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Here you will learn about the volume of a cube, including how to calculate the volume of a cube within mathematical problems and within real-world contexts.
Students will first learn about volume of a cube as part of measurement and data in 5th grade and extend their learning as part of geometry in 6th grade.
The volume of a cube is the amount of space there is within a cube.
A cube is a three-dimensional shape with 6 square faces.
To find the volume of a cube, with side length a, you can use the volume of a cube formula, \text {Volume }=a^{3}.
Volume is measured in cubic units. For example, cubic inches (in^3), cubic meters (m^3), or cubic centimeters (cm^3).
For example,
The volume of this cube is,
volume = a^3
volume = 8^3
volume = 512 \, cm^3
The length, width, and height of the cube are multiplied together to find the total volume.
Use this quiz to check your grade 6 to 8 students’ understanding of volume. 10+ questions with answers covering a range of 6th, 7th and 8th grade volume topics to identify areas of strength and support!
DOWNLOAD FREEUse this quiz to check your grade 6 to 8 students’ understanding of volume. 10+ questions with answers covering a range of 6th, 7th and 8th grade volume topics to identify areas of strength and support!
DOWNLOAD FREEHow does this relate to 5th grade math and 6th grade math?
In order to calculate the volume of a cube:
Find the volume of the cube.
\text{Volume }=a^{3}
2Substitute the values into the formula.
Here, the sides of the cube are 6 \, cm.
\text{Volume }=6^{3}
3Work out the calculation.
\begin{aligned} \text{Volume} &=6 \times 6 \times 6\\\\ &=216 \end{aligned}
4Write the answer and include the units.
The measurements are in centimeters. Therefore, the volume will be in cubic centimeters.
\text{Volume }=216 \mathrm{~cm}^{3}
Find the volume of this cube.
Write down the formula.
\text{Volume }=a^{3}
Substitute the values into the formula.
Here, the edges are each 7 \, in.
\text{Volume }=7^{3}
Work out the calculation.
\begin{aligned} \text{Volume} &=7 \times 7 \times 7\\\\ &=343 \end{aligned}
Write the answer and include the units.
The measurements are in inches. Therefore, the volume will be in cubic inches.
\text{Volume }=343 \mathrm{~in}^{3}
Find the volume of this cube.
Write down the formula.
\text{Volume }=a^{3}
Substitute the values into the formula.
Notice here that one of the units is in centimeters while the other is in meters. You need all the units to be the same to calculate the volume.
This is a cube, so you know all the edges are the same length, so you can easily change meters to centimeters.
0.6 \mathrm{~m}=60 \mathrm{~cm}
\text{Volume }=60^{3}
Work out the calculation.
\begin{aligned} Volume &=60×60×60 \\\\ &=216,000 \end{aligned}
Write the answer and include the units.
The measurements are in centimeters. Therefore, the volume will be in cubic centimeters.
\text{Volume }=216,000 \mathrm{~cm}^{3}
Write down the formula.
\text{Volume }=a^{3}
Substitute the values into the formula.
Notice here that one of the units is in meters, one is centimeters, and another is in millimeters. You need all the units to be the same to calculate the volume.
This is a cube, so you know all the edges are the same length, so you can easily change the centimeters and the millimeters to meters.
\begin{aligned}
& 15,000 \mathrm{~mm}=15 \mathrm{~m} \\\\
& 1,500 \mathrm{~cm}=15 \mathrm{~m}
\end{aligned}
Work out the calculation.
\begin{aligned} \text { Volume } & =15 \times 15 \times 15 \\\\ & =3,375 \end{aligned}
Write the answer and include the units.
The measurements are in meters. Therefore, the volume will be in cubic meters.
\text{ Volume }=3,375 \mathrm{~m}^3
Anna has a Rubik’s cube. Each edge of the Rubik’s cube is 5.8 \, cm. What is the volume of the Rubik’s cube?
Write down the formula.
\text{Volume }=a^{3}
Substitute the values into the formula.
Here, the edges are each 5.8 \, cm.
\text{ Volume }=5.8^3
Work out the calculation.
\begin{aligned} \text { Volume } & =5.8 \times 5.8 \times 5.8 \\\\ & =195.112 \end{aligned}
Write the answer and include the units.
