Lesson 10
Conceptos de la división (optional)
Warm-up: Conversación numérica: Mismo dividendo, diferente divisor (10 minutes)
Narrative
This Number Talk encourages students to think about the relationship between the size of the divisor and the size of the quotient and to rely on the structure of division expressions to mentally find quotients.
Launch
- Display one expression.
- “Hagan una señal cuando tengan una respuesta y puedan explicar cómo la obtuvieron” // “Give me a signal when you have an answer and can explain how you got it.”
- 1 minute: quiet think time
Activity
- Record answers and strategy.
- Keep expressions and work displayed.
- Repeat with each expression.
Student Facing
Encuentra mentalmente el valor de cada expresión.
- \(120 \div 12\)
- \(120 \div 6\)
- \(120 \div 3\)
- \(120 \div 2\)
Student Response
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Activity Synthesis
- “¿Por qué el cociente se hizo más grande en cada problema?” // “Why did the quotient get bigger with each problem?” (You are making smaller groups so there are more in each of them.)
Activity 1: Compartamos pretzels (20 minutes)
Narrative
The purpose of this activity is for students to compare quotients of quantities based on the relative size of the dividend and the divisor. Students should be encouraged to use whatever strategy makes sense to them to order situations about sharing pretzels. The numbers were intentionally chosen so that students don’t have to perform any complex calculations to solve the problem which encourages them to think about the relative size of the numerator and denominator in order to compare the quotients. In upcoming lessons, students will divide a unit fraction by a whole number and a whole number by a unit fraction.
This activity uses MLR2 Collect and Display. Advances: Reading, Writing.
Launch
- Groups of 2
- Display the image of pretzels:
- “¿Qué observan? ¿Qué se preguntan?” // “What do you notice? What do you wonder?” (I notice that there are a lot of pretzels and 3 bowls. I wonder how many pretzels there are.)
Activity
- 1–2 minutes: quiet think time
- 5–6 minutes: partner work time
MLR2 Collect and Display
- Circulate, listen for, and collect the language students use to describe the relationship between the number of students sharing and the number of pretzels being shared. Listen for: number in each group, size of the group, number of pretzels each person gets, dividend, divisor, quotient.
- Record students’ words and phrases on a visual display and update it throughout the lesson.
Student Facing
Ordena las situaciones según el número de pretzels que recibirá cada estudiante. Ordénalas de mayor a menor. Prepárate para explicar tu razonamiento.
3 estudiantes comparten 42 pretzels equitativamente.
14 estudiantes comparten 42 pretzels equitativamente.
3 estudiantes comparten 24 pretzels equitativamente.
3 estudiantes comparten 45 pretzels equitativamente.
7 estudiantes comparten 42 pretzels equitativamente.
3 estudiantes comparten 6 pretzels equitativamente.
6 estudiantes comparten 42 pretzels equitativamente.
Student Response
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Advancing Student Thinking
If students do not order the situations correctly, prompt them to draw a diagram to represent each situation and ask, “¿En qué se parecen los diagramas? ¿En qué son diferentes?” // “How are the diagrams the same? How are they different?”
Activity Synthesis
- “¿Qué otras palabras o frases importantes deberíamos incluir en nuestra presentación?” // “Are there any other words or phrases that are important to include on our display?”
- As students share responses, update the display, by adding (or replacing) language, diagrams, or annotations.
- Remind students to borrow language from the display as needed.
- Display:
3 students equally share 45 pretzels.
3 students equally share 42 pretzels.
3 students equally share 24 pretzels.
3 students equally share 6 pretzels. - “¿Qué es lo mismo? ¿Qué es diferente?” // “What is the same? What is different?” (The same number of students are sharing different numbers of pretzels.)
- “¿Cómo cambia en cada situación el número de pretzels que recibe cada persona?” // “How does the number of pretzels each person gets change in each situation?” (It gets smaller because there are fewer pretzels to share.)
- Display:
14 students equally share 42 pretzels.
7 students equally share 42 pretzels.
6 students equally share 42 pretzels. - “¿Qué es lo mismo? ¿Qué es diferente?” // “What is the same? What is different?” (The number of pretzels being shared is the same. The number of students sharing is different.)
- “¿Cómo cambia en cada situación el número de pretzels que recibe cada persona?” // “How does the number of pretzels each person gets change in each situation?” (When fewer people share the same number of pretzels, each person gets more pretzels.)
Activity 2: Patrones en la división (15 minutes)
Narrative
The purpose of this activity is for students to look for patterns in division by the same divisor. The numbers in these problems were intentionally chosen so students see that the quotient gets smaller as the dividend gets smaller (MP7). Display the poster of the language students used to describe the relationship between quotient, dividend, and divisor during the previous activity. In the last question, students think about what it means to divide a fraction by a whole number which will be the focus of upcoming lessons.
Supports accessibility for: Conceptual Processing, Memory
Launch
- Groups of 2
Activity
- 5 minutes: independent work time
- Monitor for students who:
- can explain why the quotient gets smaller when the dividend gets smaller
- describe the quotient of \(\frac {1}{3} \div 3\) as being smaller than \(\frac {1}{3}\)
- draw a diagram to show \(\frac {1}{3}\) divided into 3 equal sections
Student Facing
-
Encuentra el valor de cada expresión.
- \(36 \div 3\)
- \(12 \div 3\)
- \(9 \div 3\)
- \(6 \div 3\)
- \(3 \div 3\)
- \(1 \div 3\)
- ¿Qué patrones observas?
- ¿Por qué se hace más pequeño el cociente?
- ¿Qué sabes sobre la expresión \(\frac {1}{3} \div 3\)?
- Dibuja un diagrama que represente \(\frac {1}{3} \div 3\).
Student Response
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Advancing Student Thinking
Students may not immediately visualize the patterns in the division expressions. Encourage them to draw a tape diagram for each expression, and ask them what they notice. Consider asking, “¿Qué le sucede al tamaño de cada grupo cuando la cantidad que se está dividiendo se hace más pequeña?” // “What is happening to the size of each group as the amount being divided gets smaller?”
Activity Synthesis
- Ask previously identified students to share their solutions.
- “¿Por qué el cociente se hace más pequeño cuando el dividendo se hace más pequeño?” // “Why does the quotient get smaller as the dividend gets smaller?” (There are a smaller number of things being split into the same number of groups, so there will be fewer in each group.)
- “¿Por qué \(\frac {1}{3} \div 3\) será más pequeño que \(\frac {1}{3}\)?” // “Why is \(\frac {1}{3} \div 3\) going to be smaller than \(\frac {1}{3}\)?” (\(\frac {1}{3}\) is being divided into 3 equal pieces.)
- Display student diagrams like the ones in student responses.
- “¿Cómo muestran los diagramas \(\frac{1}{3} \div 3\)?” // “How do the diagrams show \(\frac{1}{3} \div 3\)?” (They show a third divided into 3 equal pieces.)
Lesson Synthesis
Lesson Synthesis
“Compartan las ideas nuevas sobre división que tuvieron en la clase de hoy y las preguntas que tengan aún” // “Share your new ideas and questions about division from today’s lesson.”
Record responses on a poster to be used in future lessons.
“¿Qué se preguntan todavía sobre la división?” // “What do you still wonder about division?” (Can you divide fractions? When would you ever need to divide a fraction? Does the answer get smaller or bigger when you divide fractions?)
Record student responses for all to see. Keep the display visible. Refer back to it in future lessons.
Cool-down: Razona sobre la división (5 minutes)
Cool-Down
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