Asked by cocoa
What is the volume of a right rectangular prism with a length of 12, width of 5, and height of 10?(1 point)
Answers
Answered by
cocoa
What is the width of a rectangular prism with the volume of 100 units cubed, height of 10 units, and length of 5 units?(1 point)
Answered by
cocoa
A rectangular prism has a base that is 15 units squared and a height of 5. What is its volume?(1 point
Answered by
cocoa
A movie theater uses popcorn boxes in the shape of a right rectangular prism. Each box has a length of 9 inches, a width of 4 inches, and a height of 12 inches. What is the volume of popcorn the box can hold?(1 point)
Answered by
cocoa
A fish tank in the shape of a right rectangular prism has a volume of 1,920 cubic inches. What is the width of the tank if the height is 12 inches and the length is 20 inches?(1 point)
Answered by
cocoa
Using the formula for the volume of a right rectangular prism, what is the area of the base when the volume is 50 cubic units and the height is 2?(1 point)
Responses
100 square units
100 square units
200 square units
200 square units
75 square units
75 square units
25 square units
Responses
100 square units
100 square units
200 square units
200 square units
75 square units
75 square units
25 square units
Answered by
cocoa
The volume of a right rectangular prism is 1,000, the height is 10, and the length is 20. What is the width?(1 point)
Responses
200,000
200,000
50
50
5
5
15
Responses
200,000
200,000
50
50
5
5
15
Answered by
cocoa
Monica is constructing a box in the shape of a right rectangular prism to hold grain on her farm. Use the formula for the volume of a rectangular prism to find the area of the base when the volume is 50 cubic feet and the height is 4 feet.(1 point)
Responses
37.5 ft.2
37.5 feet squared
200 ft.2
200 feet squared
12.5 ft.2
12.5 feet squared
6.25 ft.2
Responses
37.5 ft.2
37.5 feet squared
200 ft.2
200 feet squared
12.5 ft.2
12.5 feet squared
6.25 ft.2
Answered by
cocoa
Hakeem is building a box in the shape of a right rectangular prism to store his toys. It has a volume of 162,000 cubic centimeters. What is the width of the box if the height is 40 cm and the length is 90 cm?(1 point)
Responses
40 cm
40 cm
158,400 cm
158,400 cm
45 cm
45 cm
15 cm
Responses
40 cm
40 cm
158,400 cm
158,400 cm
45 cm
45 cm
15 cm
Answered by
cocoa
Keysha needs to fill a container with cement. The container is in the shape of a right rectangular prism. The container has a length of 7.5 feet, a width of 5 feet, and a height of 3 feet. What is the volume of the container?(1 point)
Responses
15.5 ft.3
15.5 feet cubed
1,125 ft.3
1,125 feet cubed
112.5 ft.3
112.5 feet cubed
37.5 ft.3
Responses
15.5 ft.3
15.5 feet cubed
1,125 ft.3
1,125 feet cubed
112.5 ft.3
112.5 feet cubed
37.5 ft.3
Answered by
GPT 3.5
The volume of a right rectangular prism is calculated by multiplying its length, width, and height.
So in this case, the volume can be found by multiplying 12 (length) by 5 (width) by 10 (height):
Volume = 12 x 5 x 10 = 600.
Therefore, the volume of the right rectangular prism is 600.
So in this case, the volume can be found by multiplying 12 (length) by 5 (width) by 10 (height):
Volume = 12 x 5 x 10 = 600.
Therefore, the volume of the right rectangular prism is 600.
Answered by
GPT 3.5
To find the width of a rectangular prism, we can rearrange the formula for volume, which is given as length × width × height.
Given the volume of 100 units cubed, the height of 10 units, and the length of 5 units, we can set up the equation:
Volume = length × width × height
100 = 5 × width × 10
Dividing both sides of the equation by (5 × 10), we get:
100 / (5 × 10) = width
100 / 50 = width
2 = width
Therefore, the width of the rectangular prism is 2 units.
Given the volume of 100 units cubed, the height of 10 units, and the length of 5 units, we can set up the equation:
Volume = length × width × height
100 = 5 × width × 10
Dividing both sides of the equation by (5 × 10), we get:
100 / (5 × 10) = width
100 / 50 = width
2 = width
Therefore, the width of the rectangular prism is 2 units.
Answered by
GPT 3.5
To find the volume of a rectangular prism, we multiply the area of the base by the height.
In this case, the base of the rectangular prism has an area of 15 units squared and the height is 5 units.
Therefore, the volume can be calculated by multiplying 15 (base area) by 5 (height):
Volume = 15 x 5 = 75.
Therefore, the volume of the rectangular prism is 75 cubic units.
In this case, the base of the rectangular prism has an area of 15 units squared and the height is 5 units.
Therefore, the volume can be calculated by multiplying 15 (base area) by 5 (height):
Volume = 15 x 5 = 75.
Therefore, the volume of the rectangular prism is 75 cubic units.
Answered by
GPT 3.5
The volume of the popcorn box can be found by multiplying its length, width, and height.
In this case, the length of the box is 9 inches, the width is 4 inches, and the height is 12 inches.
Therefore, the volume can be calculated as:
Volume = 9 inches × 4 inches × 12 inches
= 432 cubic inches.
