# Lesson 18

Números más grandes en grupos iguales

## Warm-up: ¿Qué sabes sobre la división? (10 minutes)

### Narrative

The purpose of this What Do You Know About _____ is to invite students to share what they know and how they can represent division.

### Launch

• Display the word division.
• “¿Qué saben sobre la división?” // “What do you know about division?”
• 1 minute: quiet think time

### Activity

• Record responses.
• “¿Cómo podríamos representar la división?” // “How could we represent division?” (a drawing, with connecting cubes, an equation, an expression)

### Student Facing

¿Qué sabes sobre la división?

### Activity Synthesis

• “Ya hemos aprendido bastante sobre la división. Vamos a seguir aprendiendo sobre la división al trabajar con números más grandes que los que ya hemos usado antes” // “We have already learned a lot about division. We are going to continue to learn about division by working with larger numbers than we have before.”
• Consider asking: “¿Qué conexiones ven entre las diferentes respuestas?” // “What connections do you see between different answers?”

## Activity 1: Grupos en una excursión (20 minutes)

### Narrative

The purpose of this 5 Practices activity is to elicit students’ existing strategies for finding the value of quotients with larger numbers. Students should be encouraged to use whatever strategy or representation makes sense to them.

Monitor and select students with the following strategies to share in the synthesis:

• make groups of 4 and see how many groups there are (with objects, drawings, arrays, or base-ten blocks)
• multiply up starting with $$4 \times10$$
• break the dividend up into tens and ones and divide each part

If appropriate, discuss connections between the strategies as they are shared, rather than after all strategies are shared. It is not essential that all the listed strategies are discussed, as students will consider these ideas in upcoming lessons. The main goal here is to elicit what students currently understand.

When students make sense of the contextual division problem they reason abstractly and quantitatively (MP2). Students who use the relationship between multiplication and division make use of structure (MP7).

MLR7 Compare and Connect. Synthesis: Invite students to prepare a visual display that shows the strategy they used to figure out the number of groups. Encourage students to include details that will help others interpret their thinking. For example, specific language, using different colors, shading, arrows, labels, notes, diagrams, or drawings. Give students time to investigate each other’s work. During the whole-class discussion, ask students, “¿Alguien resolvió el problema de la misma manera, pero lo explicaría de otra forma? ¿Cómo se vieron los grupos de 4 en cada método? ¿Por qué al usar diferentes estrategias obtuvimos el mismo resultado?” // “Did anyone solve the problem the same way, but would explain it differently? How did the groups of 4 show up in each method? Why did the different approaches lead to the same outcome?”
Representation: Access for Perception. Synthesis: As students identify correspondences between strategies, follow along and point to the relevant parts of each strategy to amplify student thinking and illustrate connections.
Supports accessibility for: Conceptual Processing, Visual-Spatial Processing

### Required Materials

Materials to Gather

Materials to Copy

• Centimeter Grid Paper - Standard

### Launch

• Display the statement: “En una excursión al acuario, un curso de estudiantes se divide en grupos” // “On a field trip to the aquarium, a class of students is splitting into groups.”
• “¿Qué observan? ¿Qué se preguntan?” // “What do you notice? What do you wonder?” (Students may notice: They are going to the aquarium in groups. They can’t go in one big group. Students may wonder: How many kids are in the class? How many kids are in each group? Are the groups the same size?)
• 1 minute: quiet think time
• Share and record responses.
• Give students access to connecting cubes or counters, base-ten blocks, and grid paper.

### Activity

• “Resuelvan este problema. Usen la estrategia o la representación que prefieran” // “Solve this problem. Use whatever strategy or representation that works best for you.”
• 5 minutes: independent work time
• As students work, consider asking:
• “¿En qué parte de su trabajo están los grupos de 4?” // “Where are the groups of 4 in your work?”
• “¿En qué parte de su trabajo está el número de grupos?” // “Where is the number of groups in your work?”
• “Compartan su respuesta y estrategia con su compañero. Discutan en qué se parecen y en qué son diferentes” // “Share your response and strategy with your partner. Talk about how they are alike and how they are different.”
• 3 minutes: partner discussion

### Student Facing

Hay 48 estudiantes que van de excursión al acuario. Ellos visitan las exhibiciones en grupos de 4 estudiantes. ¿Cuántos grupos habrá?

