 12 24
pl
Go to Section 1: Equivalent fractions
β
m
Step 2
2 Each calculation contains a mistake. Find the mistake and write the correct answer. 4 9 1 __ b β ββ― β―βββ―2 ___ βββ― β―β―ββ β―5 ___ ββ―β β―β―ββ β― 5 10 10 1 d 30 4 ββ―__ β β―βββ―5 15 2
sa
5 2 3 __ __ ββ― β―ββ―β 1 __ βββ― β―βββ―5 ββ―β β―ββ―β a β 3 4 7 6 2 4 c β ββ―__β―βββ―3 βββ―__β―βββ―5 ββ―___ β β―β―βββ― 7 5 35
β
Go to Section 2: Operations with fractions
Step 3
ra
ft
3 Which is greater in each pair? 3 5 a βββ―__β―β―ββ of 40 or βββ―__β―β―ββ of 60 5 8 3 7 b βββ―__β―βββ― of 240 or βββ―___β―β―ββ β―of 300 4 10 1 1 1 3 βββ― β―βββ― or __ βββ― β―βββ― of __ βββ― β―βββ― c βββ―__β―βββ― of __ 4 2 2 4
D
4 If you have read 45 pages of a 240 page book, what fraction of the book remains unread? 5 What fraction of 30 minutes is 45 seconds?
β
Go to Section 3: Finding fractions of a quantity
Go to Chapter review
Find answers at: cambridge.org/ukschools/gcsemaths-studentbookanswers
175
GCSE Mathematics for OCR (Higher)
Section 1: Equivalent fractions Equivalent fractions represent the same value. 16 βββ―2β―βand ___ ββ― β―β―βare equivalent. ββ―1β―,ββ __ For example, __ 4 8 64 You can find equivalent fractions by multiplying the numerator and denominator by the same number. You can also find equivalent fractions by dividing the numerator and denominator by the same number (cancelling).
e
This is known as simplifying, or reducing the fraction to its simplest terms.
When you give an answer in the form of a fraction, you usually give it in its simplest form. 6 1 4β―ββββββ 5 1 ___ ββ―12β―β―ββ5βββ―__ 3ββ―__ β―β―ββ5β3ββ―_β―ββ ββ―___β― β―β―ββ5βββ―__β―ββββββ 30 6 18 3 27 9
pl
Fractions: β’ belong to the set of real numbers (numbers that can be found on a number line). a β’ are written in the form βββ―__β―βββ― where b is not b equal to zero. β’ are rational numbers (they can also be written as terminating or recurring decimals). β’ a proper fraction is one where the numerator is smaller than the denominator. β’ an improper fraction is one where the numerator is larger than the denominator; these can also be written as mixed numbers. β’ a mixed number is written as an integer and a fraction, e.g. 2βββ―_12β―β―ββis a mixed number.
When you are asked to compare fractions that look different, you can write them both with a common denominator so that you can compare them by size, or you can cross multiply to find out whether they are equivalent or not.
m
Tip
Key vocabulary
Worked example 1
sa
common denominator: a number into which all the denominators of a set of fractions divide exactly.
Are the following pairs of fractions equivalent? 5 7 45 __ a β ββ― β―βand __ ββ― β―ββ b 3βββ―_34β―ββ and __ βββ― β―β―ββ 6 8 12 Method 1: Using common denominators
ft
20β―β―βand __ 21β―β―β __ a β ββ―5β―ββ 5βββ―__ ββ―7β―ββ 5βββ―__ 6 24 8 24
7β―β __ ββ―5β―ββ 3β ββ―__ 6
8
D
ra
Write both fractions with the same denominator by finding the lowest common multiple, and then multiplying each numerator accordingly, i.e., 6 3 4 5 24 so multiply 5 by 4 as well; 8 3 3 5 24, so multiply 7 by 3 as well.
Method 2: By cross multiplying
__ β―7β―β ββ―5β―ββ ?ββ__
6
8
When the fractions have the same denominator it is easy to see whether they are equivalent. It is also easy to compare them by size. Write the fractions back in their original form when writing your answer.
40 ? 42
5 3 8 5 40 6 3 7 5 42
Cross multiplying a fraction converts it a c βββ― β―β―ββ from the form __ βββ― β―ββ 5 __ b d to the form ad 5 bc. If the resulting equation is not equal then the two fractions are not equivalent.
