Math 5 Lesson 6 Parts of a Whole - Decimals Canada Geese Canada Geese can be identified by their long black neck, black head, crown and bill. The back and feathers on top of their wings are shades of brown. The throat, cheeks, and under-tail of the bird are white. These white marks make it easy to identify them. Canada geese travel in large groups and fly in a V-shaped formation. They may migrate in the winter to parts of the United States. They are a rather large bird. They range from 0.508 to 1.270 metres in length. They can have a wingspan of 1.270 to 1.272 metres. Reflection How do you say 0.508? What fraction of a metre is 0.508? Math 5 1-61
Objectives for this Lesson In this lesson you will explore the following concepts: Describe and represent decimals concretely, pictorially and symbolically Relate decimals to fractions Go online to complete the Concept Capsule: Understanding Decimals Using Base Blocks. Parts of a Whole Remember that one way to show a picture of a decimal is to use base ten blocks. Since those are hard to put on paper they may be represented with these pictures: Three Tenths or 0.3 Three Hundredths or 0.03 The square has parts. The square has 0 parts. 3 parts are shaded. 3 parts are shaded. The 3 goes in the tenths place. The 3 goes in the hundredths place. Ones. Tenths Hundredths Thousandths 0 3 Ones. Tenths Hundredths Thousandths 0 0 3 1-62
Now It s Your Turn Write the decimal to match the shaded part of each picture. a. b. c. Solutions a. 0.6 b. 0.64 c. 0.46 Relate Fractions to Decimals Fractions and decimals both relate parts to a whole. Decimals always have a whole that is cut into, 0, 1 000, and so on. Fractions may have any number of parts. 1 2 3 5 8 9 0 When you look at models of fractions you can see that they may also represent decimals. Math 5 1-63
For the following, notice the decimal and the fraction: Picture Parts of Whole Decimal Fraction There are 76 shaded parts of the whole that is divided into 0 pieces. 0.76 76 0 The number of shaded parts follows the decimal place. The last digit is in the hundredths place because there are 0 parts to the whole. If there were parts then the last place would fall in the tenths place. For the fraction, the numerator is the number of shaded parts. The denominator is 0 because there are 0 parts to the whole. Example 1 For the picture shown, answer the following questions: A. What decimal amount is shaded? B. What fractional amount is shaded? 1-64
A. How many parts are in the whole? Remember, this will tell you the place value of your decimal. There are parts. The decimal will have a tenths place: 0. How many parts are shaded? This will be the number in the tenths place. 4 parts are shaded. The decimal amount shaded is: 0.4 B. How many parts are in the whole? Remember, this will tell you the number in the denominator. There are parts. The fraction will have a in the denominator: How many parts are shaded? This will be the number in the numerator. 4 parts are shaded. The fraction will be: 4 4 Example 2 For the picture shown, answer the following questions: A. What decimal amount is shaded? B. What fractional amount is shaded? Math 5 1-65
A. How many parts are in the whole? Remember, this will tell you the place value of your decimal. There are 0 parts. The decimal will have a hundredths place: 0. How many parts are shaded? This will be the number in the tenths place. 49 parts are shaded. The decimal will be: 0.49 B. How many parts are in the whole? Remember, this will tell you the number in the denominator. There are 0 parts. The fraction will have a 0 in the denominator: 49 0 How many parts are shaded? This will be the number in the numerator. 49 parts are shaded. 49 The fraction will be: 0 1-66
Let s Explore Exploration 1: Fraction Decimal Patterns Materials:, Lesson 6, Exploration 1 page from your Workbook, Pencil Notice the pattern to the table of equivalent fractions and decimals: Fraction 3 6 7 9 4 0 23 0 30 0 68 0 Decimal 0.3 0.6 0.7 0.9 0.04 0.23 0.30 0.68 1. What do you notice about the decimals when the denominator is? 2. What do you notice about the decimals when the fraction s denominator is 0? 3. Reflect: What is the relationship between the denominator of the fraction and the place value of the decimal? 4. Apply this knowledge: Complete the table. Fraction 2 8 21 0 39 0 Decimal 0.5 0.12 0.57 0.84 Math 5 1-67
Now It s Your Turn Write each decimal as a fraction. a. 0.2 b. 0.5 c. 0.23 d. 0.06 Solutions a. b. c. d. 2 5 23 0 6 0 Let s Practice In your Workbook go to, Lesson 6 and complete 1 to 6. Thousandths 1 Think about this pattern: 0.1 =, 0.01 = 1 0 Notice that the number of zeros in the denominator of the fraction is equal to the number of decimal places in the decimal. 1-68
What decimal value would equal 1? Based on the pattern you 1 000 observed, your answer should be 0.001. Example 3 The cactus pygmy-owl is about as a decimal. 168 1 000 of a metre long. Write the fraction You would read the fraction like this: one hundred sixty eight thousandths The denominator tells you that the 8 goes in the thousandths place. You will put the 1 and 6 in the spaces before the 8. Ones. Tenths Hundredths Thousandths 0 1 6 8 168 = 0.168 1 000 Math 5 1-69
Example 4 Write 5 00 as a decimal. You would read the fraction like this: five one thousandths The denominator tells you that the 5 will be in the thousandths place. You need to fill in the other places after the decimal with a 0. Ones. Tenths Hundredths Thousandths 0 0 0 5 5 00 = 0.005 Example 5 Write 14 00 as a decimal. There are two digits in the numerator. The 4 must be placed in the thousandths place so the 1 will be in the hundredths and a 0 in the tenths. You must think backwards to get this one; the last digit has to be in the thousandths place. Ones. Tenths Hundredths Thousandths 0 0 1 4 14 00 = 0.014 1-70
Now It s Your Turn Write each fraction as a decimal. a. b. c. d. 3 17 0 9 00 32 00 Solutions a. 0.3 b. 0.17 c. 0.009 d. 0.032 Let s Practice Go online to watch the Notepad Tutor: Relating Decimals to Fractions (to thousandths). In your Workbook go to, Lesson 5 and complete 7 to 20. Math 5 1-71
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