Binomials Lesson 2 (Teachers)

This lesson can help students:

• Understand that when you increase the length and width of a rectangle (e.g., when you increase both the length and width of a 10 ft by 8 ft rectangular office by 3 ft to create a new office), then the area is increased by the sum of the following areas: 10 ft × 3 ft = 30 ft²; 8 ft × 3 ft = 24 ft²; and 3 ft × 3 ft = 9 ft².   
• Create a drawing that shows what happens to the area of rectangle when both its length and width are increased. 
• Represent the area of the new rectangle through a 2-dimensional drawing that decomposes the new area into four parts, one of which is the area of the original rectangle. 

• CCSS.MATH.CONTENT.HSN.Q.A.2. Define appropriate quantities for the purpose of descriptive modeling.
  
  Emily and Mauricio define many quantities in the modeling tasks in this lesson, which are set in the context of determining the area of rooms in a home using an architectural blueprint. These quantities include: the length and width of a given home office, the amount of increase in the length, the amount of increase in the width, the area of the original office, the area of the new office, and the length, width and area of three rectangular spaces that are created when the length and width of the original office are increased. 
  
• CCSS.MATH.CONTENT.3.MD.C.7.D. Recognize area as additive. Find areas of rectilinear figures by decomposing them into non-overlapping rectangles and adding the areas of the non-overlapping parts, applying this technique to solve real world problems.
  
  In this lesson, Mauricio and Emily consider the effect of increasing both the length and width of a 10 ft by 8 ft rectangular office by 3 ft to create a new office. They predict that the area of the original office will be increase by 9 ft² (3 ft × 3ft), when, in fact, that increase should be 63 ft². The students create a drawing to explain why increasing the length and width of a room increases the area so much more than they predicted. Their drawing decomposes the area of the new office into four parts: the original office with an area of 80 ft², the increase of 9ft² that they predicted, and two other rectangles of area 30 ft² and 24 ft². 

CCSS.MATH.PRACTICE.MP4. Model with mathematics.

According to the CCSSM, mathematically proficient students “can apply the mathematics they know to solve problems arising in everyday life…. They are able to identify important quantities in a practical situation and map their relationships using such tools as diagrams…They routinely interpret their mathematical results in the context of the situation and reflect on whether the results make sense, possibly improving the model if it has not served its purpose.” Throughout this lesson, Emily and Mauricio model with mathematics in the practical situation of finding the area of rooms in a house from architectural blueprints, and of determining the effect of changing the length and width on the area of the rooms. In Episode 1, they start by making sense of the floor plans that architects use to represent rooms in a house. Later, they tackle the challenge of creating a single drawing that shows both an original home office and a new office, which is formed by increasing the length and width of the original office [e.g., Episode 5, 3:11]. In Episode 6, they refine their drawing from Episode 5 to better analyze how the changes in length and width affect the area [1:30]. Finally, in Episode 7, Emily and Mauricio write equations to express different ways to find the area of the new office and carefully interpret each number and term in their equations in the context of architectural floor plans.