[ the fractions are not equivalent. 5 7 40 is smaller than 42, so __ ββ― β―ββ,βββ―__β―ββ. 6 8 This is a useful strategy for comparing the size of fractions.
Continues on next page β¦
176
Β© Cambridge University Press 2015
10βFractions
Method 1: Using common denominators
15 Here, you can write __ ββ― β―ββ―βwith a 4 45 denominator of 12, or write ββ―__β―β―βwith a 12 denominator of 4 to find a common denominator, rather than finding the LCM.
ββ―15β― β―ββ 3βββ―__34β―ββ 5 __ 4
Write the mixed number as an improper fraction.
45β―β―ββ 15β― β―βββ 3 ββββ―__ ββ―__ 4 12
15 3 12 5 120 1 60 5 180 4 3 45 5 2 3 90 5 180
180 5 180
[ the fractions are equivalent.
m
Exercise 10A
1 Determine whether the following pairs of fractions are equivalent (5) or
not (Β±). 3 __ a β ββ―2β―βand __ ββ― β―ββ 4 5
3 8
9 15
10 25
__ e β ββ― β―βand __ ββ― β― β―β―ββ
5 12
c β ββ―__β―βand __ ββ― β― β―β―ββ
6 24
4 10
__ f β ββ― β―β―βand __ ββ― β― β―β―ββ
2 11
1 10
11 9
121 99
d β ββ―__β― β―β―βand __ ββ― β― β―β―β
5 20
g β ββ―__β― β―β―βand __ ββ― β― β―β―ββ
h β ββ―__β―ββ―βand ___ ββ― β―ββ―β
sa
3 5
3 4
2 3
b βββ―__β―βand __ ββ― β―ββ
1 4
e
45β―β―ββ 15β― β―ββ 5βββ―__ ββ―__ 4 12
Write the mixed number as an improper fraction. Remember, to convert a mixed number to an improper fraction, you multiply the integer part by the denominator and then add the numerator.
pl
b 3βββ―__34β―ββ 5 __ ββ―15β― β―β 4
Method 2: By cross multiplying
Tip You can use the LCM of the denominators to find a common denominator, but any common denominator works (not just the lowest).
2 Find the equivalent fractions of βββ―__β―β―ββ with: a denominator 32 c numerator 27
b numerator 48
d denominator 52
3 How could you use cross multiplication to find the missing values in
ft
examples like these? 3 18 __ a β ββ― β―ββ5βββ―___β―β―ββ β― 5
2 17
b βββ―___β―ββ―β5βββ―__β― β―β―β
51
ra
4 Reduce the following fractions to their simplest form.
3 15 __ e β ββ― 4β― β―β―β 12 2 14 ____ i βββ― 2 β―ββ β― 21
4 6 2 7 f βββ―___β―β―ββ 21 18 j β ββ―__β―β―β 27
D
__ a β ββ― β― β―β―ββ
b β ββ―__β―ββ
25 100 36 g βββ―____ β―β―ββ β― 2 24 15 __ k β ββ― β―β―ββ 21
c β ββ―___β―β―β―ββ
5 10 60 h β ββ―___β―β―β―β 100 2 18β―βββ― l βββ―____ 2 42 d β ββ―__β― β―β―β
5 Write each set of fractions in ascending order.
3 1 9 5 4 4
4 7
__ a β ββ― β―β,β ββ―__β―β,β ββ―__β―β,β 1ββ―_34β―β,β ββ―__β―ββ
5 3 11 19 6 4 3 24
b β ββ―__β―β,β ββ―__β―β,β ββ―__β―ββ―,β ββ―__β―β―,β β 2ββ―_23β―ββ
3 1 7 8 10 13 7 7 7 14 21 7
c β 2ββ―__β―,β β ββ―__β―β,β ββ―__β―β,β ββ―__β― β―β―β,β ββ―__β―β―,β β ββ―__β―ββ―β
6 A mediant fraction is a fraction that lies between two other fractions.
They follow the general rule: c aβ1βc a ββ― β―ββ―are two fractions, then the fraction ____ ββ― β― β―ββ―lies between them If ββ―__β―βand __ b d bβ1βd c a aβ1βc __ β―βββ―,βββ― β―β―βββ. ββ― β―ββ,βββ―____β― such that __ b bβ1βd d Find answers at: cambridge.org/ukschools/gcsemaths-studentbookanswers
Tip Mediant fractions should not be confused with the median value in a set of data. These concepts are not related.
