W1 - Lesson 3: Improper Fractions and Mixed Numbers€¦ · To change a fraction into a decimal...
Transcript of W1 - Lesson 3: Improper Fractions and Mixed Numbers€¦ · To change a fraction into a decimal...
Mathematics Grade 6
W1 - Lesson 3: Improper Fractions and Mixed Numbers
V5-07
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Mathematics Grade 6Version 5Preview/Review W1 - Lesson 3
Publisher: Alberta Distance Learning CentreAuthor: Elgin PawlakIn-House Teacher: Sue Rees
Project Coordinator: Dennis McCarthyPreview/Review Publishing Coordinating Team: Nina Johnson, Laura Renkema, and Donna Silgard
W1 - Lesson 1 ............................................................. Basic Facts, Basic Operations, and IntegersW1 - Lesson 2 ............................Place Value, Whole Numbers, Decimals, and Common FractionsW1 - Lesson 3 ..................................................................Improper Fractions and Mixed NumbersW1 - Lesson 4 ....................................................................................................Ratios and PercentsW1 - Lesson 5 ...........................................................................Number Operations with DecimalsW1 - QuizW2 - Lesson 1 ........................................................... Factors, Multiples, and Prime FactorizationsW2 - Lesson 2 ................................................................................................. Metric MeasurementW2 - Lesson 3 .................................................................................................... Perimeter and Area W2 - Lesson 4 ...........................................................................................Surface Area and VolumeW2 - Lesson 5 ..........................................Working with Angles and Drawing Objects and ShapesW2 - QuizW3 - Lesson 1 ......................................................................................................... TransformationsW3 - Lesson 2 ...........................................................Bar Graphs, Line Graphs, and Circle GraphsW3 - Lesson 3 .................................................................................. Collecting and Analyzing DataW3 - Lesson 4 ......................................... Number Patterns, Magic Squares, and Problem Solving W3 - Lesson 5 ..........................................................................................Probability and OutcomesW3 - Quiz
Materials Required: A textbook is not needed. This is a stand-alone course.
Important Concepts of Grade 6 Mathematics
Distance
Learning
Centre
Alberta
LEARNING
AN
YT
IME A N Y W
HE
RE
W1 - Lesson 3:Improper Fractions and
Mixed Numbers
Preview/Review Conceptsfor
Grade Six Mathematics
OBJECTIVES
By the end of this lesson, you should
• change proper and improper fractions into decimals and fractions
• change decimal fractions into proper and improper fractions
• write fractions and mixed numbers in both word and numeralforms
• create equivalent fractions by multiplying and dividing thenumerators and denominators by whole numbers
• arrange groups of numbers according to size
• change mixed numbers into improper fractions
• change fractions into mixed numbers
GLOSSARY
common denominator - adenominator that is the same intwo or more fractions
improper fraction - a fraction inwhich the numerator is greaterthan or equal to thedenominator to produce a valuegreater than or equal to one
lowest term fraction - a fractionthat is the smallest equivalentfraction possible
mixed number - a number thatcontains a whole number and afraction written together toproduce a value greater thanthe value of the whole numberit contains
proper fraction - a fraction inwhich the numerator is lessthan the denominator toproduce a value less than one
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Preview/Review Concepts W1 - Lesson 3 Mathematics Grade 6
W1 - Lesson 3: Improper Fractions and Mixed Numbers
Welcome to W1 - Lesson 3! In this lesson you will continue to work withfractions in three topics:
• Mixed Numbers and Improper Fractions• Changing Fractions to Decimals• Comparing Proper Fractions, Improper Fractions, and Mixed Numbers
To review the concepts, give careful attention to each section and to eachassignment.
Mixed Numbers and Improper Fractions
You likely use proper fractions often. Youate three-quarters of the pizza; you drankhalf the pop; you did a quarter of yourhomework. These are proper fractions.Each is less than one. The denominatortells the number of pieces the pizza is cutinto, the numerator tells how many you ate!
A mixed number is a whole number that is written together with afraction.
32
4,
75
10,
711
25,
118
100, and
2234
1 000
The value of the whole number and the value of the fraction together makethe value of the mixed number.
Preview/Review Concepts W1 - Lesson 3Mathematics Grade 6
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An improper fraction can be a number with a numerator the same as thedenominator. If you need 5 pieces of pie to make one complete pie and youhave those 5 pieces, you can put them together to make one pie. Anynumber divided by itself equals 1.
5 5 151 155 5 1
÷= = =÷
Most improper fractions have numerators that are larger than thedenominators.
