11.8 Surface Area and Volume of Spheres

11.8 Surface Area and Volume of Spheres
Geometry

Geometry 11.8Surface Area and Volume of Spheres
Goals Find the surface area of spheres. Find the volume of spheres. Solve problems using area and volume. April 12, 2019 Geometry 11.8Surface Area and Volume of Spheres

Sphere Demo The set of points in space that are equidistant from the same point, the center. radius Great Circle (Divides the sphere into two halves.) April 12, 2019 Geometry 11.8Surface Area and Volume of Spheres

Hemisphere Half of a sphere. r April 12, 2019 Geometry 11.8Surface Area and Volume of Spheres

Sphere Formulas r April 12, 2019 Geometry 11.8Surface Area and Volume of Spheres

Using a Calculator You may find it easier to use the formula for volume in this form: April 12, 2019 Geometry 11.8Surface Area and Volume of Spheres

Example Find the Surface Area and the Volume of a sphere with a radius of 2. 2 April 12, 2019 Geometry 11.8Surface Area and Volume of Spheres

Your Turn Find the surface area and volume.
April 12, 2019 Geometry 11.8Surface Area and Volume of Spheres

Problem 1 A snowman is made with three spheres. The largest has a diameter of 24 inches, the next largest has a diameter of 20 inches, and the smallest has a diameter of 16 inches. Find the volume of the snowman. April 12, 2019 Geometry 11.8Surface Area and Volume of Spheres

Problem 1 Solution A snowman is made with three spheres. The largest has a diameter of 24 inches, the next largest has a diameter of 20 inches, and the smallest has a diameter of 16 inches. Find the volume of the snowman. The radii are 12 in, 10 in, and 8 in. April 12, 2019 Geometry 11.8Surface Area and Volume of Spheres

Problem 1 Solution The radii are 12 in, 10 in, and 8 in. 13, cu in April 12, 2019 Geometry 11.8Surface Area and Volume of Spheres

Or, for easier calculation…
April 12, 2019 Geometry 11.8Surface Area and Volume of Spheres

Problem 2 This is a grain silo, as found on many farms. They are used to store feed grain and other materials. They are usually cylindrical with a hemispherical top. Assume that the concrete part has a height of 50 feet, and the diameter of the cylinder is 18 feet. Find the volume of the silo. April 12, 2019 Geometry 11.8Surface Area and Volume of Spheres

Problem 2 Solution Volume of Cylinder V = r2h V = (92)(50) V =   81  50 V = 4050 V  cu. ft. 18 50 9 April 12, 2019 Geometry 11.8Surface Area and Volume of Spheres

Problem 2 Solution Volume of Hemisphere 18 50 9 This is the volume of a sphere. The volume of the hemisphere is half of this value, which is cu. ft. April 12, 2019 Geometry 11.8Surface Area and Volume of Spheres

Problem 2 Solution Volume of Cylinder Volume of Hemisphere 1526.8 Total Volume = cu. ft. 18 50 9 April 12, 2019 Geometry 11.8Surface Area and Volume of Spheres

Problem 2 Extension Total Volume = cu. ft. One bushel contains cubic feet. How many bushels are in the silo?  = bushels April 12, 2019 Geometry 11.8Surface Area and Volume of Spheres

Problem 3 A sphere is inscribed inside a cube which measures 6 in. on a side. What is the ratio of the volume of the sphere to the volume of the cube? April 12, 2019 Geometry 11.8Surface Area and Volume of Spheres

Problem 3 Solution Volume of the Cube: 6  6  6 = 216 cu in Radius of the Sphere: 3 in. Volume of the Sphere: 6 6 3 6 April 12, 2019 Geometry 11.8Surface Area and Volume of Spheres

Problem 3 Solution 6 6 6 Volume of the Cube: 216 cu in
Volume of the Sphere: 36 Ratio of Volume of Sphere to Volume of Cube 6 6 3 6 April 12, 2019 Geometry 11.8Surface Area and Volume of Spheres

Problem 4 A mad scientist makes a potion in a full spherical flask which has a diameter of 4 inches. To drink it, he pours it into a cylindrical cup with a diameter of 3.5 inches and is 3.5 inches high. Will the potion fit into the cup? If not, how much is left in the flask? April 12, 2019 Geometry 11.8Surface Area and Volume of Spheres

Problem 4 Solution Flask Volume: Diameter = 4 inches Radius = 2 inches April 12, 2019 Geometry 11.8Surface Area and Volume of Spheres

Problem 4 Solution 33.5 cu in Cup Volume: Diameter = 3.5 inches Radius = 1.75 inches Height = 3.5 inches April 12, 2019 Geometry 11.8Surface Area and Volume of Spheres

Problem 4 Solution 33.5 cu in 33.7 cu in The flask holds 33.5 cu in. The cup holds 33.7 cu in. Yes, the potion fits into the cup. April 12, 2019 Geometry 11.8Surface Area and Volume of Spheres

Problem 5 The surface area of a sphere is 300 cm2. Find: Its radius, The circumference of a great circle, Its volume. April 12, 2019 Geometry 11.8Surface Area and Volume of Spheres

Problem 5 Solutions April 12, 2019 Geometry 11.8Surface Area and Volume of Spheres

Summary A sphere is the set of points in space equidistant from a center. A hemisphere is half of a sphere. A great circle is the largest circle that can be drawn on a sphere. The diameter of a great circle equals the diameter of the sphere. April 12, 2019 Geometry 11.8Surface Area and Volume of Spheres

Formulas to Know r April 12, 2019 Geometry 11.8Surface Area and Volume of Spheres

Last Problem On a far off planet, Zenu was examining his next target, Earth. The radius of the Earth is 3963 miles. What is the volume of material that will be blown into space? April 12, 2019 Geometry 11.8Surface Area and Volume of Spheres

Last Problem Solution April 12, 2019 Geometry 11.8Surface Area and Volume of Spheres

11.8 Surface Area and Volume of Spheres

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