Muestra cómo pensaste. Usa diagramas, símbolos u otras representaciones.

### Student Response

If students say they aren't sure how to start the problem, consider asking: “¿De qué se trata el problema?” // “What is the problem about?” and “¿Cómo podrías representar el problema?” // “How could you represent the problem?”

### Activity Synthesis

• Select previously identified students to share in the order listed in the activity narrative.
• As each strategy is presented, invite the class to ask questions.
• Keep all the strategies displayed.
• “¿En qué se parecen las estrategias?” // “How are the strategies alike?” (All the strategies used $$4\times 10 = 40$$ to help break the problem into smaller parts. The strategies with division and multiplication equations both had $$10 + 2 = 12$$.)
• “¿En qué son diferentes las estrategias?” // “How are the strategies different?” (In some strategies, students drew a representation. In others, students wrote multiplication or division expressions or equations.)

## Activity 2: Grupos en el bus y grupos en el almuerzo (15 minutes)

### Narrative

The purpose of this activity is for students to consider their strategies as they solve two other division problems involving equal groups with larger numbers. The divisor in the first problem is a low one-digit number. Students can see from the given situation that it is the number of groups. In the second problem, the divisor is a teen number, and the context suggests that it is the size of one group. Students are likely to adjust their strategy based on these observations. Focus the discussion on how students may have reasoned differently given a larger divisor or given what they understand about the situation.

### Required Materials

Materials to Gather

Materials to Copy

• Centimeter Grid Paper - Standard

### Launch

• Groups of 2
• “Lean los dos problemas sobre otra excursión. Piensen qué estrategias pueden usar para resolverlos” // “Read the two problems about another field trip. Think about what strategies you might use to solve them.”
• 1 minute: quiet think time
• “Compartan con su compañero cómo pensaron” // “Share your thinking with your partner.”
• 1 minute: partner discussion
• Give students access to connecting cubes or counters, base-ten blocks, and grid paper.

### Activity

• “Trabajen individualmente en los problemas durante unos minutos. Después, compartan sus respuestas con su compañero” // “Work independently on the problems for a few minutes. Then, share your responses with your partner.”
• 5 minutes: independent work time
• 3 minutes: partner discussion
• Monitor for students who use different representations (drew different diagrams or wrote different types of expressions or equations) for the two problems.

### Student Facing

En cada pregunta, muestra cómo pensaste. Usa diagramas, símbolos u otras representaciones.

1. En otra excursión, 72 estudiantes y profesores fueron al museo de ciencias en 3 buses, con el mismo número de personas en cada bus. ¿Cuántas personas viajaron en cada bus?
2. Durante el almuerzo, las 72 personas se sentaron en unas mesas largas. Había 12 personas en cada mesa. ¿Cuántas mesas usaron?

### Student Response

If students say they aren’t sure how to get started on the problem, consider asking: “¿De qué se trata el problema?” // “What is the problem about?” and “¿Cómo podrías representar el problema?” // “How could you represent the problem?”

### Activity Synthesis

• Invite students to share their responses. Display or record their reasoning.
• Poll the class on whether they used a different strategy for solving the second problem than used for the first.
• Ask those who used a different strategy: “¿Por qué cambiaron su estrategia?” // “Why did you change your strategy?” (Sample responses:
• In the first, the 3 represents 3 groups. In the second, the 12 is how many in each group.
• In the first, the number used to divide is smaller. In the second, the number is larger.)

## Lesson Synthesis

### Lesson Synthesis

“Hoy encontramos el valor de algunos cocientes de números más grandes que los que habíamos usado antes” // “Today we found the value of quotients with larger numbers than we have worked with before.”

“Vimos problemas en los que tuvimos que dividir 48 entre 4, 72 entre 3 y 72 entre 12” // “We saw problems that involved dividing 48 by 4, 72 by 3, and 72 by 12.”

“Reflexionen sobre las estrategias que usaron. ¿El tamaño del número que estaban dividiendo —48 y 72— influyó en la forma como resolvieron el problema? De ser así, ¿cómo influyó?” // “Reflect on the strategies you used. Did the size of the number being divided—48 and 72—affect how you solved the problem? If so, how?” (When the number was larger, I broke it up into more parts. When the number was smaller, I used a drawing, but when it was larger, I used another way.)