Chapter 12 Surface Area and Volume Identify the parts of prisms, pyramids, cylinders and cones. Find the lateral areas, total areas and volumes of right prisms, regular pyramids, cones and cylinders.
12-1: Prisms Objectives Learn and apply the area and volume formula for a prism.
Anatomy of a Prism Base Base Edge Lateral edge Lateral Face Altitude
Oblique vs. Right The lateral edges of a right prism are perpendicular to the base.
The name of a prism comes from its base. Names of Prisms Rectangular Oblique Prism Triangular Right Prism
Surface Area The total surface area of a prism is the sum of all the lateral faces and the two bases.
Lateral Area The lateral area of a right prism is the product of the perimeter of the base and the height. LA = p x h
Volume The volume of a right prism is the product of the area of the base and the height. V = B x h
Total Area TA=LA+2B
White Board Practice A right triangular prism has base edges of 5, 12, and 13. It has a volume of 450. Find the height of the prism.
White Board Practice The base of a triangular prism is an isosceles right triangle with legs of 3 cm. The height of the prism is 10 cm. Find the lateral area, total area, and volume of the prism
12-2:Pyramids Objectives Learn and apply the area and volume formula for a pyramid.
Anatomy of a Pyramid Base Base Edge Lateral edge Lateral Face Altitude Slant Height Vertex
Rotate the pyramid….. this is hard
Oblique vs. Right The altitude of a right pyramid passes through the center of the base.
The name of a pyramid comes from its base. Names of Pyramids Triangular Oblique Pyramid Square Right Pyramid
Lateral Area The lateral area of a right pyramid is one half the product of the perimeter of the base and the slant height. p l
Total Area The total surface area of a pyramid is the sum of all the lateral faces and the base or it is the total are plus one base area TA = LA + B
Volume The volume of a right pyramid is one third the product of the area of the base and the height. h B
White Board Practice A regular square pyramid had base edge 6m and lateral edge 5m. a) Find the length of a slant height b) Find the Lateral Area c) Find the Base Area d) Find the Total Area e) Find the Length of the altitude f) Find the Volume
12-3: Cylinders and Cones Objectives Find the area and volume for a cylinder and a cone.
Cylinder A cylinder is a prism with a circular base. r h Base
LA and TA The lateral area of a cylinder is the product of the perimeter(?) of the base and the height. r h LA = ph LA = (2Пr) h TA = LA + 2 Пr 2
Volume The volume of a cylinder is the product of the area of the base and the height. r h
Cone A cone is a pyramid with a circular base. r h Base
LA and TA The lateral area of a cone is one half the product of the circumference of the base and the slant height. r h LA = ½ pl LA = ½ (2Пr) h LA = Пrh
Volume The volume of a cone is one third the product of the area of the base and the height. r h V = 1/3 Пr 2 h
White Board Practice Find the lateral area, total area and volume of a cone with height and radius 3 cm.
White Board Practice Find the lateral area, total area and volume of a cone with height and radius 3 cm. LA = 18 cm 2 TA = 27 cm 2 V = 9 cm 3
12-4: Spheres Objectives Determine the area and volume of a sphere.
Sphere r A sphere is the locus (set) of points in space equidistant from a given point.
Volume of a Sphere r V = 4/3 Пr 3
Area of a Sphere The area of a sphere is four times the area of the circle with the same radius. r
White Board Practice If the surface area of a sphere is 16 , find the diameter and the volume
White Board Practice If the surface area of a sphere is 16 , find the diameter and the volume d = 4 V =
White Board Practice Find the area of the circle formed when a plane passes 9 cm from the center of a sphere with a radius of 15 cm.
White Board Practice Find the area of the circle formed when a plane passes 9 cm from the center of a sphere with a radius of 15 cm. 144
White Board Practice Find the area of the circle formed when a plane passes 9 cm from the center of a sphere with a radius of 15 cm. 15 9
White Board Practice Betty made two wax candles, one in the shape of a sphere with radius 5cm and another in the shape of a cylinder with radius 5cm and height 6 cm. Which candle required more wax?
White Board Practice Betty made two wax candles, one in the shape of a sphere with radius 5cm and another in the shape of a cylinder with radius 5cm and height 6 cm. Which candle required more wax? Volume of Sphere = 166 2/3 cm 3 Volume of Cylinder = 150 cm 3
12-5: Areas and Volumes of Similar Solids Objectives Determine the ratios of the areas and volumes of solids.
Similar Solids For two solids to be similar, all angles must be congruent and all corresponding measurements must be proportional. r h r h
Remember Scale Factor a:b Ratio of perimeters a:b Ratio of areas a 2 :b 2
Theorem If the scale factor of two similar solids is a:b, then the ratio of their perimeters is a:b the ratio of their areas is a 2 :b 2 the ratio of their volumes is a 3 :b 3 r r r r
Scale Factor a:b Ratio of (anything that is not area of volume) a:b –Radii, diameter, heights, circumference, perimeter, etc…. Ratio of areas a 2 :b 2 Ratio of volumes a 3 :b 3
Ex 1 Two regular pyramids have equilateral triangular bases with sides 4 and 6. Their heights are 6 and 9 respectively. Are the two pyramids similar?
Ex 2 Two similar cones have bases with area ratios of 4:9. Find the ratios of the following: a)Radii b)Heights c)Total areas d)Volumes
Ex 3 The volumes of two spheres have a ratio of 27:64. Find the area of the larger sphere if the area of the smaller sphere is 18.
Ex 4 The radii of two similar cylinders are 2 and 5. Find the ratios of their volumes and of their lateral areas.
Ex 5 The volumes of two similar rectangular solids are 125 and 64. Find the ratio of their base perimeters.