The measurements are in centimeters. Therefore, the volume will be in cubic centimeters.
\text { Volume }=195.112 \mathrm{~cm}^3
Grant is moving to a new house and needs to buy boxes to pack his belongings into. He wants to know the volume of the cube-shaped box shown below. The length of the side of the box is 20 inches. Help him determine the box’s volume.
Write down the formula.
\text{Volume }=a^{3}
Substitute the values into the formula.
Here, the edges are each 20 \, in.
\text{Volume }=20^{3}
Work out the calculation.
\begin{aligned} \text { Volume } & =20 \times 20 \times 20 \\\\ & =8,000 \end{aligned}
Write the answer and include the units.
The measurements are in inches. Therefore, the volume will be in cubic inches.
\text{Volume }=8,000 \mathrm{~in}^3
1. Find the volume of the cube.
\begin{aligned} \text{Volume } &=a^{3} \\\\ \text{Volume } &=3^{3} \\\\ &=3 \times 3 \times 3 \\\\ &=27 \mathrm{~cm}^{3} \end{aligned}
2. Find the volume of the cube.
\begin{aligned} \text{Volume } &=a^{3} \\\\ \text{Volume }&=0.5^{3}\\\\ &=0.5 \times 0.5 \times 0.5\\\\ &=0.125 \mathrm{~m}^{3} \end{aligned}
3. Find the volume of this cube.
Notice here that one of the units is in centimeters while the other is in meters. You need all the units to be the same to calculate the volume.
This is a cube, which means all the edges are the same length, so you can easily change meters to centimeters, 0.4m = 40 \, cm.
\begin{aligned} \text{Volume } &=a^{3} \\\\ \text{Volume }&=40^{3}\\\\ &=40 \times 40 \times 40\\\\ &=64,000 \end{aligned}
The measurements are in centimeters. Therefore, the volume will be in cubic centimeters.
\text{Volume }=64,000 \mathrm{~cm}^{3}
4. Kara has 5 sugar cubes to put into her coffee. Each sugar cube has side lengths of 13 \, mm. What is the total volume of all 5 sugar cubes?
First, you need to find the volume of one sugar cube.
\begin{aligned} \text{Volume } &=a^{3} \\\\ \text { Volume } & =13^3 \\\\ &= 13 \times 13 \times 13 \\\\ &= 2,197 \mathrm{~mm}^3 \end{aligned}
Since each sugar cube has the same side lengths, you can multiply the volume of one sugar cube by 5 to find the total volume of all 5 sugar cubes.
2,197 \mathrm{~mm}^3 \times 5=10,985 \mathrm{~mm}^3
5. Vera has two boxes, box A and box B, which are shown below. How much greater is the volume of box B than the volume of box A?
First, you need to find the volume of box A and the volume of box B. Then you need to find the difference between the two.
Box A :
\begin{aligned} \text{Volume } &=a^{3} \\\\ \text { Volume } & =12^3 \\\\ & = 12 \times 12 \times 12 \\\\ & = 1,728 \mathrm{~in}^3 \end{aligned}
Box B :
\begin{aligned} \text{Volume } &=a^{3} \\\\ \text { Volume } & =16^3 \\\\ &= 16 \times 16 \times 16 \\\\ &= 4,096 \mathrm{~in}^3 \end{aligned}
4,096-1,728=2,368
The volume of box B is 2,368 \mathrm{~in}^3 greater than the volume of box A.
6. This sculpture is formed by placing one cube on top of another. Find the total volume of the sculpture.
To find the total volume of the sculpture, you need to find the volume of the top cube and the volume of the bottom cube, then add the volumes together.
Volume of bottom cube: 60 \times 60 \times 60=216,000 \mathrm{~cm}^3
Volume of top cube: 35 \times 35 \times 35=42,875 \mathrm{~cm}^3
Total volume: 216,000+42,875=258,875 \mathrm{~cm}^3
A cube is a three-dimensional shape with 6 square faces. The edges of the cube are of equal length.
To find the volume of a cube, with side length a, you can use the volume of a cube formula, \text { Volume }=a^3. This is the same as multiplying length times width times height.
The volume of a cube formula is \text { Volume }=a^3.
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