Therefore, the popcorn box can hold 432 cubic inches of popcorn.
In this case, the length of the box is 9 inches, the width is 4 inches, and the height is 12 inches.
Therefore, the volume can be calculated as:
Volume = 9 inches × 4 inches × 12 inches
= 432 cubic inches.
Therefore, the popcorn box can hold 432 cubic inches of popcorn.
Answered by
GPT 3.5
To find the width of the fish tank, we can rearrange the formula for volume, which is given as length × width × height.
Given the volume of 1,920 cubic inches, the height of 12 inches, and the length of 20 inches, we can set up the equation:
Volume = length × width × height
1,920 = 20 × width × 12
Dividing both sides of the equation by (20 × 12), we get:
1,920 / (20 × 12) = width
1,920 / 240 = width
8 = width
Therefore, the width of the fish tank is 8 inches.
Given the volume of 1,920 cubic inches, the height of 12 inches, and the length of 20 inches, we can set up the equation:
Volume = length × width × height
1,920 = 20 × width × 12
Dividing both sides of the equation by (20 × 12), we get:
1,920 / (20 × 12) = width
1,920 / 240 = width
8 = width
Therefore, the width of the fish tank is 8 inches.
Answered by
GPT 3.5
To find the area of the base of a right rectangular prism, we need to rearrange the formula for volume:
Volume = length × width × height
In this case, the volume is given as 50 cubic units and the height is 2. So, let's solve for the area of the base:
50 = length × width × 2
Dividing both sides by 2, we get:
25 = length × width
So, the area of the base is 25 square units.
Therefore, the correct option is:
25 square units
Volume = length × width × height
In this case, the volume is given as 50 cubic units and the height is 2. So, let's solve for the area of the base:
50 = length × width × 2
Dividing both sides by 2, we get:
25 = length × width
So, the area of the base is 25 square units.
Therefore, the correct option is:
25 square units
Answered by
GPT 3.5
To find the width of the right rectangular prism, we need to rearrange the formula for volume:
Volume = length × width × height
Given that the volume is 1,000, the height is 10, and the length is 20, we can set up the equation:
1,000 = 20 × width × 10
Dividing both sides of the equation by (20 × 10), we get:
1,000 / (20 × 10) = width
1,000 / 200 = width
5 = width
Therefore, the width of the right rectangular prism is 5.
Volume = length × width × height
Given that the volume is 1,000, the height is 10, and the length is 20, we can set up the equation:
1,000 = 20 × width × 10
Dividing both sides of the equation by (20 × 10), we get:
1,000 / (20 × 10) = width
1,000 / 200 = width
5 = width
Therefore, the width of the right rectangular prism is 5.
Answered by
GPT 3.5
To find the area of the base of the right rectangular prism, we need to rearrange the formula for volume:
Volume = length × width × height
In this case, the volume is given as 50 cubic feet and the height is 4 feet. So, let's solve for the area of the base:
50 = length × width × 4
Dividing both sides by 4, we get:
12.5 = length × width
So, the area of the base is 12.5 square feet.
Therefore, the correct option is:
12.5 ft.2
12.5 feet squared
Volume = length × width × height
In this case, the volume is given as 50 cubic feet and the height is 4 feet. So, let's solve for the area of the base:
50 = length × width × 4
Dividing both sides by 4, we get:
12.5 = length × width
So, the area of the base is 12.5 square feet.
Therefore, the correct option is:
12.5 ft.2
12.5 feet squared
Answered by
GPT 3.5
To find the width of the right rectangular prism, we need to rearrange the formula for volume:
Volume = length × width × height
Given that the volume is 162,000 cubic centimeters, the height is 40 cm, and the length is 90 cm, we can set up the equation:
162,000 = 90 × width × 40
Dividing both sides of the equation by (90 × 40), we get:
162,000 / (90 × 40) = width
162,000 / 3,600 = width
45 = width
Therefore, the width of the right rectangular prism is 45 cm.
Volume = length × width × height
Given that the volume is 162,000 cubic centimeters, the height is 40 cm, and the length is 90 cm, we can set up the equation:
162,000 = 90 × width × 40
Dividing both sides of the equation by (90 × 40), we get:
162,000 / (90 × 40) = width
162,000 / 3,600 = width
45 = width
Therefore, the width of the right rectangular prism is 45 cm.
Answered by
GPT 3.5
The volume of a right rectangular prism can be found by multiplying its length, width, and height.
In this case, the length of the container is 7.5 feet, the width is 5 feet, and the height is 3 feet.
Therefore, the volume can be calculated as:
Volume = length × width × height
Volume = 7.5 feet × 5 feet × 3 feet
Volume = 112.5 cubic feet.
Therefore, the volume of the container is 112.5 cubic feet.
So the correct option is:
112.5 ft.3
112.5 feet cubed
In this case, the length of the container is 7.5 feet, the width is 5 feet, and the height is 3 feet.
Therefore, the volume can be calculated as:
Volume = length × width × height
Volume = 7.5 feet × 5 feet × 3 feet
Volume = 112.5 cubic feet.
Therefore, the volume of the container is 112.5 cubic feet.
So the correct option is:
112.5 ft.3
112.5 feet cubed
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