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Chapter 11 Measurement: Perimeter, Area, and Volume Click the mouse or press the space bar to continue. Splash Screen

Measurement: Perimeter, Area, and Volume 11 Lesson 11-1 Perimeter Lesson 11-2Area of Parallelograms Lesson 11-3 Problem-Solving Strategy: Make a Model Lesson 11-4 Area of Triangles Lesson 11-5Problem-Solving Investigation: Choose the Best Strategy Lesson 11-6 Volume of Rectangular Prisms Lesson 11-7Surface Area of Rectangular Prisms Chapter Menu

Perimeter 11-1 Five-Minute Check (over Chapter 10) Main Idea and Vocabulary California Standards Key Concept: Perimeter of a Square Key Concept: Perimeter of a Rectangle Example 1 Example 2 Lesson 1 Menu

Perimeter 11-1 • I will find the perimeters of squares and rectangles. • perimeter Lesson 1 MI/Vocab

Perimeter 11-1 Standard 5MG1.4Differentiate between, and use appropriate units of measures for two-and three-dimensionalobjects (i.e., find the perimeter,area, volume). Lesson 1 Standard 1

Perimeter 11-1 Lesson 1 Key Concept 1

Perimeter 11-1 Lesson 1 Key Concept 2

Perimeter 11-1 The base of the Eiffel Tower is shaped like a square with each side measuring 125 meters. What is the perimeter of the base? P = 4s Perimeter of a square P = 4(125) Replace s with 125. P = 500 Multiply. Answer: The perimeter of the base of the Eiffel Tower is 500 meters. Lesson 1 Ex1

Perimeter 11-1 The park is shaped like a square with each side measuring 100 yards. What is the perimeter of the park? • 400 feet • 400 yards • 200 yards • 100 yards Lesson 1 CYP1

Perimeter 11-1 7 m 4 m P = 2+ 2w Replace with 7 and w with 4. Find the perimeter of the rectangle. Write the formula. P = 2(7) + 2(4) P = 14 + 8 Multiply. P = 22 Add. Answer: The perimeter is 22 meters. Lesson 1 Ex2

Perimeter 11-1 3 cm 1 cm Find the perimeter of the rectangle. • 7 cm • 6 cm • 8 cm • 10 cm Lesson 1 CYP2

End of Lesson 1

Area of Parallelograms 11-2 Five-Minute Check (over Lesson 11-1) Main Idea California Standards Key Concept: Area of a Parallelogram Example 1 Example 2 Example 3 Lesson 2 Menu

Area of Parallelograms 11-2 • I will find the areas of parallelograms. • base • height Lesson 2 MI/Vocab

Area of Parallelograms 11-2 Standard 5MG1.1Derive and use the formula for the area of atriangle and of a parallelogram by comparing it with the formula for the area of a rectangle. Standard 5MG1.4Differentiate between, and use appropriate units of measures for two-and three-dimensional objects. Lesson 2 Standard 1

Area of Parallelograms 11-2 Lesson 2 Key Concept

Area of Parallelograms 11-2 Find the area of the parallelogram. The base is 3 and the height is 10. A = bh Area of parallelogram A = 3•10 Replace b with 3 and h with 10. A = 30 Multiply. Answer:The area is 30 square units or 30 units2. Lesson 2 Ex1

Area of Parallelograms 11-2 Find the area of the parallelogram. • 35 units2 • 28 units2 • 49 units2 • 64 units2 Lesson 2 CYP1

Area of Parallelograms 11-2 Find the area of the parallelogram. A = bh Area of parallelogram A= 8.2 • 4.5 Replace b with 8.2 and h with 4.5. A = 36.9 Multiply. Answer:The area is 36.9 square centimeters or 36.9 cm2. Lesson 2 Ex2

Area of Parallelograms 11-2 Find the area of the parallelogram. • 68 mm2 • 70 mm2 • 68.64 mm2 • 70.42 mm2 Lesson 2 CYP2

Area of Parallelograms 11-2 1 2 1 Estimate 6 is about 6 and 10 is about 11. 4 A particular area rug is shaped like a parallelogram. Estimate the area of the floor it will cover. A = bh Area of parallelogram A= 11 • 6 Replace b with 11 and h with 6. A = 66 Multiply. Answer:The area of the rug is about 66 ft2. Lesson 2 Ex3

Area of Parallelograms 11-2 A parking lot is shaped like a parallelogram. Estimate the area of ground it will cover. • 7,000 sq. yds. • 7,200 sq. yds. • 7,140 sq. yds. • 7,080 sq. yds. Lesson 2 CYP3

End of Lesson 2

Problem-Solving Strategy: Make a Model 11-3 Five-Minute Check (over Lesson 11-2) Main Idea California Standards Example 1: Problem-Solving Strategy Lesson 3 Menu

Problem-Solving Strategy: Make a Model 11-3 • I will solve problems by making a model. Lesson 3 MI/Vocab

Problem-Solving Strategy: Make a Model 11-3 Standard 5MR2.3Use a variety of methods, such aswords, numbers, symbols, charts, graphs, tables, diagrams, and models, to explain mathematical reasoning. Standard 5MG1.4 Differentiate between, and use appropriate units of measures for two-and three-dimensionalobjects. Lesson 3 Standard 1

