Asked by adam
find the volume of a cylinder with a heigh of 12 inches and a diameter of 8 inches. Use 3.14 for pi.
2,411.52 cubic inches
150.72 cubic inches
602.88 cubic inches
1,808.64 cubic inches
2,411.52 cubic inches
150.72 cubic inches
602.88 cubic inches
1,808.64 cubic inches
Answers
Answered by
adam
A 3 D oblique cylinder shows a length of 8 centimeters and perpendicular height of 6 centimeters. The base radius is 3 centimeters.
find the volume of the cylinder. Use 3.14 for pi
226.08 cubic centimeters
339.12 cubic centimeters
678.24 cubic centimeters
169.56 cubic centimeters
find the volume of the cylinder. Use 3.14 for pi
226.08 cubic centimeters
339.12 cubic centimeters
678.24 cubic centimeters
169.56 cubic centimeters
Answered by
adam
a jar of peanut butter has a heigh of 16 centimeters and a width of 10 centimeters. Find the volume of the peanut butter jar. Use 3.14 for pi.
1,256 cubic centimeters
5,024 cubic centimeters
2,009.6 cubic centimeters
4,019.2 cubic centimeters
1,256 cubic centimeters
5,024 cubic centimeters
2,009.6 cubic centimeters
4,019.2 cubic centimeters
Answered by
adam
a jar of salsa has a heigh of 6 inches and a radius of 2 inches. Find the volume of the salsa jar. Use 3.14 for pi.
56.52 cubic inches
226.08 cubic inches
18.84 cubic inches
75.36 cubic inches
56.52 cubic inches
226.08 cubic inches
18.84 cubic inches
75.36 cubic inches
Answered by
adam
a water tower has a heigh of 25 meters and a width of 16 meters. What is the volume of the water tower? use 3.14 for pi.
5,024 cubic meters
20,096 cubic meters
7,850 cubic meters
15,700 cubic meters
5,024 cubic meters
20,096 cubic meters
7,850 cubic meters
15,700 cubic meters
Answered by
GPT-4o mini
To find the volume of a cylinder, you can use the formula:
\[
V = \pi r^2 h
\]
where:
- \( V \) is the volume,
- \( r \) is the radius,
- \( h \) is the height,
- \( \pi \) is approximately 3.14.
First, we need to find the radius. The diameter is given as 8 inches, so the radius \( r \) is half of the diameter:
\[
r = \frac{diameter}{2} = \frac{8}{2} = 4 \text{ inches}
\]
Now, we can plug the radius and height into the volume formula. The height \( h \) is given as 12 inches:
\[
V = 3.14 \times (4)^2 \times 12
\]
Calculating \( (4)^2 \):
\[
(4)^2 = 16
\]
Now substitute that back into the formula:
\[
V = 3.14 \times 16 \times 12
\]
Calculating \( 16 \times 12 \):
\[
16 \times 12 = 192
\]
Now calculate the volume:
\[
V = 3.14 \times 192 = 602.88 \text{ cubic inches}
\]
Thus, the volume of the cylinder is **602.88 cubic inches**.
The correct choice is:
**602.88 cubic inches**.
\[
V = \pi r^2 h
\]
where:
- \( V \) is the volume,
- \( r \) is the radius,
- \( h \) is the height,
- \( \pi \) is approximately 3.14.
First, we need to find the radius. The diameter is given as 8 inches, so the radius \( r \) is half of the diameter:
\[
r = \frac{diameter}{2} = \frac{8}{2} = 4 \text{ inches}
\]
Now, we can plug the radius and height into the volume formula. The height \( h \) is given as 12 inches:
\[
V = 3.14 \times (4)^2 \times 12
\]
Calculating \( (4)^2 \):
\[
(4)^2 = 16
\]
Now substitute that back into the formula:
\[
V = 3.14 \times 16 \times 12
\]
Calculating \( 16 \times 12 \):
\[
16 \times 12 = 192
\]
Now calculate the volume:
\[
V = 3.14 \times 192 = 602.88 \text{ cubic inches}
\]
Thus, the volume of the cylinder is **602.88 cubic inches**.
The correct choice is:
**602.88 cubic inches**.
Answered by
GPT-4o mini
To find the volume of a cylinder, you can use the formula:
\[
V = \pi r^2 h
\]
where:
- \( V \) is the volume,
- \( r \) is the radius of the base,
- \( h \) is the height of the cylinder,
- \( \pi \) is approximately 3.14.
In this case, the base radius \( r \) is 3 centimeters, and the perpendicular height \( h \) is 6 centimeters.
Now, plug the values into the formula:
\[
V = 3.14 \times (3)^2 \times 6
\]
Calculating \( (3)^2 \):
\[
(3)^2 = 9
\]
Now substitute that back into the formula:
\[
V = 3.14 \times 9 \times 6
\]
Calculating \( 9 \times 6 \):
\[
9 \times 6 = 54
\]
Now calculate the volume:
\[
V = 3.14 \times 54
\]
Calculating \( 3.14 \times 54 \):
\[
V = 169.56 \text{ cubic centimeters}
\]
Thus, the volume of the cylinder is **169.56 cubic centimeters**.
The correct choice is:
**169.56 cubic centimeters**.
\[
V = \pi r^2 h
\]
where:
- \( V \) is the volume,
- \( r \) is the radius of the base,
- \( h \) is the height of the cylinder,
- \( \pi \) is approximately 3.14.
In this case, the base radius \( r \) is 3 centimeters, and the perpendicular height \( h \) is 6 centimeters.
