Holt McDougal Geometry 10-4 Surface Area of Prisms and Cylinders 10-4 Surface Area of Prisms and Cylinders Holt Geometry Warm Up Warm Up Lesson Presentation Lesson Presentation Lesson Quiz Lesson Quiz Holt McDougal Geometry

10-4 Surface Area of Prisms and Cylinders Warm Up Find the perimeter and area of each polygon. 1. a rectangle with base 14 cm and height 9 cm 2. a right triangle with 9 cm and 12 cm legs 3. an equilateral triangle with side length 6 cm P = 46 cm; A = 126 cm 2 P = 36 cm; A = 54 cm 2

Holt McDougal Geometry 10-4 Surface Area of Prisms and Cylinders Learn and apply the formula for the surface area of a prism. Learn and apply the formula for the surface area of a cylinder. Objectives

Holt McDougal Geometry 10-4 Surface Area of Prisms and Cylinders lateral face lateral edge right prism oblique prism altitude surface area lateral surface axis of a cylinder right cylinder oblique cylinder Vocabulary

Holt McDougal Geometry 10-4 Surface Area of Prisms and Cylinders Prisms and cylinders have 2 congruent parallel bases. A lateral face is not a base. The edges of the base are called base edges. A lateral edge is not an edge of a base. The lateral faces of a right prism are all rectangles. An oblique prism has at least one nonrectangular lateral face.

Holt McDougal Geometry 10-4 Surface Area of Prisms and Cylinders An altitude of a prism or cylinder is a perpendicular segment joining the planes of the bases. The height of a three-dimensional figure is the length of an altitude. Surface area is the total area of all faces and curved surfaces of a three-dimensional figure. The lateral area of a prism is the sum of the areas of the lateral faces.

Holt McDougal Geometry 10-4 Surface Area of Prisms and Cylinders The surface area of a right rectangular prism with length ℓ, width w, and height h can be written as S = 2ℓw + 2wh + 2ℓh.

Holt McDougal Geometry 10-4 Surface Area of Prisms and Cylinders The surface area formula is only true for right prisms. To find the surface area of an oblique prism, add the areas of the faces. Caution!

Holt McDougal Geometry 10-4 Surface Area of Prisms and Cylinders Example 1A: Finding Lateral Areas and Surface Areas of Prisms Find the lateral area and surface area of the right rectangular prism. Round to the nearest tenth, if necessary. L = Ph = 32(14) = 448 ft 2 S = Ph + 2B = (7)(9) = 574 ft 2 P = 2(9) + 2(7) = 32 ft

Holt McDougal Geometry 10-4 Surface Area of Prisms and Cylinders Example 1B: Finding Lateral Areas and Surface Areas of Prisms Find the lateral area and surface area of a right regular triangular prism with height 20 cm and base edges of length 10 cm. Round to the nearest tenth, if necessary. L = Ph = 30(20) = 600 cm 2 S = Ph + 2B P = 3(10) = 30 cm The base area is

Holt McDougal Geometry 10-4 Surface Area of Prisms and Cylinders Check It Out! Example 1 Find the lateral area and surface area of a cube with edge length 8 cm. L = Ph = 32(8) = 256 cm 2 S = Ph + 2B = (8)(8) = 384 cm 2 P = 4(8) = 32 cm

Holt McDougal Geometry 10-4 Surface Area of Prisms and Cylinders The lateral surface of a cylinder is the curved surface that connects the two bases. The axis of a cylinder is the segment with endpoints at the centers of the bases. The axis of a right cylinder is perpendicular to its bases. The axis of an oblique cylinder is not perpendicular to its bases. The altitude of a right cylinder is the same length as the axis.

Holt McDougal Geometry 10-4 Surface Area of Prisms and Cylinders

Holt McDougal Geometry 10-4 Surface Area of Prisms and Cylinders Example 2A: Finding Lateral Areas and Surface Areas of Right Cylinders Find the lateral area and surface area of the right cylinder. Give your answers in terms of . L = 2rh = 2(8)(10) = 160 in 2 The radius is half the diameter, or 8 in. S = L + 2r 2 = 160 + 2(8) 2 = 288 in 2

Holt McDougal Geometry 10-4 Surface Area of Prisms and Cylinders Example 2B: Finding Lateral Areas and Surface Areas of Right Cylinders Find the lateral area and surface area of a right cylinder with circumference 24 cm and a height equal to half the radius. Give your answers in terms of . Step 1 Use the circumference to find the radius. C = 2r Circumference of a circle 24 = 2r Substitute 24 for C. r = 12 Divide both sides by 2.

