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Surface Area of Cones and Spheres Cone – The circular counterpart of a pyramid. Every cone has one...

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Surface Area of Cones and Spheres Cone The circular counterpart of a pyramid. Every cone has one face that is its base . This base is a circular region and lies in a plane. The point not in the plane of the base is called the vertex of the cone.
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Page 1: Surface Area of Cones and Spheres Cone – The circular counterpart of a pyramid. Every cone has one face that is its base. This base is a circular region.

Surface Area of Cones and Spheres

Cone – The circular counterpart of a pyramid. Every cone has one face that is its base. This base is a circular region and lies in a plane. The point not in the plane of the base is called the vertex of the cone.

Page 2: Surface Area of Cones and Spheres Cone – The circular counterpart of a pyramid. Every cone has one face that is its base. This base is a circular region.

Surface Area of Cones and Spheres

Altitude – The perpendicular line segment connecting the apex of the cone to the plane of its base. The length of this segment is frequently termed the height of the cone.

Axis – The segment connecting the center of one base to the apex. If the axis is perpendicular to the plane of the base, the cone is right. If the axis is not perpendicular, the cone is oblique.

Page 3: Surface Area of Cones and Spheres Cone – The circular counterpart of a pyramid. Every cone has one face that is its base. This base is a circular region.

Surface Area of Cones and Spheres

Lateral Area of a Cone• If a right circular cone

has a lateral area of L square units, a slant height of l units, and the radius of base is r units, then

L = *r*l

Page 4: Surface Area of Cones and Spheres Cone – The circular counterpart of a pyramid. Every cone has one face that is its base. This base is a circular region.

Surface Area of Cones and Spheres

Surface Area of a Cone• If a right circular cone

has a surface area of T square units, a slant height of l units, and the radius of the base is r units, then

T = *r*l + *r2

Page 5: Surface Area of Cones and Spheres Cone – The circular counterpart of a pyramid. Every cone has one face that is its base. This base is a circular region.

A hat for a child’s birthday party has a conical shape with an altitude of 9 inches and a diameter of 5 inches. Find the lateral area of the birthday hat.

Answer: 73.4 in2

Page 6: Surface Area of Cones and Spheres Cone – The circular counterpart of a pyramid. Every cone has one face that is its base. This base is a circular region.

Find the surface area of the cone. Round to the nearest tenth.

Answer: about 63.6 cm2

Page 7: Surface Area of Cones and Spheres Cone – The circular counterpart of a pyramid. Every cone has one face that is its base. This base is a circular region.

Surface Area of Cones and Spheres

Great Circle – When a plane intersects a sphere so that the intersection contains the center of the sphere. The radius of the sphere and the great circle are the same length.

Page 8: Surface Area of Cones and Spheres Cone – The circular counterpart of a pyramid. Every cone has one face that is its base. This base is a circular region.

Surface Area of Cones and Spheres

Hemisphere – Half of a sphere. A great circle splits a sphere into two congruent hemispheres.

Page 9: Surface Area of Cones and Spheres Cone – The circular counterpart of a pyramid. Every cone has one face that is its base. This base is a circular region.

Answer: about 8.5 in.

In the figure, O is the center of the sphere, and plane U intersects the sphere in circle L. If OL 3 inches and LM 8 inches, find OM.

Page 10: Surface Area of Cones and Spheres Cone – The circular counterpart of a pyramid. Every cone has one face that is its base. This base is a circular region.

Surface Area of Cones and Spheres

Surface Area of a Sphere

• If a sphere has a surface area of T square units and a radius of r units, then

T = 4**r2

Page 11: Surface Area of Cones and Spheres Cone – The circular counterpart of a pyramid. Every cone has one face that is its base. This base is a circular region.

a. Find the surface area of the sphere, given a great circle with an area of approximately 91.6 square centimeters.

b. Find the surface area of a hemisphere with a radius of 6.4 inches.

Answer: about 366.4 cm2

Answer: about 386.0 in2

Page 12: Surface Area of Cones and Spheres Cone – The circular counterpart of a pyramid. Every cone has one face that is its base. This base is a circular region.

Find the surface area of a ball with a circumference of 18 inches to determine how much leather is needed to make the ball.

Answer: about 103.1 in2


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