177
GCSE Mathematics for OCR (Higher)
a Use this general rule to find a fraction between: 3 9 4β―βββandββ 1β―βββandββ __ __ ββ― β―ββ ii β ββ―__ ββ― β― β―β―β ββ―__ i β 4 5 5 11 b Show how you could apply the rule to find three fractions between 3 1β―βββandββ __ ββ― β―ββ. ββ―__ 4 3 c Test your results to show that the answers are correct. d How does this work?
Section 2: Operations with fractions
e
Find out what you can and try to explain the general rule in simple terms.
pl
You have already learnt in earlier school years how to add, subtract, multiply and divide fractions and mixed numbers.
Read through the examples to remind you of the key rules for operations on fractions.
m
Multiplying fractions
To multiply fractions multiply the numerators and then multiply the denominators. If possible, cancel before you multiply to make the calculations easier. Worked example 2
2 7
sa
3 4
βββ― β―βββ― a βββ―__β―βββ― 3 __
3β 3β2β―βββ― β5βββ―_____ 4β 3β7 5 ___ βββ― 6β― β―βββ― 28
Tip
3 14
5 ___ βββ― β― β―ββ
Give the answer in its simplest form.
ft
Cancelling in the first step means you donβt have to simplify the fraction to get an answer. 3 3 __ 21 __ ββ βββ―ββββ― β―βββ― 2βββ― β―βββ― 3 4 7 3 1 5 3 3 __ βββ― β―βββ― 3 7 5 ___ βββ― β―β―ββ β― 14 2
Multiply numerators by numerators and denominators by denominators.
5 7
b βββ―__β―β―ββ 3 3
ra
5β 3β3 5βββ―_____β―ββ― 7β 3β1 15 7
5 ___ βββ― β―ββ
D
5 2βββ―__β―βββ― 1 7
15 ___ βββ― β―βββ―cannot be simplified further but it can be
7 written as a mixed number.
3 8
c βββ―__β―β―ββ 3 4βββ―_12β―ββ
__ βββ― 3β―βββ― 3 __ βββ― 9β―ββ
8
2
27 16
5 ___ βββ― β―β―ββ 5 1βββ―__β―βββ― 11 16
178
Think of a whole number as a fraction with a denominator of 1.
Rewrite the mixed number as an improper fraction. 27 ___ βββ― β―βββ―cannot be simplified but it can be written as a
16 mixed number.
Β© Cambridge University Press 2015
10βFractions
Adding and subtracting fractions To add or subtract fractions they must have the same denominators. Find a common denominator and then find the equivalent fractions before you add or subtract the numerators. Worked example 3
1 2
1 4
1 4
Use 4 as a common denominator. Write __ βββ―1β―βββ― as its 2 2β―β―ββ. equivalent βββ―__ 4
3 4
5 __ βββ― β―ββ
Add the numerators. 5 6
c 2βββ―_34β―ββ 2 1βββ―_57β―ββ
Rewrite mixed numbers as improper fractions. Find a common denominator.
sa
5 5 2 6 5β―βββ― 5 ___ βββ― 15β―ββ―β 1βββ―__ 6 6 5 ___ βββ― 20β―βββ― 6 5 ___ βββ― 10β―βββ―or 3βββ―__13β―βββ― 3 5 __ βββ― β―ββ―β 1βββ―__β―ββ
Add the numerators. Simplify the answer.
11 4
12 7
Rewrite mixed numbers as improper fractions.
77 28
48 28
Find a common denominator.
ft
5 ___ βββ― β―ββ―β 2βββ―___β―ββ
2 Think of βββ―__β―βββ― as 2 lots of 4ths, 4 1 and __ βββ― β―βββ― as 1 lot of 4ths. If you 4 combine them, you have 3 lots of 3 4ths, or __ βββ― β―βββ―. You never add the 4 denominators.
m
b 2βββ―_12β―ββ 1 __ βββ― β―ββ
Tip
pl
2 4
5 __ βββ― β―ββ―β 1βββ―__β―β―ββ
e
βββ― β―βββ― a βββ―__β―βββ― 1 __
ra
5 ___ βββ― β―β―ββ 2βββ―___β―β―ββ
29 28
5 ___ βββ― β―β―ββ or 1βββ―__β― β―ββ
Subtract the numerators. Simplify and write the number as mixed number.