Having a fraction with the numerator larger than the denominator is likehaving a container that is heaped so you cannot put the lid on. The value ismore than one because the fraction has more parts than it needs to make
one. That is why 54
fills a container that contains 4, and 1 is left over.
Improper fractions are also written as mixed numbers.
5 1 8 2 17 21 2 3
4 4 3 3 5 5= = =
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Preview/Review Concepts W1 - Lesson 3 Mathematics Grade 6
Questions
1. Determine if the following numerals are proper fractions, improperfractions, or mixed numbers. Write the correct answer in the spaceprovided.
Examples: 36
10 = mixed number,
87
= improper fraction, 7
10 = proper
fraction
a.4
129
=
b.3
16 7
=
c. =443
1 000
d.2
5 3
=
e.9
8
=
2. Rewrite the following numerals in words. Remember to use ths whereneeded, as in tenths, hundredths, and thousandths.
Example: 5
339
= thirty-three and five ninths
a. =83
100
c. =46
11
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d. =78
2
e. =838
14
f. =3
19
3. Rewrite the following numbers in numerals.
Example: seventy-seven and twenty-two hundredths = 22
77 100
a. nine thirds =
b. seven twentieths =
c. two hundred seven and one quarter =
d. sixteen halves =
e. eight eighths =
f. nineteen and nineteen fiftieths =
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Preview/Review Concepts W1 - Lesson 3 Mathematics Grade 6
4. Make three equivalent fractions for each of the following fractions bymultiplying. Choose your own multipliers.
Example: 115
= 2210
, 3315
, 4420
The multipliers are 2, 3 and 4.
a. =7
8
c. =13
13
d. =6
4
e. =22
10
f. =44
50
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5. Make three equivalent fractions by dividing. Choose your own divisors.
Example: 250100
= 12550
, 5020
, 254
The divisors are 2, 5 and 10.
a. =500
100
b. =66
66
c. =88
120
d. =1 000
800
e. =250
350
f. =60
30
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Preview/Review Concepts W1 - Lesson 3 Mathematics Grade 6
Changing Fractions to Decimals
Earlier, you reviewed equivalent fractions.
You know that 12
is equal to 24
or 36
.
The fraction 24
is not lowest-terms because both numerator and
denominator can be divided by 2. This changes 24
to 12
, which is a lowest-
terms fraction because we cannot divide any whole number into both thenumerator and the denominator.
35
is a lowest-term fraction because both the numerator and
denominator cannot be divided by any whole number.
410
is not lowest-terms because both 4 and 10 are divisible by 2.
When an equivalent fraction is made by dividing, the new lowest term
fraction is 25
.
1220
is not lowest-terms because both 12 and 20 are divisible by 2 and
by 4. We can make two equivalent fractions that are lower.
1220
= 6
10 =
35
The fraction 35
is lowest-terms.
22/7 = .
Preview/Review Concepts W1 - Lesson 3Mathematics Grade 6
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Another way to express a fraction is as a decimal fraction. If thedenominator is 10, this is easy because of place values. Three tenths is
written as 3
10 or as 0.3. The numerator becomes the digit in the tenths
place value location. If 9 29
0.9, then 0.2910 100
= =
Examples:
710
= 0.7 (The 7 is in the tenths place value location.)
44100
= 0.44 (There must be two numbers after the decimal to be in the
hundredths place value location.)
7011 000
= 0.701 (There must be three numbers after the decimal to be
in the thousandths place value location.)
8100
= 0.08 (There must be two numbers after the decimal to be in the
hundredths place value location.)
231 000
= 0.023 (There must be three numbers after the decimal to be
in the thousandths place value location.)
16/50 = 0.32
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Preview/Review Concepts W1 - Lesson 3 Mathematics Grade 6
To change a fraction into a decimal fraction when the denominator isnot 10, 100, or 1 000, you must create an equivalent fraction with adenominator of 10, 100 or 1 000.
15
= 2
10 = 0.2
20100
= 0.20 200
1 000 = 0.200 (
15
becomes 0.2)
1650
= 32
100 =
3201 000
32100
= 0.32, 320
1 000 = 0.320 (
1650
becomes 0.32)
To change a mixed number into an improper fraction is a three-stepprocess.
Step 1: Multiply the whole number by the denominator of the fraction.
Step 2: Add the numerator of the fraction to the answer in step 1.
Step 3: The answer in step 2 becomes the numerator of the improperfraction. The original denominator of the fraction is thedenominator of the improper fraction.
Write 4
3 5
as an improper fraction:
Step 1: 3 × 5 = 15 (Multiply the whole number by the denominator.)
