Lesson 12
Compare Multi-digit Numbers
Warm-up: Which One Doesn’t Belong: Friendly Numbers (10 minutes)
Narrative
This warm-up prompts students to carefully analyze and compare features of 4 multi-digit numbers. Although students used place value terminology in the previous section, this activity lets the teacher hear the terminologies students use as they describe and compare each number. The observations and reasoning here prepare students to reason about the relative size of numbers later in this lesson.
Launch
- Groups of 2
- Display image.
- “Pick one that doesn’t belong. Be ready to share why it doesn’t belong.”
- 1 minute: quiet think time
Activity
- “Discuss your thinking with your partner.”
- 2–3 minutes: partner discussion
- Share and record responses.
Student Facing
Which one doesn’t belong?
- 1,395
- 3,095
- 9,530
- 30,195
Student Response
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Activity Synthesis
- “These numbers have mostly the same digits—0, 1, 3, 5, and 9. Are they all the same size?” (No)
- “Which of these is the greatest? How do you know?” (30,195, because it has five digits and is in the ten-thousands. The others have fewer digits and are in the thousands.)
- “The other numbers are all four-digit numbers. How might we compare them?” (Compare the digits in the thousands place and see which one is greater.)
Activity 1: Which is Greater? (15 minutes)
Narrative
Required Materials
Materials to Gather
Launch
- Groups of 3–4
- Give each group a set of cards 0–10. Ask students to remove the cards that show 10.
- “What three-digit numbers can we make with 5, 7, and 3?” (357, 375, 537, 573, 735, 753)
Activity
- “Work with your group to make pairs of numbers using the digits on the cards. First use 3 cards, then 4, then 5, and lastly 6. Compare each pair of numbers.”
- “Think about how you go about comparing each pair of numbers.”
- 5 minutes: group work time
- Monitor for students who:
- notice that not all digits need to be compared in order to tell which number in a pair is greater
- use place-value language in describing the numbers
- make two numbers with the same first digit or the same first and second digits
Student Facing
Your teacher will give you a set of cards, each with a single digit, 0–9.
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Use the cards for 2, 7, and 8 to make two different three-digit numbers. Use < or > to compare them.
\(\boxed{\phantom{\frac{00}{00}}} \ \boxed{\phantom{\frac{00}{00}}} \ \boxed{\phantom{\frac{00}{00}}} \ \underline{\hspace{0.5in}} \ \boxed{\phantom{\frac{00}{00}}} \ \boxed{\phantom{\frac{00}{00}}} \ \boxed{\phantom{\frac{00}{00}}}\)
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Now include the digit 1 to make two different four-digit numbers. Compare the numbers.
\(\boxed{\phantom{\frac{00}{00}}} _{\ \huge{,}} \ \boxed{\phantom{\frac{00}{00}}} \ \boxed{\phantom{\frac{00}{00}}} \ \boxed{\phantom{\frac{00}{00}}} \ \underline{\hspace{0.5in}} \ \boxed{\phantom{\frac{00}{00}}} _{\ \huge{,}} \ \boxed{\phantom{\frac{00}{00}}} \ \boxed{\phantom{\frac{00}{00}}} \ \boxed{\phantom{\frac{00}{00}}}\)
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Shuffle the cards. Repeat what you did earlier with new cards.
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Four-digit numbers
\(\boxed{\phantom{\frac{00}{00}}} _{\ \huge{,}} \ \boxed{\phantom{\frac{00}{00}}} \ \boxed{\phantom{\frac{00}{00}}} \ \boxed{\phantom{\frac{00}{00}}} \ \underline{\hspace{0.5in}} \ \boxed{\phantom{\frac{00}{00}}} _{\ \huge{,}} \ \boxed{\phantom{\frac{00}{00}}} \ \boxed{\phantom{\frac{00}{00}}} \ \boxed{\phantom{\frac{00}{00}}}\)
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Five-digit numbers
\(\boxed{\phantom{\frac{00}{00}}} \ \boxed{\phantom{\frac{00}{00}}} _{\ \huge{,}} \ \boxed{\phantom{\frac{00}{00}}} \ \boxed{\phantom{\frac{00}{00}}} \ \boxed{\phantom{\frac{00}{00}}} \ \underline{\hspace{0.5in}} \ \boxed{\phantom{\frac{00}{00}}} \ \boxed{\phantom{\frac{00}{00}}} _{\ \huge{,}}\ \boxed{\phantom{\frac{00}{00}}} \ \boxed{\phantom{\frac{00}{00}}} \ \boxed{\phantom{\frac{00}{00}}} \ \)
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Six-digit numbers
\(\boxed{\phantom{\frac{00}{00}}} \ \boxed{\phantom{\frac{00}{00}}} \ \boxed{\phantom{\frac{00}{00}}} _{\ \huge{,}} \ \boxed{\phantom{\frac{00}{00}}} \ \boxed{\phantom{\frac{00}{00}}} \ \boxed{\phantom{\frac{00}{00}}} \ \underline{\hspace{0.5in}} \ \boxed{\phantom{\frac{00}{00}}} \ \boxed{\phantom{\frac{00}{00}}} \ \boxed{\phantom{\frac{00}{00}}} _{\ \huge{,}} \ \boxed{\phantom{\frac{00}{00}}} \ \boxed{\phantom{\frac{00}{00}}} \ \boxed{\phantom{\frac{00}{00}}} \)
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- For each pair you compared, how did you decide which number is greater?