D
1 28
Dividing fractions To divide one fraction by another fraction you multiply the first fraction by the reciprocal of the second fraction. To find the reciprocal of a fraction you invert it. 7 4 3 4 βββ― β―βββ― and the reciprocal of __ βββ― β―βββ― is __ βββ― β―βββ―. So, the reciprocal of __ βββ― β―βββ― is __ 4 3 4 7 The reciprocal of a whole number is a unit fraction. βββ― 1β― β―βββ―. For example, the reciprocal of 3 is __ βββ―1β―βββ― and the reciprocal of 12 is ___ 3 12 Find answers at: cambridge.org/ukschools/gcsemaths-studentbookanswers
Key vocabulary reciprocal: the reciprocal of a
1 number, x, is 1 divided by x, i.e. βββ―__ xβ―βββ―. Any number multiplied by its
a reciprocal is 1. For a fraction __ βββ― β―βββ―, b b β―ββ . the reciprocal is βββ―__ β― a
179
GCSE Mathematics for OCR (Higher)
Worked example 4
3 4
1 2
βββ― β―βββ― a βββ―__β―βββ― 4 __ Multiply by the reciprocal of __ βββ―1β―βββ―, i.e. invert the 2β―β―ββ and multiply. 2 fraction to βββ―__ 1
5 __ βββ― β―βββ― 3 __ βββ― β―ββ
3 2 4 1 5 __ βββ― 64β―βββ― 5 __ βββ― 32β―βββ― or 1βββ―__12β―ββ
e
b 1βββ―_34β―ββ 4 2βββ―_13β―ββ 5 __ βββ― β―βββ― 4 __ βββ― β―ββ
Convert mixed numbers to improper fractions.
5 __ βββ― β―ββ―β 3βββ―__β―ββ
7 Multiply by the reciprocal of __ βββ― β―βββ―. Cancel the 7s. 3
7 4 3 __ 5 βββ― β―βββ― 4
pl
7 3
3 7
6 7
c βββ―__β―β―ββ 4 3 5 __ βββ― β―βββ― 3 __ βββ― β―ββ
Multiply by the reciprocal of 3.
sa
6 1 3 7 6 __ 5 βββ― β― β―βββ― 21 2 __ 5 βββ― β―βββ― 7
m
7 4
The rules for order of operations and negative and positive signs also apply to calculations with fractions.
Exercise 10B 1 Simplify.
3 4
2 5
1 5
3 8
2β5
D
ra
__ e β ββ― β―ββ3βββ―__β―ββ3βββ―___ β― β―ββ
Tip
Remember that addition and subtraction are inverse operations.
4 25
9
3 5
2
7 8
2
__ i β ββ― β― β―β―ββ3βββ―___β―ββ―β3βββ―___β―ββ
1 2
1 4
1 5
1 9
2 3
2
b β ββ―__β―ββ3βββ―__β―ββ
ft
__ a β ββ― β―ββ3βββ―__β―ββ
3 4
4β―ββ β― __ f β ββ― β―ββ3βββ―___β―ββ―β3βββ―___ 9 20
10 11
2
5
1 12
j β ββ―__β― β―β―ββ3βββ―__β―β―ββ3βββ―__β― β―β―ββ
5 8
5 7
1 5
1 2
2 3
7 10
c β ββ―__β―ββ3βββ―__β―ββ
4 11
3 7
2 7
1 2
5 1 k β 1_ββ― 29β―ββ3β1ββ―__ β―β―ββ3β1ββ―_β―ββ 22 6
l β ββ―__β―ββ1βββ―__β―β
1 3
15 6
m β__ ββ― β―ββ1βββ―__β―ββ
n β ββ―__β―ββ2βββ―__β―ββ
o β ββ―__β―ββ2βββ―__β―ββ
p β 4ββ―_34β―ββ1βββ―__β―ββ―β
q β 8ββ―_25β―ββ2β3ββ―_12β―ββ
9 r β 7_ββ― 14β―ββ2β2ββ―__ β―β―ββ 10
s 9 β ββ―_37β―ββ2β2ββ―_45β―ββ
t β ββ―__β―ββ4βββ―__β―β
w β3ββ―_15β―ββ4β2ββ―_12β―ββ
x β 1_ββ― 78β―ββ4β2ββ―_34β―ββ
1 8
7 9
u β ββ―__β―ββ4βββ―__β―ββ
2 11
23
__ v β ββ― β― β―β―ββ4βββ―___β―ββ
5
1 4
7 2 What should be added to β4ββ―_35β―ββto get β9__ ββ― 20 β―β―ββ?
