Learn on PengiReveal Math, Course 3Module 10: Volume

Lesson 10-3: Volume of Spheres

In this Grade 8 lesson from Reveal Math, Course 3, students learn to calculate the volume of spheres and hemispheres using the formulas V = 4/3πr³ and V = 2/3πr³. The lesson covers working with both radius and diameter as starting values, expressing answers in terms of π or as decimals, and applying the sphere volume formula to real-world problems such as inflating a volleyball or finding the volume of a spherical stone.

Section 1

The Sphere

Property

A sphere of radius $r$ is the set of all points in space that are of a distance $r$ from a point $C$ , called the center of the sphere. The volume of a sphere of radius $r$ is $V = \frac{4}{3} \pi r^3$ .

Examples

A basketball has a radius of 12 cm. Its volume is $V = \frac{4}{3} \pi (12^3) = \frac{4}{3} \pi (1728) = 2304\pi$ cubic cm.
A hemisphere is half of a sphere. If a bowl in the shape of a hemisphere has a radius of 5 inches, its volume is $V = \frac{1}{2} \cdot \frac{4}{3} \pi (5^3) = \frac{2}{3} \pi (125) = \frac{250}{3}\pi$ cubic inches.
A spherical balloon has a volume of $36\pi$ cubic feet. To find its radius, we solve $36\pi = \frac{4}{3} \pi r^3$ . This simplifies to $27 = r^3$ , so the radius is 3 feet.

Explanation

This formula calculates the space inside a perfectly round ball. The only measurement you need is the radius, which is the distance from the center to the surface. Notice the radius is cubed ( $r^3$ ), reflecting its three-dimensional nature.

Section 2

Scaling Principles for Spheres

Property

When the radius of a sphere is multiplied by a scale factor $k$ , the volume of the sphere is multiplied by $k^3$ .

V_{new} = k^3 \cdot V_{old}

Section 3

Volume of Hemispheres

Property

The volume of a hemisphere is half the volume of a complete sphere:

V_{hemisphere} = \frac{1}{2} \cdot \frac{4}{3}\pi r^3 = \frac{2}{3}\pi r^3

Examples

Book overview

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

Continue this chapter

Module 10: Volume

Back to Reveal Math, Course 3

Lesson 1
Lesson 10-1: Volume of Cylinders
Learn Practice
Lesson 2
Lesson 10-2: Volume of Cones
Learn Practice
Lesson 3Current
Lesson 10-3: Volume of Spheres
Learn Practice
Lesson 4
Lesson 10-4: Find Missing Dimensions
Learn Practice
Lesson 5
Lesson 10-5: Volume of Composite Solids
Learn Practice

Lesson overview

Expand to review the lesson summary and core properties.

Expand

Section 1

The Sphere

Property

Examples

A basketball has a radius of 12 cm. Its volume is $V = \frac{4}{3} \pi (12^3) = \frac{4}{3} \pi (1728) = 2304\pi$ cubic cm.
A hemisphere is half of a sphere. If a bowl in the shape of a hemisphere has a radius of 5 inches, its volume is $V = \frac{1}{2} \cdot \frac{4}{3} \pi (5^3) = \frac{2}{3} \pi (125) = \frac{250}{3}\pi$ cubic inches.
A spherical balloon has a volume of $36\pi$ cubic feet. To find its radius, we solve $36\pi = \frac{4}{3} \pi r^3$ . This simplifies to $27 = r^3$ , so the radius is 3 feet.

Explanation

Section 2

Scaling Principles for Spheres

Property

When the radius of a sphere is multiplied by a scale factor $k$ , the volume of the sphere is multiplied by $k^3$ .

V_{new} = k^3 \cdot V_{old}

Section 3

Volume of Hemispheres

Property

The volume of a hemisphere is half the volume of a complete sphere:

V_{hemisphere} = \frac{1}{2} \cdot \frac{4}{3}\pi r^3 = \frac{2}{3}\pi r^3

Examples

Book overview

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

Continue this chapter

Module 10: Volume

Back to Reveal Math, Course 3

Lesson 1
Lesson 10-1: Volume of Cylinders
Learn Practice
Lesson 2
Lesson 10-2: Volume of Cones
Learn Practice
Lesson 3Current
Lesson 10-3: Volume of Spheres
Learn Practice
Lesson 4
Lesson 10-4: Find Missing Dimensions
Learn Practice
Lesson 5
Lesson 10-5: Volume of Composite Solids
Learn Practice

Overview

Lesson overview

Review the lesson summary and core properties without leaving the current page.

Overview

Section 1

The Sphere

Property

Examples

A basketball has a radius of 12 cm. Its volume is $V = \frac{4}{3} \pi (12^3) = \frac{4}{3} \pi (1728) = 2304\pi$ cubic cm.
A hemisphere is half of a sphere. If a bowl in the shape of a hemisphere has a radius of 5 inches, its volume is $V = \frac{1}{2} \cdot \frac{4}{3} \pi (5^3) = \frac{2}{3} \pi (125) = \frac{250}{3}\pi$ cubic inches.
A spherical balloon has a volume of $36\pi$ cubic feet. To find its radius, we solve $36\pi = \frac{4}{3} \pi r^3$ . This simplifies to $27 = r^3$ , so the radius is 3 feet.

Explanation

Section 2

Scaling Principles for Spheres

Property

When the radius of a sphere is multiplied by a scale factor $k$ , the volume of the sphere is multiplied by $k^3$ .

V_{new} = k^3 \cdot V_{old}

Section 3

Volume of Hemispheres

Property

The volume of a hemisphere is half the volume of a complete sphere:

V_{hemisphere} = \frac{1}{2} \cdot \frac{4}{3}\pi r^3 = \frac{2}{3}\pi r^3

Examples

Book overview

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

Continue this chapter

Module 10: Volume

Back to Reveal Math, Course 3

Lesson 1
Lesson 10-1: Volume of Cylinders
Learn Practice
Lesson 2
Lesson 10-2: Volume of Cones
Learn Practice
Lesson 3Current
Lesson 10-3: Volume of Spheres
Learn Practice
Lesson 4
Lesson 10-4: Find Missing Dimensions
Learn Practice
Lesson 5
Lesson 10-5: Volume of Composite Solids
Learn Practice

Lesson 10-3: Volume of Spheres

Property

Examples

Explanation

Property

Property

Examples

Module 10: Volume

Lesson 10-1: Volume of Cylinders

Lesson 10-2: Volume of Cones

Lesson 10-3: Volume of Spheres

Lesson 10-4: Find Missing Dimensions

Lesson 10-5: Volume of Composite Solids

Lesson overview

Property

Examples

Explanation

Property

Property

Examples

Module 10: Volume

Lesson 10-1: Volume of Cylinders

Lesson 10-2: Volume of Cones

Lesson 10-3: Volume of Spheres

Lesson 10-4: Find Missing Dimensions

Lesson 10-5: Volume of Composite Solids

Lesson 10-1: Volume of Cylinders

Lesson 10-2: Volume of Cones

Lesson 10-3: Volume of Spheres

Lesson 10-4: Find Missing Dimensions

Lesson 10-5: Volume of Composite Solids