Warm Up

Warm Up 1. Use isometric dot paper to sketch a rectangle box 3 units tall with a base of 2 units by 5 units. 2. Sketch a cube in one-point perspective. 3. Sketch a brick in two-point perspective.

Volume of Prisms and Cylinders 6.6 Pre-Algebra

Learn to find the volume of prisms and cylinders.

Vocabulary prism cylinder

A prism is a three-dimensional figure named for the shape of its bases. The two bases are congruent polygons. All of the other faces are parallelograms. A cylinder has two circular bases.

Remember! If all six faces of a rectangular prism are squares, it is a cube. Rectangular prism Cylinder Triangular prism Height Height Height Base Base Base

VOLUME OF PRISMS AND CYLINDERS B = 2(5) = 10 units2 V = Bh V = 10(3) = 30 units3 B = p(22) V = Bh = 4p units2 = (pr2)h V = (4p)(6) = 24p 75.4 units3

Helpful Hint Area is measured in square units. Volume is measured in cubic units.

Example: Finding the Volume of Prisms and Cylinders Find the volume of each figure to the nearest tenth. A. A rectangular prism with base 2 cm by 5 cm and height 3 cm. B = 2 • 5 = 10 cm2 Area of base Volume of a prism V = Bh = 10 • 3 = 30 cm3

Example: Finding the Volume of Prisms and Cylinders Find the volume of the figure to the nearest tenth. B. B = p(42) = 16pin2 Area of base 4 in. Volume of a cylinder V = Bh 12 in. = 16p• 12 = 192p  602.9 in3

1 2 B = • 6 • 5 = 15 ft2 Example: Finding the Volume of Prisms and Cylinders Find the volume of the figure to the nearest tenth. C. Area of base 5 ft V = Bh Volume of a prism = 15 • 7 = 105 ft3 7 ft 6 ft

Try This Find the volume of the figure to the nearest tenth. A. A rectangular prism with base 5 mm by 9 mm and height 6 mm. B = 5 • 9 = 45 mm2 Area of base Volume of prism V = Bh = 45 • 6 = 270 mm3

Try This Find the volume of the figure to the nearest tenth. B = p(82) Area of base B. 8 cm = 64p cm2 Volume of a cylinder V = Bh 15 cm = (64p)(15) = 960p 3,014.4 cm3

1 2 B = • 12 • 10 Try This Find the volume of the figure to the nearest tenth. C. Area of base 10 ft = 60 ft2 Volume of a prism V = Bh = 60(14) 14 ft = 840 ft3 12 ft

Example: Exploring the Effects of Changing Dimensions A juice box measures 3 in. by 2 in. by 4 in. Explain whether tripling the length, width, or height of the box would triple the amount of juice the box holds. The original box has a volume of 24 in3. You could triple the volume to 72 in3 by tripling any one of the dimensions. So tripling the length, width, or height would triple the amount of juice the box holds.

Example: Exploring the Effects of Changing Dimensions A juice can has a radius of 2 in. and a height of 5 in. Explain whether tripling the height of the can would have the same effect on the volume as tripling the radius. By tripling the height, you would triple the volume. By tripling the radius, you would increase the volume to nine times the original.

Try This A box measures 5 in. by 3 in. by 7 in. Explain whether tripling the length, width, or height of the box would triple the volume of the box. The original box has a volume of (5)(3)(7) = 105 cm3. V = (15)(3)(7) = 315 cm3 Tripling the length would triple the volume.

Try This A box measures 5 in. by 3 in. by 7 in. Explain whether tripling the length, width, or height of the box would triple the volume of the box. The original box has a volume of (5)(3)(7) = 105 cm3. V = (5)(3)(21) = 315 cm3 Tripling the height would triple the volume.

Try This A box measures 5 in. by 3 in. by 7 in. Explain whether tripling the length, width, or height of the box would triple the volume of the box. The original box has a volume of (5)(3)(7) = 105 cm3. V = (5)(9)(7) = 315 cm3 Tripling the width would triple the volume.

Try This A cylinder measures 3 cm tall with a radius of 2 cm. Explain whether tripling the radius or height of the cylinder would triple the amount of volume. The original cylinder has a volume of 4 • 3 = 12 cm3. V = 36 • 3= 108cm3 By tripling the radius, you would increase the volume nine times.

Try This A cylinder measures 3 cm tall with a radius of 2 cm. Explain whether tripling the radius or height of the cylinder would triple the amount of volume. The original cylinder has a volume of 4 • 3 = 12 cm3. V = 4 • 9= 36cm3 Tripling the height would triple the volume.

Example: Construction Application A section of an airport runway is a rectangular prism measuring 2 feet thick, 100 feet wide, and 1.5 miles long. What is the volume of material that was needed to build the runway? length = 1.5 mi = 1.5(5280) ft = 7920 ft The volume of material needed to build the runway was 1,584,000 ft3. width = 100 ft height = 2 ft V = 7920 • 100 • 2 ft3 = 1,584,000 ft3

740.74 9 = 82.3 Truck loads 20,000 27  740.74 yd3 Try This A cement truck has a capacity of 9 yards3 of concrete mix. How many truck loads of concrete to the nearest tenth would it take to pour a concrete slab 1 ft thick by 200 ft long by 100 ft wide? B = 200(100) = 20,000 ft2 V = 20,000(1) = 20,000 ft3 27 ft3 = 1 yd3

Volume of barn Volume of rectangular prism Volume of triangular prism = + 1 2 V = (40)(50)(15) + (40)(10)(50) Example: Finding the Volume of Composite Figures Find the volume of the the barn. = 30,000 + 10,000 = 40,000 ft3 The volume is 40,000 ft3.

Volume of barn Volume of rectangular prism Volume of triangular prism 1 2 = = (8)(3)(4) + (5)(8)(3) + Try This Find the volume of the figure. 5 ft = 96 + 60 4 ft V = 156 ft3 8 ft 3 ft

Lesson Quiz Find the volume of each figure to the nearest tenth. Use 3.14 for p. 10 in. 1. 3. 2 in. 2. 12 in. 12 in. 10.7 in. 15 in. 3 in. 8.5 in. 942 in3 160.5 in3 306 in3 4. Explain whether doubling the radius of the cylinder above will double the volume. No; the volume would be quadrupled because you have to use the square of the radius to find the volume.

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