1 6
5 4 Subtract the product of βββ―__β―β―ββ and β20ββ―_47β―βββ― from the sum of β4_ββ― 79β―βββ― and β5__ ββ― 18 β―β―βββ―.
Β© Cambridge University Press 2015
2 3
h β ββ―__β―ββ3βββ―__β―ββ3βββ―__β―β
3 What should be subtracted from β13ββ―_34β―β―ββto get β5_ββ― 13β―βββ―?
180
5 8
g β ββ―__β―ββ3βββ―__β―ββ3βββ―__β― β―β―ββ
7 9
1 4
2 3
d β ββ―__β― β―β―ββ3βββ―__β―β
1 4
10βFractions
5 Simplify:
1 3
Tip
c β ββ―__β―ββ3ββ(__ ββ― β―ββ1β6β4βββ―__β―)β ββ1β5β3βββ―__β―β
7 1β―ββ2β(2ββ―_1β―ββ―β2βββ―__ b 2 β ββ―__ β―β)β 5
3 7
2 2 8 8 3 3 5 1 __ 5 1 3 5 1 d 2 β ββ―_78β―ββ―β1β(8ββ―_14β―ββ―β2β6ββ―_38β―ββ―)β e __ ββ― β―ββ3βββ―__ β―ββ1βββ― β―ββ3βββ―__ β―ββ f ββ(5β4βββ―__β― β―β―ββ2βββ―__β― β―)β―β ββ3βββ―__β―β 6 4 8 3 6 11 12 5 15 5 1 3 3 2β―ββ2βββ―__ 1β―β ββ3βββ―__ 2β―β g ββ(__ ββ― β―ββ4βββ―__β―ββ―)ββ2ββ(__ ββ― β―ββ3βββ―__ β―β ββ h ββ(2ββ―_23β―ββ―β4β4β2βββ―__β― β―β―)β ββ3βββ―__β― β―β―ββ i ββ(7β4βββ―__ 8 4 6 5) 9 3) 3 10 17 5 27 6 2 5 24 __ j β(__ ββ― β―ββ3βββ―__β―β―ββ)β4βββ―__β―ββ1βββ―__ β―ββ k β 1_ββ― 23β―ββ4βββ―__β―ββ3βββ―__ β―β―ββ3βββ―1β―β 9 35 9 3 6 35 3 3 __ 3 7 1β―βββ― 3 20 __ l β 2ββ―_19β―ββ1ββ 3ββ―__ β―5β― β―β―ββ2ββ(ββ―__ β― β―β―ββ2βββ― β―ββ 2 β βββ―__ β βββ―__β―β ββ [ 27β―ββ1ββ{ββ―14 35 7 ) 5 } 9 ]
Remember the rules for order of operations apply to fractions as well. Simplify brackets first, then powers, then multiplication and/ or division, then addition and/or subtraction. When there is more than one set of brackets, work from the inner ones to the outer ones.
pl
6 Kevin is a professional deep-sea diver.
2 7
e
2 3
a β4β1βββ―__β―ββ3βββ―__β―ββ
He needs to keep track of how much time he spends underwater to make sure he has enough air left in his tank.
2 3 and the rest is paved.
1 5
m
If he spends β9ββ―_34β―βββ― minutes swimming to a wreck, β12ββ―_56β―β―ββminutes exploring the wreck and β3ββ―_56β―βββ― minutes examining corals, how much time has he spent underwater in total? 7 In a public park, βββ―__β―β―ββof the area is grassed, __ βββ― β―βββ― is taken up by flower beds
sa
How much of the park area is paved?