Student Response
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Advancing Student Thinking
Activity Synthesis
- Select students to display their number statements and read them. Ask if the class agrees with their comparison.
- “How did you decide which number is greater? Did you compare every digit?”
- Select students who wrote numbers with the same first digit (or the same first two digits) to share their number statements. Ask them to explain how they compared the numbers.
- If no students mentioned that the digits in some places matter more than those in others, ask them about it.
- “Did you pay attention only to some digits but not others?”
- “Which ones did you prioritize? Were there any you tended to ignore?”
Activity 2: Incomplete Numbers (10 minutes)
Narrative
In the previous activity, students noticed that the digits in certain places within numbers matter more than others when comparing numbers. In this activity, students deepen that understanding by comparing pairs of numbers with a missing digit. The missing digit is the same for each pair but may not be in the same place in the two numbers. The reasoning here prompts students to pay closer attention to place value. It also reinforces the idea that the digit with the greatest place value affects the size of the number the most, followed by the digits with the second greatest place value, and so on (MP7).
Advances: Conversing, Representing
Supports accessibility for: Conceptual Processing, Organization
Launch
- Groups of 2
- “Let’s look at some other pairs of multi-digit numbers, but this time the numbers are missing a digit. Can they still be compared?”
Activity
- “Take a few quiet minutes to think about the first problem. Then, share your thinking with your partner.”
- 1 minute: independent work time
- 1–2 minutes: partner discussion
- Pause for a whole-class discussion. Invite students to share their responses, hearing first from those who agree with Han, and then those who agree with Clare.
- “If the missing digit is not the same digit, can we compare the two numbers?” (No) “Why not?” (Because we don’t know which number has the greater missing digit, so there’s no way to compare.)
- If not mentioned by students, point out the features of the pair of numbers being compared: Both are three-digit numbers, both are missing the first digit, and 62 is greater than 17.
- “Let’s compare some other numbers that have a missing digit.”
- 5 minutes: partner work time
- Monitor for students who use place-value language to explain their thinking.
Student Facing
-
Here are two numbers. In both, the missing digit is the same number.
\(\large \boxed{\phantom{0}}\ \boxed{1} \ \boxed{7} \qquad \qquad \boxed{\phantom{0}}\ \boxed{6} \ \boxed{2}\)
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Han says the numbers can’t be compared because they are incomplete.
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Clare says the second number is greater, no matter what the missing digit is.
Do you agree with either one of them? Explain your reasoning.
-
-
Here are some pairs of numbers. The numbers in each pair are missing the same digit. Can you tell which number is greater? Be prepared to explain your reasoning.
-
\(\large \boxed{4} \ \boxed{9} \ \boxed{\phantom{0}}\)
\(\large \boxed{3} \ \boxed{\phantom{0}}\ \boxed{9}\) -
\(\large \boxed{1} \ ,\boxed{\phantom{0}}\ \boxed{7} \ \boxed{2}\)
\(\large \boxed{1} \ , \boxed{\phantom{0}}\ \boxed{8} \ \boxed{5}\) -
\(\large \boxed{8} \ ,\boxed{\phantom{0}}\ \boxed{1} \ \boxed{6}\)
\(\large \boxed{5} \ , \boxed{8} \ \boxed{\phantom{0}}\ \boxed{2}\) -
\(\large \boxed{2} \ \boxed{7} \ ,\boxed{\phantom{0}}\ \boxed{9} \ \boxed{5}\)
\(\large \boxed{2} \ \boxed{\phantom{0}} \ , \ \boxed{7} \ \boxed{4} \ \boxed{5}\) -
\(\large \boxed{\phantom{0}}\ \boxed{9} \ \boxed{0} \ ,\boxed{1} \ \boxed{6} \ \boxed{5}\)
\(\large \boxed{9} \ \boxed{\phantom{0}}\ \boxed{0} \ ,\boxed{0} \ \boxed{6} \ \boxed{4}\)
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\(\large \boxed{4} \ \boxed{9} \ \boxed{\phantom{0}}\)
Student Response
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Advancing Student Thinking
Activity Synthesis
- Invite selected students to share their explanations.
Activity 3: Is It Possible? [OPTIONAL] (20 minutes)
Narrative
Required Materials
Materials to Gather
Required Preparation
- Each group of 2 needs a set of cards from the previous activity.
Launch
- Groups of 2
- Give each group a card with a digit between 0 and 9 for each group
Activity
- “Use the digit on the card to complete the comparison statements in the first problem and decide if they are true.”
- 4–5 minutes: group work time
- Pause to collect responses from all the groups.
- “Is the first comparison statement true for all digits?” (Yes, because if the digits are the same, we can just compare 999 to 500.)