Step 2: 4 + 15 = 19 (Add the numerator of the fraction to the answerin step 1 to find the numerator of the improper fraction.)
Step 3: The improper fraction is 195
(The numerator is the answer in
step 2 and the denominator of the improper fraction is theoriginal denominator.)
Preview/Review Concepts W1 - Lesson 3Mathematics Grade 6
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To change an improper fraction to a mixed number, divide thenumerator of the improper fraction by its denominator. Usually, youranswer is a whole number and a remainder. The whole number becomesthe first part of your mixed number and the remainder becomes thenumerator of the fraction. The denominator does not change.
Change the following improper fractions to mixed numbers:
196
= 3R1 (Divide 19 by 6 to get 3 remainder 1)
The mixed number is 1
3 6
.
235
= 4R3 (Divide 23 by 5 to get 4 remainder 3)
The mixed number is 3
4 5
.
Questions
1. Change the following fractions and mixed numbers into decimalfractions. The whole number in the mixed number is not changed.
Examples: 24
7 100
= 7.24 and 1
10 = 0.1
a. =3
10 b. =24
100
c.334
=1 000
d. =84
10
e. =56729
1 000 f. =87
12 100
__________________
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Preview/Review Concepts W1 - Lesson 3 Mathematics Grade 6
2. Change the following fractions and mixed numbers into decimalfractions. First, make an equivalent fraction that has a denominatorthat is 10, 100, or 1 000.
Examples: 7
2 20
= 35
2 100
= 2.35 7
2 20
and 2.35 are equivalent
a.14
=
b.45
=
c.3
6 20
=
d.1025
=
e.40
8 125
=
f.13
13 50
=
.75
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3. Change the following fractions to their lowest-terms. Remember tomake an equivalent fraction by dividing.
a.6
10 = (divide by 2)
b.5
20 = (divide by 5)
c.1525
= (divide by 5)
d.2250
=
e.1224
=
f.1692
=
4. Convert the following decimal numbers into fractions or mixednumbers. Then write the answer in the lowest terms.
Example: 1.8 = 1810
= 4
1 5
(8 and 10 are divisible by 2. The lowest
terms fraction is 45
).
a. 0.6 =
b. 14.64 =
c. 0.75 =
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Preview/Review Concepts W1 - Lesson 3 Mathematics Grade 6
d. 12.5 =
e. 2.25 =
f. 38.072 =
5. Write each of the following mixed numbers as improper fractions.
Examples: 1
2 2
= 52
and 3
3 4
= 154
a.4
6 =7
b.2
5 =3
c. =19
2
d. =73
8
e. =212
5
f. =215
9
g. 3
20 =10
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6. Write each of the following improper fractions as mixed numbers.
Examples: 113
= 3R2 The mixed number is 2
3 3
152
= 7R1 The mixed number is 7 12
a.92
=
b.133
=
c.224
=
d.196
=
e.278
=
f.377
=
g.494
=
h.5512
=
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Preview/Review Concepts W1 - Lesson 3 Mathematics Grade 6
Comparing Proper Fractions, Improper Fractions, and Mixed Numbers
We describe fractions as having common denominators if thedenominators in two or more fractions are the same.
For example, the fractions 2125
and 1725
have common denominators.
When the denominators of two or more fractions are the same, you caneasily tell which fraction is the largest by reading the numbers in thenumerators.
Example: Arrange the following fractions in order according to size.
Put the largest fraction first, the fractions are 23
100,
55100
and 3
100.
Answer: 55
100 (largest),
23100
(second largest), 3
100 (smallest)
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To arrange fractions according to size when the fractions havedenominators that are not the same size, begin by creating equivalentfractions so that all the fractions have equal denominators.
Example: Arrange the following fractions according to size. Put the
largest fractions first. Fractions are 3
20,
610
, 25
and 14
. All of the
denominators are multiples of 20, so 20 will be the commondenominator.
320
= 3
20 This fraction does not have to be changed.
610
= 1220
In this fraction we can multiply the numerator and the
denominator by 2 to get an equivalent fraction of 1220
.
25
= 820
In this fraction we can multiply the numerator and the
denominator by 4 to get an equivalent fraction of 820
.
14
= 5
20 In this fraction we can multiply the numerator and the
denominator by 5 to get an equivalent fraction of 5
20.