23 8 The perimeter of a quadrilateral is β18ββ―__ β―ββββ―m. 60
2 ββ― 15 β―β―ββββ―m, find the length of If the lengths of three sides are β6_ββ― 16β―ββββ―m, β7_ββ― 23β―ββββ―m and β1__ the other side.
7 30 The water has to be removed by a piece of equipment that draws out the 3 water at a rate of βββ―__β―βββ― of a litre per minute. 5 How long will it take to remove all the water?
ft
9 A tank contains βββ―___β― β―βββ―of a litre of water.
ra
10 There are β1ββ―_34β―βββ― cakes left over after a party.
These are shared out equally among six people. What fraction does each person get? 2 15
11 If I have β5ββ―_23β―βββ― litres of juice, how many cups containing ___ βββ― β― β―βββ―of a litre can
D
I pour?
12 Nico buys six trays of chicken pieces for his restaurant.
Each tray contains β2ββ―_12β―ββββ―kg of chicken. 3 Each chicken meal served uses __ βββ― β―ββββ―kg of chicken. 8 How many meals can he serve?
13 A mountaineer inserts a bolt into the rock face every β5ββ―_34β―ββββ―metres she climbs.
If she uses 32 bolts, what is the maximum height she has climbed? Find answers at: cambridge.org/ukschools/gcsemaths-studentbookanswers
181
GCSE Mathematics for OCR (Higher)
14 Ted has marked out three lengths of wood.
2β―β―ββof the length of B, and length B is β1_ββ― 1β―βββ― times as long as A. Length C is βββ―__ 3 3 97 ___ What is the length of piece C if A is βββ― β―ββββ―m long? 3 15 Triangle ABC is isosceles with a perimeter
B
of β12ββ―_34β―ββββ―cm.
2 11 12 cm
A
e
Find the length of sides AB and AC given 11 β―ββββ―cm. that BC is β2ββ―__ 12
C
2 9
pl
16 What is the length of the side of a square of perimeter β9ββ―_37β―ββββ―m?
1 6
17 On a holiday weekend Salma read βββ―__β―β―ββof her book on Saturday, __ βββ― β―βββ― on
m
5 βββ― β― β―βββ―on Monday. Sunday and ___ 12 a What fraction of the book does she still have to read?
b If there are still 49 pages left for her to read, how many pages were in the book?
sa
Section 3: Finding fractions of a quantity Expressing one quantity as a fraction of another
It is easy to express one quantity as a fraction of another if you remember that the numerator in a fraction tells you how many parts of the whole quantity you are dealing with.
ft
The denominator represents the whole quantity. 3 βββ― β―βββ― means you are dealing with 3 of the 5 parts that make up the whole. So, a fraction of __ 5 Worked example 5
ra
a What fraction is 20 minutes of 1 hour?
b Express 35 centimetres as a fraction of a metre.
a 20 minutes is part of 60 minutes. ___ βββ― 20β―β―ββ 5 __ βββ― 2β―βββ― 5 __ βββ― 1β―βββ― of an hour.
6
3
D
60
b 35βcm is part of 100βcm. ____ βββ― 7β― β―βββ―of a metre. βββ― 35β―β―βββ―5 ___
100
20
20 minutes is the part of the whole, so it is the numerator. The hour is the whole, so it is the denominator. You cannot form a fraction using one unit for the numerator and another for the denominator, so you need to convert the hour to minutes. 35βcm is the part of the whole, so it is the numerator. The metre is the whole, so it is the denominator. Again, you cannot use centimetres and metres in the same fraction, so you convert 1βm to 100βcm.
To write a quantity as a fraction of another quantity make sure the two quantities are in the same units and then write them as a fraction and simplify.
182
Β© Cambridge University Press 2015
10βFractions
Exercise 10C 1 Calculate.
3 __ __ a __ βββ― β―βββ― of 12 b βββ― 1β―βββ― of 45 c βββ― 2β―βββ― of 36 4
3
9
5 8 3 3 3 3 1 1 __ __ g __ βββ― β―βββ― of __ βββ― β―βββ― h βββ― β―βββ― of ___ βββ― β― β―βββ― i βββ― 4β―βββ― of ___ βββ― β― β―βββ― 2 4 3 10 9 14 3 5 __ __ j __ βββ― 1β―βββ― of 2βββ―_12β―βββ― k βββ― β―βββ― of 2βββ―_13β―βββ― l βββ― β―βββ― of 3βββ―_12β―βββ― 4 4 6 2 Calculate the following quantities.