- Repeat the question with all statements. Record responses in a chart such as shown:
statement | true | false |
---|---|---|
\( \underline{\phantom{00}} \ , 999 > \underline{\phantom{00}} \ , 500\) | all digits | |
\(15,2 \underline{\phantom{00}}0 > 15, \underline{\phantom{00}}02\) | 0, 1, 2 | 3, 4, 5, 6, 7, 8, 9 |
\(4 \underline{\phantom{00}},700 < 7 \underline{\phantom{00}} ,400 \) | all digits | |
\(1 \underline{\phantom{00}}5,000 > 5 \underline{\phantom{00}}1,000\) | all digits |
- “Why are the statements in parts a and c true no matter what digit is used?” (Sample response:
- In part a, both numbers are missing the first digit, in the thousands place. Since the missing digit is the same, we’re comparing the hundreds, and 999 is always greater than 500.
- In part c, the missing digit is in the thousands place of both numbers, but the digits in the ten-thousands place need to be compared first, and 4 ten-thousand is always less than 7 ten-thousand.)
- “Why is the statement in part d false no matter what digit is used?” (Ten-thousand is never greater than 50 thousand.)
- “Take a few quiet minutes to work on the last two problems independently.”
- 5 minutes: independent work time
Student Facing
-
Each of the following pairs of numbers is missing the same digit but in different places.
Your teacher will assign a digit to you. Use it as the missing digit and decide if each comparison statement is true.
- \(\large \boxed{\phantom{0}} \ , \boxed{9} \ \boxed{9} \ \boxed{9} > \boxed{\phantom{0}} \ , \boxed{5} \ \boxed{0} \ \boxed{0}\)
- \(\large \boxed{1} \ \boxed{5} \ , \boxed{2} \ \boxed{\phantom{0}} \ \boxed{0} > \boxed{1} \ \boxed{5} \ , \boxed{\phantom{0}} \ \boxed{0} \ \boxed{2}\)
- \(\large \boxed{4} \ \boxed{\phantom{0}} \ , \boxed{7} \ \boxed{0} \ \boxed{0} < \boxed{7} \ \boxed{\phantom{0}} \ , \boxed{4} \ \boxed{0} \ \boxed{0}\)
- \(\large \boxed{1} \ \boxed{\phantom{0}} \ \boxed{5} \ , \boxed{0} \ \boxed{0} \ \boxed{0} > \boxed{5} \ \boxed{\phantom{0}} \ \boxed{1} \ , \boxed{0} \ \boxed{0} \ \boxed{0}\)
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Here are two numbers, each with the same missing digit.
\(\large \boxed{4} \ \boxed{\phantom{0}} \ , \boxed{3} \ \boxed{0} \ \boxed{0} \qquad \qquad \boxed{3} \ \boxed{\phantom{0}} \ , \boxed{4} \ \boxed{0} \ \boxed{0}\)
Choose a digit to complete the numbers and show where they would be on the number line.
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Is it possible to fill in the two blanks with the same digit to make each statement true? If you think so, give at least one example of what the digits could be. If not, explain why it is not possible.
- \(\large \boxed{4} \ \boxed{\phantom{0}} \ , \boxed{3} \ \boxed{0} \ \boxed{0}\) is less than \(\large {\boxed{3}} \ \boxed{\phantom{0}} \ , \boxed{4} \ \boxed{0} \ \boxed{0}\) .
- \(\large \boxed{\phantom{0}} \ \boxed{4} \ , \boxed{3} \ \boxed{0} \ \boxed{0}\) is less than \(\large \boxed{\phantom{0}} \ \boxed{3} \ , \boxed{4} \ \boxed{0} \ \boxed{0}\) .
Student Response
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Activity Synthesis
- Select students to share their responses to the last two problems.
- Highlight explanations that make it clear that:
- \(4 \underline{\phantom{5}},\!300\) will always be greater than \(3 \underline{\phantom{5}},\!400\) because 4 ten-thousand is always greater than 3 ten-thousands.
- \( \underline{\phantom{5}}4,\!300\) will always be greater than \( \underline{\phantom{5}}3,\!400\) because, given the first digit is the same, the digits to compare are the thousands, and 4 thousands is always greater than 3 thousands.
Lesson Synthesis
Lesson Synthesis
“Today we compared many large numbers. At first, all the digits of the numbers being compared were known. Later in the lesson, one digit of each number was missing, but in many cases we were still able to compare the size of the numbers.”
“Suppose a classmate says that we can’t compare \(380,\!\underline{\phantom{5}}51\) and \(384,\!\underline{\phantom{5}}89\) because a digit is missing from each. How might you convince them that it can be done? Write down what you might say to that classmate.”
Invite students to share their explanations. Highlight those that make it clear that both numbers have 3 hundred-thousands and 8 ten-thousands, but one has 0 thousand and the other has 4 thousands. This tells us that the second number is greater, regardless of what digit is missing in the places to the right of the thousands place.
Cool-down: Two Numbers To Compare (5 minutes)
Cool-Down
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