Problem-Solving Strategy: Make a Model 11-3 While volunteering at the local farm market, Julia was asked to make a display for the oranges. She needs to stack the oranges in the shape of a square pyramid. The base should have 100 oranges and one orange needs to be on top. There are 400 oranges total. Are 400 oranges enough to make a square pyramid with a base of 100 oranges? Lesson 3 Ex1

Problem-Solving Strategy: Make a Model 11-3 Understand What facts do you know? • The oranges need to be in the shape of a square pyramid with 100 oranges in the base and 1 orange on top. • There are 400 oranges altogether. What do you need to find? • Are 400 oranges enough to make a square pyramid with a base of 100 oranges? Lesson 3 Ex1

Problem-Solving Strategy: Make a Model 11-3 Plan Make a model using pennies to find the number of oranges needed. Lesson 3 Ex1

Problem-Solving Strategy: Make a Model 11-3 second layer third layer fourth layer bottom layer 81 64 49 100 Solve Begin with 100 pennies. For each consecutive layer, place 1 penny where 4 meet. Lesson 3 Ex1

Problem-Solving Strategy: Make a Model 11-3 Solve Answer: By continuing this pattern, 100 + 81 + 64 + 49 + 36 + 25 + 16 + 9 + 4 + 1 or 385 oranges will be needed. Since 385 < 400, 400 oranges are enough to make a square pyramid. Lesson 3 Ex1

Problem-Solving Strategy: Make a Model 11-3 Check Look back at the problem. 400 – 100 – 81 – 64 – 49 – 36 – 25 – 16 – 9 – 4 – 1 leaves 15 oranges. Lesson 3 Ex1

End of Lesson 3

Area of Triangles 11-4 Five-Minute Check (over Lesson 11-3) Main Idea California Standards Key Concept: Area of a Triangle Example 1 Example 2 Example 3 Area of Triangles Lesson 4 Menu

Area of Triangles 11-4 • I will find the areas of triangles. Lesson 4 MI/Vocab

Area of Triangles 11-4 Standard 5MG1.1Derive and use the formula for the area of a triangleand of a parallelogram by comparing it with the formula for the area of a rectangle. Standard 5MG1.4Differentiate between, and use appropriate units of measures for two-and three-dimensionalobjects. Lesson 4 Standard 1

Area of Triangles 11-4 Lesson 4 Key Concept

Area of Triangles 11-4 1 1 2 2 A = bh A = (5)•(8) Find the area of the triangle. By counting, you find that the measure of the base of the triangle is 5 and the height is8. Area of a triangle Replace b with 5 and h with 8. Lesson 4 Ex1

Area of Triangles 11-4 1 2 A = (40) Multiply. A = 20 Multiply. Answer: The area of the triangle is 20 square units. Lesson 4 Ex1

Area of Triangles 11-4 1 2 C. 12 sq. units Find the area of the triangle. A. 25 sq. units B. 16 sq. units D. 20 sq. units Lesson 4 CYP1

Area of Triangles 11-4 1 1 2 2 A = bh A = (16.4)•(7.9) Find the area of the triangle. Area of a triangle Replace b with 16.4 and h with 7.9. Lesson 4 Ex2

Area of Triangles 11-4 1 2 A= (129.56) Multiply. Divide. 129.56 ÷ 2 = 64.78 A = 64.78 Answer: The area of the triangle is 64.78 square meters. Lesson 4 Ex2

Area of Triangles 11-4 1 1 2 2 C. 49 cm D. 49 sq. cm Clio cut out a banner in the shape of a triangle. What is the area of the banner? • 99 sq. cm B. 99 cm Lesson 4 CYP2

Area of Triangles 11-4 1 1 2 2 A = bh A = (12)•(6) Find the area of the triangle. Area of a triangle Replace b with 12 and h with 6. Lesson 4 Ex3

Area of Triangles 11-4 1 2 A = (72) Multiply. Divide. 72 ÷2 = 36.5 A = 36.5 Answer: The area of the triangle is 36.5 square inches. Lesson 4 Ex3

Area of Triangles 11-4 Kira drew a triangle on the sidewalk with chalk. What is the area of her triangle? • 21 sq. ft • 10.5 sq. ft • 20 sq. ft • 11 sq. ft Lesson 4 CYP3

End of Lesson 4

Problem-Solving Investigation: Choose the Best Strategy 11-5 Five-Minute Check (over Lesson 11-4) Main Idea California Standards Example 1: Problem-Solving Investigation Lesson 5 Menu

Problem-Solving Investigation: Choose the Best Strategy 11-5 • I will choose the best strategy to solve a problem. Lesson 5 MI/Vocab

Problem-Solving Investigation: Choose the Best Strategy 11-5 Standard 5MR2.3Use a variety of methods, such aswords, numbers,symbols, charts, graphs, tables, diagrams, and models, to explain mathematical reasoning. Standard 5MG1.4Differentiate between, and use appropriate units of measures for two-and three-dimensionalobjects. Lesson 5 Standard 1

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