3 3 __ __ a __ βββ― β―βββ― of Β£28 b βββ― β―βββ― of Β£210 c βββ― 2β―βββ― of Β£30
e
3 __ __ d __ βββ― β―βββ― of 144 e βββ― 4β―βββ― of 180 f βββ― 1β―βββ― of 96
m
pl
4 5 5 __ __ d __ βββ― 2β―βββ― of Β£18 e βββ― 1β―βββ― of 3 cups of sugar f βββ― 1β―βββ― of 5 cups of flour 3 2 2 3 1 1 1 __ _ __ _ __ g βββ― β―βββ― of 1βββ― 2β―βββ― cups of sugar h βββ― β―βββ― of 2βββ― 3β―βββ― cups of flour i βββ― 2β―βββ― of 1βββ―_12β―βββ― cups of sugar 4 2 3 3 2 1 1 __ __ j __ βββ― β―βββ― of 4 hours k βββ― β―βββ― of 2βββ―_2β―βββ― hours l βββ― β―βββ― of 5 hours 4 3 3 3 3 __ ___ m __ βββ― 1β―βββ― of __ βββ― β―βββ― of an hour n βββ― 2β―βββ― of 3βββ―_12β―βββ― minutes o βββ― β― β―βββ―of a minute 3 4 3 15
sa
3 Express the first quantity as a fraction of the second.
a 12p of every Β£1 b 35βcm of a 2βm length
c 12βmm of 30βcm d 45 minutes per 8 hour shift e 5 minutes per hour f 150βm of a kilometre g 45 seconds of 30 minutes h 575βml of 4 litres
4 Nick earns Β£18β000 per year. His friend Samir earns Β£24β000 per year.
What fraction of Samirβs salary does Nick earn?
ft
5 The floor area of a room is 12βm2. Pete buys a rug that is 110βcm wide and
160βcm long.
ra
What fraction of the floor area will be covered by this rug? 6 A technical college has 8400 books in their library.
3 1β―β―ββare general reference books, __ βββ― β―βββ― are technology related, ___ βββ― 4β― β―βββ―are Of these, βββ―__ 7 7 35 engineering related and the rest are computer related. Find the total number of books in each subject category.
D
7 A section of road β1ββ―_12β―ββββ―km long is to be tarred.
3 __ βββ― β―βββ― in week 2 and the rest is to be completed in week 3. βββ― 1β―βββ― is tarred in week 1, __
5 6 Calculate the length of road tarred each week.
1 6 3 βββ― β―βββ― are travelling in βββ―1β―βββ― are travelling business class, __ travelling first class, __ 4 8 economy class and the rest are using no-frills, low-cost tickets.
8 Of 60β000 people passing through a major airport in one week, __ βββ― β―βββ― are
Work out the number of people travelling in each class. Find answers at: cambridge.org/ukschools/gcsemaths-studentbookanswers
183
GCSE Mathematics for OCR (Higher)
Exercise 10D The Ancient Egyptians believed that anything other than a unit fraction was unacceptable (a unit fraction has a numerator of 1). So they wrote all fractions as the sum or difference of unit fractions.
e
The sum or difference always started with the largest possible unit fraction and they did not allow repetition. 1β―β―ββ and not as __ 1β―β―ββ. βββ―1β―ββ―β1βββ―__ βββ― 1β―ββ―β1βββ―__ So, for example, __ βββ―2β―βββ― would be written as __ 3 2 6 3 3 1 Try to write each of the following as the sum or difference of unit
3 5
b βββ―__β―β―ββ
2 7
c βββ―__β―β―ββ
2 9
d β ββ―__β―ββ
3 10
e βββ―___β― β―ββ
pl
fractions: 5 a βββ―__β―ββ β― 8
2 5
2 Find three unit fractions that have a sum of βββ―__β―β―ββwhen added together.
1 9 of 4 and which has three additional factors.
m
3 Find a unit fraction greater than βββ―__β―β―ββwith a denominator that is a multiple
4 Can all fractions be written as the sum or difference of unit fractions?
sa
Justify your answer.