Answer: 6 12
=10 20
(largest), 2 8
=5 20
(second largest),
1 5=
4 20 (third largest),
3 3=
20 20 (smallest). <>
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Preview/Review Concepts W1 - Lesson 3 Mathematics Grade 6
Questions
1. Arrange the following fractions in order from greatest to least.
a.1225
, 2425
, 2
25,
1825
, 3325
b.5650
, 7250
, 2
50,
4350
, 5950
c.5
16,
916
, 1516
, 7
16,
2516
d.6620
, 3320
, 1920
, 620
, 6420
Preview/Review Concepts W1 - Lesson 3Mathematics Grade 6
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2. Arrange the following fractions in order from greatest to least. First,create equivalent fractions so that all the fractions have commondenominators.
a.32
, 84
, 38
, 44
, 58
(Hint: Use 8 as the common denominator.)
b.2250
, 45
100,
61100
, 9
50,
99100
(Hint: Use 100 as the common denominator.)
c.11 11 11 41
, , , 10 100 1 000 100
(Hint: Use 1 000 as the common denominator.)
d.2 5 3 11 17
, , , , 6 6 12 12 24
(Hint: Use 24 as the common denominator.)
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Preview/Review Concepts W1 - Lesson 3 Mathematics Grade 6
3. Arrange the following fractions, decimals, and mixed numbers in orderfrom greatest to least. Change all the mixed numbers and fractionsinto decimals, and then arrange them by size from largest to smallest.
Example: 1
6 2
, 8.45, 1818
, 6.71, 2
8 5
16
2 = 6.5, 8.45 = 8.45,
1818
= 1.0, 6.71 = 6.71, 2
8 5
= 4
8 10
= 8.4
First, change 2
8 5
to 4
8 10
(equivalent fraction), and then change the
mixed number to a decimal. Answer: 8.45, 8.4, 6.71, 6.5, and 1.0.
a.75
100, 0.78,
751 000
, , 0.65
b.2
6 10
, 3
6 20
, 2
6 5
, 1
6 10
, 6010
c. 7.125, 5
72 10
, 1
7 10
, 5
712 10
, 71.25
710
Preview/Review Concepts W1 - Lesson 3Mathematics Grade 6
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4. Insert the correct sign to make the following statements true(> or < or =). Change each fraction and mixed number to a decimal andthen compare the answers.
Example: Compare 125
and 1
2 2
.
125
= 2R2 = 2
2 5
= 4
2 10
= 2.4
12
2 =
52
10 = 2.5
Answer: 2.4 < 2.5 (2.4 is less than 2.5)
a.34
_______________ 0.75 b.125
_______________ 2
2 5
c. 1.88_______________ 1
1 2
d. 4 89
_______________449
e.2
15 5
_______________15.5 f.1610
_______________1.66
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Preview/Review Concepts W1 - Lesson 3 Mathematics Grade 6
5. Three students—Sue, Demetra, and Shere—painted a large mural on
the end wall of the school gymnasium. Sue used 1
2 10
L of green and
310
L of red paint. Demetra used 7
2 10
L of blue and 1
1 2
L of black
paint. Shere used 4
10 L of brown,
310
L of yellow, 9
10 L of purple, and
11
2 L of orange paint. Answer the following questions. Write your
answers as fractions or mixed numbers.
Hint: 12
L = 5
10 L.
a. How much paint did Sue use?
b. How much paint did Demetra use?
c. How much paint did Shere use?
d. How much paint was used altogether?
Preview/Review Concepts W1 - Lesson 3Mathematics Grade 6
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6. On Monday, Billie celebrated her birthday with her friends. Each
student ate a fraction of the cake: Mary ate 16
,
Ron ate 18
, Carol ate 3
12, Bob ate
524
, and
Kasey ate 1
12. How much cake was left for
Billie?
(Hints: This question has two parts. Use 24 as the common denominator.)
Homework Assignment
Use the following fractions and mixed numbers to answer the directionsbelow:
3 4 15 5 7 , , , , 9 ,
2 8 6 25 4
3 3 6 5 101 , , 8 , ,
7 6 11 8 7
1. Find and write three proper fractions.
2. Find and write three improper fractions.
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Preview/Review Concepts W1 - Lesson 3 Mathematics Grade 6
3. Find and write three mixed numbers.
4. Find and write three fractions that are lowest-term fractions.
5. Find and write two fractions that have common denominators.
6. Find and write two fractions that are equivalent fractions.
7. Find and write the mixed number and the improper fraction that areequivalent.
Preview/Review Concepts W1 - Lesson 3Mathematics Grade 6
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Self-Evaluation
Ask yourself some important questions. Write your answers insentences for your teacher.
1. In this lesson, what part of your work was excellent?
2. In this lesson, what part of your work needs improvement?
3. If you want help for some of the work in this lesson, ask your teacherin this space.