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Splash Screen.

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Presentation on theme: "Splash Screen."— Presentation transcript:

1 Splash Screen

2 Five-Minute Check (over Lesson 12–1) CCSS Then/Now New Vocabulary
Key Concept: Lateral Area of a Prism Example 1: Lateral Area of a Prism Key Concept: Surface Area of a Prism Example 2: Surface Area of a Prism Key Concept: Areas of a Cylinder Example 3: Lateral Area and Surface Area of a Cylinder Example 4: Real-World Example: Find Missing Dimensions Lesson Menu

3 Use isometric dot paper to sketch a cube 2 units on each edge.
A. B. C. D. 5-Minute Check 1

4 Use isometric dot paper to sketch a cube 2 units on each edge.
A. B. C. D. 5-Minute Check 1

5 Use isometric dot paper to sketch a triangular prism 3 units high with two sides of the base that are 5 units long and 2 units long. A. B. C. D. 5-Minute Check 2

6 Use isometric dot paper to sketch a triangular prism 3 units high with two sides of the base that are 5 units long and 2 units long. A. B. C. D. 5-Minute Check 2

7 Use isometric dot paper and the orthographic drawing to sketch a solid.
A. B. C. D. 5-Minute Check 3

8 Use isometric dot paper and the orthographic drawing to sketch a solid.
A. B. C. D. 5-Minute Check 3

9 Describe the cross section of a rectangular solid sliced on the diagonal.
A. triangle B. rectangle C. trapezoid D. rhombus 5-Minute Check 4

10 Describe the cross section of a rectangular solid sliced on the diagonal.
A. triangle B. rectangle C. trapezoid D. rhombus 5-Minute Check 4

11 Mathematical Practices
Content Standards G.MG.3 Apply geometric methods to solve problems (e.g., designing an object or structure to satisfy physical constraints or minimize cost; working with typographic grid systems based on ratios). Mathematical Practices 1 Make sense of problems and persevere in solving them. 6 Attend to precision. CCSS

12 You found areas of polygons.
Find lateral areas and surface areas of prisms. Find lateral areas and surface areas of cylinders. Then/Now

13 lateral face lateral edge base edge altitude height lateral area axis
composite solid Vocabulary

14 Concept

15 Find the lateral area of the regular hexagonal prism.
Lateral Area of a Prism Find the lateral area of the regular hexagonal prism. The bases are regular hexagons. So the perimeter of one base is 6(5) or 30 centimeters. Lateral area of a prism P = 30, h = 12 Multiply. Answer: Example 1

16 Find the lateral area of the regular hexagonal prism.
Lateral Area of a Prism Find the lateral area of the regular hexagonal prism. The bases are regular hexagons. So the perimeter of one base is 6(5) or 30 centimeters. Lateral area of a prism P = 30, h = 12 Multiply. Answer: The lateral area is 360 square centimeters. Example 1

17 Find the lateral area of the regular octagonal prism.
A. 162 cm2 B. 216 cm2 C. 324 cm2 D. 432 cm2 Example 1

18 Find the lateral area of the regular octagonal prism.
A. 162 cm2 B. 216 cm2 C. 324 cm2 D. 432 cm2 Example 1

19 Concept

20 Find the surface area of the rectangular prism.
Surface Area of a Prism Find the surface area of the rectangular prism. Example 2

21 Surface area of a prism L = Ph Substitution Simplify. Answer:
Example 2

22 Answer: The surface area is 360 square centimeters.
Surface Area of a Prism Surface area of a prism L = Ph Substitution Simplify. Answer: The surface area is 360 square centimeters. Example 2

23 Find the surface area of the triangular prism.
A. 320 units2 B. 512 units2 C. 368 units2 D. 416 units2 Example 2

24 Find the surface area of the triangular prism.
A. 320 units2 B. 512 units2 C. 368 units2 D. 416 units2 Example 2

25 Concept

26 L = 2rh Lateral area of a cylinder
Lateral Area and Surface Area of a Cylinder Find the lateral area and the surface area of the cylinder. Round to the nearest tenth. L = 2rh Lateral area of a cylinder = 2(14)(18) Replace r with 14 and h with 18. ≈ Use a calculator. Example 3

27 S = 2rh + 2r2 Surface area of a cylinder
Lateral Area and Surface Area of a Cylinder S = 2rh + 2r2 Surface area of a cylinder ≈ (14)2 Replace 2rh with and r with 14. ≈ Use a calculator. Answer: Example 3

28 S = 2rh + 2r2 Surface area of a cylinder
Lateral Area and Surface Area of a Cylinder S = 2rh + 2r2 Surface area of a cylinder ≈ (14)2 Replace 2rh with and r with 14. ≈ Use a calculator. Answer: The lateral area is about square feet and the surface area is about square feet. Example 3

29 A. lateral area ≈ 1508 ft2 and surface area ≈ 2412.7 ft2
Find the lateral area and the surface area of the cylinder. Round to the nearest tenth. A. lateral area ≈ 1508 ft2 and surface area ≈ ft2 B. lateral area ≈ 1508 ft2 and surface area ≈ ft2 C. lateral area ≈ 754 ft2 and surface area ≈ ft2 D. lateral area ≈ 754 ft2 and surface area ≈ ft2 Example 3

30 A. lateral area ≈ 1508 ft2 and surface area ≈ 2412.7 ft2
Find the lateral area and the surface area of the cylinder. Round to the nearest tenth. A. lateral area ≈ 1508 ft2 and surface area ≈ ft2 B. lateral area ≈ 1508 ft2 and surface area ≈ ft2 C. lateral area ≈ 754 ft2 and surface area ≈ ft2 D. lateral area ≈ 754 ft2 and surface area ≈ ft2 Example 3

31 L = 2rh Lateral area of a cylinder
Find Missing Dimensions MANUFACTURING A soup can is covered with the label shown. What is the radius of the soup can? L = 2rh Lateral area of a cylinder 125.6 = 2r(8) Replace L with 15.7 ● and h with 8. 125.6 = 16r Simplify. 2.5 ≈ r Divide each side by 16. Example 4

32 Find Missing Dimensions
Answer: Example 4

33 Answer: The radius of the soup can is about 2.5 inches.
Find Missing Dimensions Answer: The radius of the soup can is about 2.5 inches. Example 4

34 Find the diameter of a base of a cylinder if the surface area is 480 square inches and the height is 8 inches. A. 12 inches B. 16 inches C. 18 inches D. 24 inches Example 4

35 Find the diameter of a base of a cylinder if the surface area is 480 square inches and the height is 8 inches. A. 12 inches B. 16 inches C. 18 inches D. 24 inches Example 4

36 End of the Lesson


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