Checklist of learning and understanding
Equivalent fractions
Fractions that represent the same amount are called equivalent fractions.
ft
You can change fractions to their equivalents by multiplying the numerator and denominator by the same value or by dividing the numerator and denominator by the same value (simplifying).
ra
Operations on fractions
D
To add or subtract fractions, find equivalent fractions with the same denominator, then add or subtract the numerators; the denominators do not get added or subtracted. To multiply fractions, multiply numerators by numerators and denominators by denominators. To divide fractions, multiply the fraction being divided by the reciprocal of the divisor.
Fractions of a quantity The word βofβ means multiply; so to find a fraction of an amount, you multiply that amount by the fraction. A quantity can be written as a fraction of another as long as they are in the same units. Write one quantity as the numerator and the other as the denominator and simplify.
184
Β© Cambridge University Press 2015
10βFractions
Chapter review
or additional questions on F the topics in this chapter, visit GCSE Mathematics Online.
1 Simplify.
15 195 18 ____ a ___ βββ― β―βββ― b βββ― 4βββ―__ β―βββ― β―βββ― c 48 90
230
2 Write each set of fractions in ascending order.
8 4 __ 5 3 23 16 a __ βββ― β―βββ―, __ βββ― β―βββ―, βββ― β―βββ―, __ βββ― β―βββ― b 2βββ―_25β―βββ―, ___ βββ― β―βββ―, 1βββ―_35β―βββ―, ___ βββ― β―βββ― 7
9
3 Evaluate.
7 3 1 7 3 1 7 3 __ __ a __ βββ― β―ββ―β1βββ―__β―β―ββ2βββ―__ β―β―ββ b βββ― β―ββ―β3βββ―__β―β―ββ1βββ―__ β―β―ββ c βββ― β―ββ―β4βββ―__β―β―ββ3β3β 5
8
5
2
8
5
2
8
pl
3 1 2 __ d β3_ββ― 17β―ββ1β2ββ―_25β―βββ― e β3__ ββ― 15 β―β―ββ―β2β1ββ―_35β―βββ― f βββ― 1β―βββ― β ofβ β3__ ββ― 11 β―β―ββ1βββ―__β―β―ββ
e
9 5 6 7
4 Simplify.
m
7 4 8 3 5 3 2 2 1 __ g __ βββ― β―ββ―β3βββ―___β― β―ββ―β4β3β h β28β4βββ―__β―β―ββ2βββ―__β―β―ββ i βββ― β―βββ― β ofβ __ βββ― β―ββ―β2βββ―__β―β―ββ 7 18 4 7 4 8 9 3 13 5 3 7 a ββ(__ ββ― β―ββ― 4 ___ ββ― β―ββ―)ββ 1 (ββ __ ββ― β―ββ― 3 __ ββ― β―ββ―)ββ b 2βββ―_23β―βββ― 3 ββ(8 4 __ ββ― 4β―ββ― 1 __ ββ― β―ββ―)ββ
7 8 2β―β―ββ2βββ―__ 1β―β―ββ ββ3βββ―__ 2β―β―ββ 11 c β4_ββ― 25β―ββ―β1β3ββ―_12β―ββ―β1β5ββ―_56β―ββ―β2β4ββ―__ β―ββ―β1β2ββ―_79β―βββ― d ββ(7β4βββ―__ 12 9 3) 3 8
4
9
5
sa
5 a Express 425βg as a fraction of 2βββ―_12β―ββββ―kg.
b Express 12β000βg as a fraction of 40βkg. 6 Sandy has 12βββ―_12β―βββ― litres of water.
3 βββ― β―βββ― litre can she fill? How many bottles containing __ 4
7 A surveyor has to divide a 15βkm2 area of land into equal plots each
ft
βββ― 1β―ββββ―km2. measuring __ 2 How many plots can she make?
ra
2 8 A vertical ladder β7ββ―__ β―β―ββββ―m long is lowered into a manhole. 10
D
15 If ___ βββ― β―βββ―parts of the ladder are outside the manhole when the bottom of 32 the ladder touches the ground, how deep is the manhole?
Find answers at: cambridge.org/ukschools/gcsemaths-studentbookanswers
185