Holt McDougal Geometry 10-4 Surface Area of Prisms and Cylinders Example 2B Continued Step 2 Use the radius to find the lateral area and surface area. The height is half the radius, or 6 cm. L = 2rh = 2(12)(6) = 144 cm 2 S = L + 2r 2 = 144 + 2(12) 2 = 432 in 2 Lateral area Surface area Find the lateral area and surface area of a right cylinder with circumference 24 cm and a height equal to half the radius. Give your answers in terms of .

Holt McDougal Geometry 10-4 Surface Area of Prisms and Cylinders Check It Out! Example 2 Find the lateral area and surface area of a cylinder with a base area of 49 and a height that is 2 times the radius. Step 1 Use the circumference to find the radius. A = r 2 49 = r 2 r = 7 Area of a circle Substitute 49 for A. Divide both sides by  and take the square root.

Holt McDougal Geometry 10-4 Surface Area of Prisms and Cylinders Step 2 Use the radius to find the lateral area and surface area. The height is twice the radius, or 14 cm. L = 2rh = 2(7)(14)=196 in 2 S = L + 2r 2 = 196 + 2(7) 2 =294 in 2 Lateral area Surface area Find the lateral area and surface area of a cylinder with a base area of 49 and a height that is 2 times the radius. Check It Out! Example 2 Continued

Holt McDougal Geometry 10-4 Surface Area of Prisms and Cylinders Example 3: Finding Surface Areas of Composite Three-Dimensional Figures Find the surface area of the composite figure.

Holt McDougal Geometry 10-4 Surface Area of Prisms and Cylinders Example 3 Continued Two copies of the rectangular prism base are removed. The area of the base is B = 2(4) = 8 cm 2. The surface area of the rectangular prism is.. A right triangular prism is added to the rectangular prism. The surface area of the triangular prism is

Holt McDougal Geometry 10-4 Surface Area of Prisms and Cylinders The surface area of the composite figure is the sum of the areas of all surfaces on the exterior of the figure. Example 3 Continued S = (rectangular prism surface area) + (triangular prism surface area) – 2(rectangular prism base area) S = – 2(8) = 72 cm 2

Holt McDougal Geometry 10-4 Surface Area of Prisms and Cylinders Check It Out! Example 3 Find the surface area of the composite figure. Round to the nearest tenth.

Holt McDougal Geometry 10-4 Surface Area of Prisms and Cylinders Check It Out! Example 3 Continued Find the surface area of the composite figure. Round to the nearest tenth. The surface area of the rectangular prism is S =Ph + 2B = 26(5) + 2(36) = 202 cm 2. The surface area of the cylinder is S =Ph + 2B = 2(2)(3) + 2(2) 2 = 20 ≈ 62.8 cm 2. The surface area of the composite figure is the sum of the areas of all surfaces on the exterior of the figure.

Holt McDougal Geometry 10-4 Surface Area of Prisms and Cylinders S = (rectangular surface area) + (cylinder surface area) – 2(cylinder base area) S = — 2()(2 2 ) = cm 2 Check It Out! Example 3 Continued Find the surface area of the composite figure. Round to the nearest tenth.

Holt McDougal Geometry 10-4 Surface Area of Prisms and Cylinders Always round at the last step of the problem. Use the value of  given by the  key on your calculator. Remember!

Holt McDougal Geometry 10-4 Surface Area of Prisms and Cylinders MOVE TO CONES AND PYRAMIDS

Holt McDougal Geometry 10-4 Surface Area of Prisms and Cylinders Example 5: Recreation Application A sporting goods company sells tents in two styles, shown below. The sides and floor of each tent are made of nylon. Which tent requires less nylon to manufacture?

Holt McDougal Geometry 10-4 Surface Area of Prisms and Cylinders Example 5 Continued Pup tent: Tunnel tent: The tunnel tent requires less nylon.

Holt McDougal Geometry 10-4 Surface Area of Prisms and Cylinders Lesson Quiz: Part I Find the lateral area and the surface area of each figure. Round to the nearest tenth, if necessary. 1. a cube with edge length 10 cm 2. a regular hexagonal prism with height 15 in. and base edge length 8 in. 3. a right cylinder with base area 144 cm 2 and a height that is the radius L = 400 cm 2 ; S = 600 cm 2 L = 720 in 2 ; S  in 2 L  cm 2 ; S = cm 2

Holt McDougal Geometry 10-4 Surface Area of Prisms and Cylinders Lesson Quiz: Part II 4. Find the surface area of the composite figure. S = 3752 m 2