3.5 Fractions as Numbers
Unit Goals
- Students develop an understanding of fractions as numbers and of fraction equivalence by representing fractions on diagrams and number lines, generating equivalent fractions, and comparing fractions.
Section A Goals
- Understand that fractions are built from unit fractions such that a fraction $\frac{a}{b}$ is the quantity formed by $a$ parts of size $\frac{1}{b}$.
- Understand that unit fractions are formed by partitioning shapes into equal parts.
Section B Goals
- Understand a fraction as a number and represent fractions on the number line.
Section C Goals
- Explain equivalence of fractions in special cases and express whole numbers as fractions and fractions as whole numbers.
Section D Goals
- Compare two fractions with the same numerator or denominator, record the results with the symbols >, =, or
Section A: Introduction to Fractions
Problem 1
Pre-unit
Practicing Standards: 2.G.A.2
Partition the rectangle into 10 equal squares.
Solution
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Problem 2
Pre-unit
Practicing Standards: 2.G.A.3
Here are two equal-size squares. A part of each square is shaded.
Is the same amount of each square shaded? Explain or show your reasoning.
Solution
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Problem 3
Pre-unit
Practicing Standards: 2.MD.B.6
- Label the tick marks on the number line.
- Locate and label 45 and 62 on the number line.
Solution
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Problem 4
Pre-unit
Practicing Standards: 2.NBT.A.4
Fill in each blank with \(<\) or \(>\) to compare the numbers.
-
\(718\, \underline{\hspace{1cm}}\, 817\)
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\(106\, \underline{\hspace{1cm}} \,89\)
-
\(806\, \underline{\hspace{1cm}} \,809\)
Solution
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Problem 5
Partition the rectangle into 6 equal parts.
Solution
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Problem 6
-
What fraction of the rectangle is shaded?
-
Partition the rectangle into 8 equal parts.
What fraction of the whole rectangle does each part represent?
Solution
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Problem 7
-
What fraction of the rectangle is shaded? Explain how you know.
-
Shade \(\frac{4}{6}\) of the rectangle.
Solution
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Problem 8
Jada walks across the street at a stoplight \(\frac{5}{6}\) of her way from home to school. Represent the situation on the fraction strip. Explain your reasoning.
Solution
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Problem 9
Exploration
Write a situation represented by the diagram. Explain why the diagram represents your situation.
Solution
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Problem 10
Exploration
Lin shaded part of some fraction strips. What fraction did she shade in each one? Explain how you know.
Solution
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Section B: Fractions on the Number Line
Problem 1
-
Locate and label \(\frac{1}{4}\) on the number line. Explain your reasoning.
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Locate and label \(\frac{1}{6}\) on the number line. Explain your reasoning.
Solution
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Problem 2
-
Locate and label \(\frac{1}{8}\) on the number line.
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Locate and label \(\frac{1}{3}\) on the number line.
Solution
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Problem 3
-
Locate and label \(\frac{4}{8}\) on the number line.
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Locate and label \(\frac{7}{6}\) on the number line.
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Diego marks and labels fourths on the number line like this:
Do you agree with Diego? Explain your reasoning.
Solution
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Problem 4
-
Label the tick marks on the number line.
- Which numbers on the number line are whole numbers? Explain how you know.
Solution
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Problem 5
Locate and label 1 on the number line. Explain your reasoning.
Solution
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Problem 6
Exploration
How are the fraction strip and number line the same? How are they different?
Solution
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Problem 7
Exploration
Han says that he can find 1 on the number line without finding \(\frac{1}{8}\). What might Han’s method be?
Solution
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Section C: Equivalent Fractions
Problem 1
Select all correct statements.
\(\frac{1}{2}\) is equivalent to \(\frac{3}{6}\)
\(\frac{1}{2}\) is equivalent to \(\frac{1}{3}\)
\(\frac{2}{2}\) is equivalent to \(\frac{4}{4}\)
\(\frac{2}{2}\) is equivalent to \(\frac{6}{6}\)
\(\frac{2}{3}\) is equivalent to \(\frac{4}{6}\)
\(\frac{2}{3}\) is equivalent to \(\frac{3}{4}\)
Solution
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Problem 2
Write as many fractions as you can that represent the shaded part of each diagram.
Solution
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Problem 3
-
Tyler draws this picture and says that \(\frac{3}{4}\) is equivalent to \(\frac{2}{3}\). Explain why Tyler is not correct.
- Find a fraction equivalent to \(\frac{2}{3}\).
- Find a fraction equivalent to \(\frac{3}{4}\).
Solution
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Problem 4
- Write 10 as a fraction in 2 different ways.
- Is \(\frac{88}{8}\) equivalent to a whole number?
Solution
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Problem 5
Exploration
Decide if each fraction is a whole number. Explain or show your reasoning.
- \(\frac{100}{2}\)
- \(\frac{100}{3}\)
- \(\frac{100}{4}\)
- \(\frac{100}{6}\)
- \(\frac{100}{8}\)
Solution
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Problem 6
Exploration
If you continue to fold fraction strips, how many parts can you fold them into? Can you fold them into 100 equal parts?
Solution
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Section D: Fraction Comparisons
Problem 1
- Are \(\frac{2}{3}\) and \(\frac{4}{6}\) equivalent? Show your thinking using diagrams, symbols, or other representations.
- Are \(\frac{6}{8}\) and \(\frac{7}{8}\) equivalent? Show your thinking using diagrams, symbols, or other representations.
Solution
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Problem 2
Han says there is no fraction with denominator 8 that's greater than \(\frac{8}{8}\) because \(\frac{8}{8}\) is a whole. Do you agree with Han? Explain your reasoning.
Solution
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Problem 3
Use the symbols \(>\) or \(<\) to make each statement true. Explain your reasoning.
- \(\frac{5}{3} \, \underline{\phantom{\frac{1}{1}\hspace{1.05cm}}} \, \frac{5}{2}\)
- \(\frac{3}{4} \, \underline{\phantom{\frac{1}{1}\hspace{1.05cm}}} \, \frac{5}{4}\)
Solution
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Problem 4
- Jada threw the ball \(\frac{3}{4}\) of the length of the gym. Clare threw the ball \(\frac{6}{8}\) of the length of the gym. Clare says she threw the ball farther. Do you agree? Show your thinking.
- Tyler kicked the ball \(\frac{7}{8}\) the length of the playground. Andre kicked the ball \(\frac{7}{6}\) the length of the playground. Andre says he kicked the ball farther. Do you agree? Show your thinking.
Solution
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Problem 5
Exploration
Clare walked \(\frac{3}{4}\) of the way around a park. Tyler walked \(\frac{3}{6}\) of the way around a different park. Who walked farther? Explain your reasoning.
Solution
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Problem 6
Exploration
Choose a fraction that you can compare with both \(\frac{3}{8}\) and \(\frac{5}{6}\) by looking at the numerators and denominators.
Solution
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