12-6 Surface Area and Volume of Spheres You found surface areas of prisms and cylinders. Find surface areas of spheres. Find volumes of spheres.
How many bases….. Does a prism have? 2 Does a pyramid have? 1 Does a cylinder have? Does a cone have? Does a sphere have? 2 1
Sphere Measuring What one measurement do you need to know when working with a sphere? The center? The diameter? The radius? No ? yes
The surface area of a sphere is 4π times the square of its radius. SA = 4 π r2 P. 880
Find the Surface Area of the Sphere SA = 4π r2 SA = 4π(5)2 SA = 100π (exact) SA ≈ 314.2 (approx) r = 5
Find the surface area of the sphere. Round to the nearest tenth. S = 4r2 Surface area of a sphere = 4(4.5)2 Replace r with 4.5. ≈ 254.5 Simplify. Answer: 254.5 in2
Find the surface area of the sphere. Round to the nearest tenth. A. 462.7 in2 B. 473.1 in2 C. 482.6 in2 D. 490.9 in2
A. Find the surface area of the hemisphere. Find half the area of a sphere with the radius of 3.7 millimeters. Then add the area of the great circle. Surface area of a hemisphere Replace r with 3.7. ≈ 129.0 Use a calculator. Answer: about 129.0 mm2
B. Find the surface area of a sphere if the circumference of the great circle is 10 feet. First, find the radius. The circumference of a great circle is 2r. So, 2r = 10 or r = 5. S = 4r2 Surface area of a sphere = 4(5)2 Replace r with 5. ≈ 314.2 Use a calculator. Answer: about 314.2 ft2
C. Find the surface area of a sphere if the area of the great circle is approximately 220 square meters. First, find the radius. The area of a great circle is r2. So, r2 = 220 or r ≈ 8.4. S = 4r2 Surface area of a sphere ≈ 4(8.4)2 Replace r with 5. ≈ 886.7 Use a calculator. Answer: about 886.7 m2
A. Find the surface area of the hemisphere. A. 110.8 m2 B. 166.3 m2 C. 169.5 m2 D. 172.8 m2
B. Find the surface area of a sphere if the circumference of the great circle is 8 feet. A. 100.5 ft2 B. 201.1 ft2 C. 402.2 ft2 D. 804.3 ft2
C. Find the surface area of the sphere if the area of the great circle is approximately 160 square meters. A. 320 ft2 B. 440 ft2 C. 640 ft2 D. 720 ft2
The volume of a sphere is four-thirds the product of π and the cube of its radius. V = 4/3 π r 3 P. 882
Find the Volume of the Sphere V = 4/3 π r 3 V = 4/3 π (5) 3 V = 166⅔π (exact) V ≈ 523.6 (approx) r = 5
A. Find the volume a sphere with a great circle circumference of 30 centimeters. Round to the nearest tenth. Find the radius of the sphere. The circumference of a great circle is 2r. So, 2r = 30 or r = 15. Volume of a sphere r = 15 ≈ 14,137.2 cm3 Use a calculator. Answer: The volume of the sphere is approximately 14,137.2 cm3.
A. Find the volume of the sphere to the nearest tenth. A. 268.1 cm3 B. 1608.5 cm3 C. 2144.7 cm3 D. 6434 cm3
B. Find the volume of the hemisphere with a diameter of 6 feet B. Find the volume of the hemisphere with a diameter of 6 feet. Round to the nearest tenth. The volume of a hemisphere is one-half the volume of the sphere. Volume of a hemisphere r =3 Use a calculator. Answer: The volume of the hemisphere is approximately 56.5 cubic feet.
B. Find the volume of the hemisphere to the nearest tenth. A. 3351.0 m3 B. 6702.1 m3 C. 268,082.6 m3 D. 134,041.3 m3
Find the Volume and the Surface Area of a sphere… When the area of one its great circles is 4π. What do circle area and sphere volume/surface area have in common? Radius!!! A = 4π
Find the Volume and the Surface Area of a sphere… V = 4/3 π r 3 V = 4/3 π (2) 3 V= 10⅔π V ≈ 33.5 A = 4π SA = 4πr2 SA = 4π(2)2 SA = 16π SA ≈ 50.3
ARCHEOLOGY The stone spheres of Costa Rica were made by forming granodiorite boulders into spheres. One of the stone spheres has a volume of about 36,000 cubic inches. What is the diameter of the stone sphere? Understand You know that the volume of the stone is 36,000 cubic inches. Plan First use the volume formula to find the radius. Then find the diameter. Solve Volume of a sphere Replace V with 36,000. Divide each side by
Use a calculator to find 2700 ( 1 ÷ 3 ) ENTER 30 The radius of the stone is 30 inches. So, the diameter is 2(30) or 60 inches. Answer: 60 inches CHECK You can work backward to check the solution. If the diameter is 60, then r = 30. If r = 30, then V = cubic inches. The solution is correct.
RECESS The jungle gym outside of Jada’s school is a perfect hemisphere RECESS The jungle gym outside of Jada’s school is a perfect hemisphere. It has a volume of 4,000 cubic feet. What is the diameter of the jungle gym? A. 10.7 feet B. 12.6 feet C. 14.4 feet D. 36.3 feet
Find the volume of a sphere whose surface area is 36π SA =36π SA = 4 π r2 36π = 4π r2 9 = r2 r = 3 V = 4/3 π r 3 V = 4/3 π (3)3 V = 36π V ≈ 113.1
12-6 Assignment Page 884, 10-15, 18-22 No Formulas with numbers No Credit