Learn on PengienVision, Mathematics, Grade 8Chapter 8: Solve Problems Involving Surface Area and Volume

Lesson 3: Find Volume of Cones

In this Grade 8 enVision Mathematics lesson from Chapter 8, students learn how to calculate the volume of cones using the formula V = ⅓πr²h and explore why a cone's volume is exactly one-third that of a cylinder with the same base and height. The lesson also covers applying the Pythagorean Theorem to find a cone's height from its slant height, and working backward from circumference to determine the radius before solving for volume. Students practice these skills through real-world problems involving dimensions given in different forms.

Section 1

Volume of a Cone Using Base Area

Property

The volume VV of a cone is one-third the product of its base area BB and its perpendicular height hh.

V=13BhV = \frac{1}{3}Bh

Section 2

Volume of a Cone

Property

A cone is a three-dimensional shape with a circular base and an apex. The volume of a right circular cone is one-third the product of the area of the base and the height. If the height is hh and the radius of the base is rr, then V=13πr2hV = \frac{1}{3} \pi r^2 h.

Examples

  • A party hat is a cone with a height of 8 inches and a base radius of 3 inches. Its volume is V=13π(32)(8)=24πV = \frac{1}{3} \pi (3^2)(8) = 24\pi cubic inches.
  • A cylinder has a volume of 9090 cubic cm. A cone with the same base and height would have a volume of V=13(90)=30V = \frac{1}{3} (90) = 30 cubic cm.
  • An hourglass cone holds 15π15\pi cubic inches of sand and has a base radius of 3 inches. Its height is found by solving 15π=13π(32)h15\pi = \frac{1}{3} \pi (3^2)h, which gives h=5h=5 inches.

Explanation

A cone's volume is directly related to a cylinder's. For a cone and cylinder with the same base radius and height, the cone's volume is exactly one-third of the cylinder's. You could fit three full cones of water into one cylinder.

Section 3

Finding Radius from Circumference

Property

To find the radius (rr) of a circle given its circumference (CC), use the formula:

r=C2πr = \frac{C}{2\pi}

Examples

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Chapter 8: Solve Problems Involving Surface Area and Volume

  1. Lesson 1

    Lesson 1: Find Surface Area of Three-Dimensional Figures

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  2. Lesson 2

    Lesson 2: Find Volume of Cylinders

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  3. Lesson 3Current

    Lesson 3: Find Volume of Cones

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  4. Lesson 4

    Lesson 4: Find Volume of Spheres

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Lesson overview

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Section 1

Volume of a Cone Using Base Area

Property

The volume VV of a cone is one-third the product of its base area BB and its perpendicular height hh.

V=13BhV = \frac{1}{3}Bh

Section 2

Volume of a Cone

Property

A cone is a three-dimensional shape with a circular base and an apex. The volume of a right circular cone is one-third the product of the area of the base and the height. If the height is hh and the radius of the base is rr, then V=13πr2hV = \frac{1}{3} \pi r^2 h.

Examples

  • A party hat is a cone with a height of 8 inches and a base radius of 3 inches. Its volume is V=13π(32)(8)=24πV = \frac{1}{3} \pi (3^2)(8) = 24\pi cubic inches.
  • A cylinder has a volume of 9090 cubic cm. A cone with the same base and height would have a volume of V=13(90)=30V = \frac{1}{3} (90) = 30 cubic cm.
  • An hourglass cone holds 15π15\pi cubic inches of sand and has a base radius of 3 inches. Its height is found by solving 15π=13π(32)h15\pi = \frac{1}{3} \pi (3^2)h, which gives h=5h=5 inches.

Explanation

A cone's volume is directly related to a cylinder's. For a cone and cylinder with the same base radius and height, the cone's volume is exactly one-third of the cylinder's. You could fit three full cones of water into one cylinder.

Section 3

Finding Radius from Circumference

Property

To find the radius (rr) of a circle given its circumference (CC), use the formula:

r=C2πr = \frac{C}{2\pi}

Examples

Book overview

Jump across lessons in the current chapter without opening the full course modal.

Continue this chapter

Chapter 8: Solve Problems Involving Surface Area and Volume

  1. Lesson 1

    Lesson 1: Find Surface Area of Three-Dimensional Figures

    LearnPractice
  2. Lesson 2

    Lesson 2: Find Volume of Cylinders

    LearnPractice
  3. Lesson 3Current

    Lesson 3: Find Volume of Cones

    LearnPractice
  4. Lesson 4

    Lesson 4: Find Volume of Spheres

    LearnPractice