Lesson 8
Equal and Equivalent
Problem 1
- Draw a diagram of \(x + 3\) and a diagram of \(2x\) when \(x\) is 1.
- Draw a diagram of \(x+3\) and of \(2x\) when \(x\) is 2.
- Draw a diagram of \(x+3\) and of \(2x\) when \(x\) is 3.
- Draw a diagram of \(x+3\) and of \(2x\) when \(x\) is 4.
- When are \(x+3\) and \(2x\) equal? When are they not equal? Use your diagrams to explain.
Solution
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Problem 2
- Do \(4x\) and \(15+x\) have the same value when \(x\) is 5?
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Are \(4x\) and \(15+x\) equivalent expressions? Explain your reasoning.
Solution
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Problem 3
- Check that \(2b + b\) and \(3b\) have the same value when \(b\) is 1, 2, and 3.
- Do \(2b +b\) and \(3b\) have the same value for all values of \(b\)? Explain your reasoning.
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Are \(2b+b\) and \(3b\) equivalent expressions?
Solution
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Problem 4
80% of \(x\) is equal to 100.
- Write an equation that shows the relationship of 80%, \(x\), and 100.
- Use your equation to find \(x\).
Solution
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(From Unit 6, Lesson 7.)Problem 5
For each story problem, write an equation to represent the problem and then solve the equation. Be sure to explain the meaning of any variables you use.
- Jada’s dog was \(5\frac{1}{2}\) inches tall when it was a puppy. Now her dog is \(14\frac{1}{2}\) inches taller than that. How tall is Jada’s dog now?
- Lin picked \(9 \frac{3}{4}\) pounds of apples, which was 3 times the weight of the apples Andre picked. How many pounds of apples did Andre pick?
Solution
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(From Unit 6, Lesson 5.)Problem 6
Find these products.
- \((2.3) \boldcdot (1.4)\)
- \((1.72) \boldcdot (2.6)\)
- \((18.2) \boldcdot (0.2)\)
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\(15 \boldcdot (1.2)\)
Solution
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(From Unit 5, Lesson 8.)Problem 7
Calculate \(141.75 \div 2.5\) using a method of your choice. Show or explain your reasoning.
Solution
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(From Unit 5, Lesson 13.)