In this activity, students see that they can find equivalent fractions by dividing the numerator and denominator by a common factor. They connect this strategy to the process of grouping unit fractions on a number line into larger equal-size parts. The result is fewer parts, and lesser numbers for the numerator and denominator of equivalent fractions.

• “¿Qué hizo Andre con las rectas numéricas? ¿Cómo le ayudó esto a encontrar fracciones equivalentes?” // “What did Andre do with the number lines? How would it help him find equivalent fractions?” (Andre grouped the 12 parts into equal groups of different sizes—2s, then 4s—to make bigger parts. Then, he counted the number of those new parts.)
• “¿Qué hizo Kiran? ¿Cómo se relaciona su estrategia con la de Andre?” // “What did Kiran do? How is his strategy related to Andre’s?” (Kiran divided 12 by 4 and then by 2, similar to how Andre put 12 parts into groups of 4 and then into groups of 2.)
•  “Observen que ambas fracciones equivalentes,  y , tienen números más pequeños para el numerador y el denominador que la fracción original. ¿Pueden usar la recta numérica de Andre para mostrar por qué sucede esto?” //  “Notice that the equivalent fractions and both have smaller numbers for the numerator and denominator than the original fraction. Can you use Andre’s number line to show why this might be?” (The size of the parts are bigger, so there are fewer parts in 1 whole.)

If time permits, ask students:

• “¿Cuántas fracciones equivalentes pueden encontrar para  usando la estrategia de Kiran?” // “How many equivalent fractions can you find for using Kiran’s way?” (One: ) “Cuántas pueden encontrar para ?” // “How many can you find for ?” (Three: , , ) 
• “¿Cuál puede ser una razón por la que se pueden encontrar más fracciones equivalentes para  que para ?” // “What might be a reason that you could find more equivalent fractions for than for ?” (18 and 12 have more factors in common than 10 and 12.)
• “¿Cómo mostrarían  en la recta numérica?” // “How would you show on the number line?” (Put the original 12 parts into groups of 3 to get 4 parts, each being a fourth. Mark 3 of those 4 parts to show .)

In this activity, students generate equivalent fractions by applying the numerical strategies they learned. (Students might opt to use other strategies, but most of the given fractions have numbers that would make visual representation and reasoning inconvenient.) Depending on the given fractions, students need to decide whether it makes sense to multiply or divide the numerator and denominator by a common number.

If students attempt to find equivalent fractions by drawing number lines, consider asking:

• “¿Cómo decidiste encontrar las fracciones equivalentes?” // “How did you decide to find equivalent fractions?”
• “¿Cómo podemos usar la estrategia de Kiran de la actividad anterior para ayudarnos aquí?” // “How can we use Kiran’s strategy from the previous activity to help us here?”

• See Lesson Synthesis.

This activity is optional because it provides an opportunity for students to apply concepts from previous activities that not all classes may need. It allows students to practice using numerical strategies to find equivalent fractions by sorting a set of 36 cards. Students are not expected to find all equivalent fractions in the set. When students look for equivalent fractions, they use their understanding of multiples and factors and the meaning of fractions (MP7).

• “¿Qué estrategia usó su grupo para encontrar fracciones equivalentes? ¿Qué tan bien funcionó la estrategia? ¿Qué tan eficiente fue?” // “What strategy did your group use to find equivalent fractions? How well did the strategy work? How efficient was it?” (We looked at the numerators and denominators to see if they were multiples or factors we recognized.)
• “¿Observaron patrones nuevos en las fracciones que son equivalentes?” // “Did you notice any new patterns in the fractions that are equivalent?”