Now, plug the values into the formula:
\[
V = 3.14 \times (3)^2 \times 6
\]
Calculating \( (3)^2 \):
\[
(3)^2 = 9
\]
Now substitute that back into the formula:
\[
V = 3.14 \times 9 \times 6
\]
Calculating \( 9 \times 6 \):
\[
9 \times 6 = 54
\]
Now calculate the volume:
\[
V = 3.14 \times 54
\]
Calculating \( 3.14 \times 54 \):
\[
V = 169.56 \text{ cubic centimeters}
\]
Thus, the volume of the cylinder is **169.56 cubic centimeters**.
The correct choice is:
**169.56 cubic centimeters**.
Answered by
GPT-4o mini
To find the volume of the peanut butter jar, which is assumed to be in the shape of a cylinder, you can use the formula:
\[
V = \pi r^2 h
\]
where:
- \( V \) is the volume,
- \( r \) is the radius,
- \( h \) is the height,
- \( \pi \) is approximately 3.14.
The width of the jar is given as 10 centimeters, which means the diameter is 10 cm. Therefore, the radius \( r \) is half of the diameter:
\[
r = \frac{diameter}{2} = \frac{10}{2} = 5 \text{ centimeters}
\]
The height \( h \) of the jar is given as 16 centimeters.
Now we can plug the values into the volume formula:
\[
V = 3.14 \times (5)^2 \times 16
\]
Calculating \( (5)^2 \):
\[
(5)^2 = 25
\]
Now substitute that value back into the formula:
\[
V = 3.14 \times 25 \times 16
\]
Calculating \( 25 \times 16 \):
\[
25 \times 16 = 400
\]
Now calculate the volume:
\[
V = 3.14 \times 400 = 1,256 \text{ cubic centimeters}
\]
Thus, the volume of the peanut butter jar is **1,256 cubic centimeters**.
The correct choice is:
**1,256 cubic centimeters**.
\[
V = \pi r^2 h
\]
where:
- \( V \) is the volume,
- \( r \) is the radius,
- \( h \) is the height,
- \( \pi \) is approximately 3.14.
The width of the jar is given as 10 centimeters, which means the diameter is 10 cm. Therefore, the radius \( r \) is half of the diameter:
\[
r = \frac{diameter}{2} = \frac{10}{2} = 5 \text{ centimeters}
\]
The height \( h \) of the jar is given as 16 centimeters.
Now we can plug the values into the volume formula:
\[
V = 3.14 \times (5)^2 \times 16
\]
Calculating \( (5)^2 \):
\[
(5)^2 = 25
\]
Now substitute that value back into the formula:
\[
V = 3.14 \times 25 \times 16
\]
Calculating \( 25 \times 16 \):
\[
25 \times 16 = 400
\]
Now calculate the volume:
\[
V = 3.14 \times 400 = 1,256 \text{ cubic centimeters}
\]
Thus, the volume of the peanut butter jar is **1,256 cubic centimeters**.
The correct choice is:
**1,256 cubic centimeters**.
Answered by
GPT-4o mini
To find the volume of the salsa jar, which is assumed to be in the shape of a cylinder, you can use the formula:
\[
V = \pi r^2 h
\]
where:
- \( V \) is the volume,
- \( r \) is the radius,
- \( h \) is the height,
- \( \pi \) is approximately 3.14.
Given:
- Height \( h = 6 \) inches,
- Radius \( r = 2 \) inches.
Substituting these values into the volume formula:
\[
V = 3.14 \times (2)^2 \times 6
\]
Calculating \( (2)^2 \):
\[
(2)^2 = 4
\]
Now substituting that back into the volume formula:
\[
V = 3.14 \times 4 \times 6
\]
Calculating \( 4 \times 6 \):
\[
4 \times 6 = 24
\]
Now calculate the volume:
\[
V = 3.14 \times 24 = 75.36 \text{ cubic inches}
\]
Thus, the volume of the salsa jar is **75.36 cubic inches**.
The correct choice is:
**75.36 cubic inches**.
\[
V = \pi r^2 h
\]
where:
- \( V \) is the volume,
- \( r \) is the radius,
- \( h \) is the height,
- \( \pi \) is approximately 3.14.
Given:
- Height \( h = 6 \) inches,
- Radius \( r = 2 \) inches.
Substituting these values into the volume formula:
\[
V = 3.14 \times (2)^2 \times 6
\]
Calculating \( (2)^2 \):
\[
(2)^2 = 4
\]
Now substituting that back into the volume formula:
\[
V = 3.14 \times 4 \times 6
\]
Calculating \( 4 \times 6 \):
\[
4 \times 6 = 24
\]
Now calculate the volume:
\[
V = 3.14 \times 24 = 75.36 \text{ cubic inches}
\]
Thus, the volume of the salsa jar is **75.36 cubic inches**.
The correct choice is:
**75.36 cubic inches**.
Answered by
GPT-4o mini
To find the volume of a water tower, which is typically in the shape of a cylinder, you can use the formula:
\[
V = \pi r^2 h
\]
where:
- \( V \) is the volume,
- \( r \) is the radius of the base,
- \( h \) is the height,
- \( \pi \) is approximately 3.14.
Given:
- Height \( h = 25 \) meters,
- Width (diameter) \( d = 16 \) meters.
First, determine the radius \( r \):
\[
r = \frac{d}{2} = \frac{16}{2} = 8 \text{ meters}
\]
Now, substitute the values into the volume formula:
\[
V = 3.14 \times (8)^2 \times 25
\]
Calculating \( (8)^2 \):
\[
(8)^2 = 64
\]
Now substitute that back into the volume formula:
\[
V = 3.14 \times 64 \times 25
\]
Calculating \( 64 \times 25 \):
\[
64 \times 25 = 1600
\]
Now calculate the volume:
\[
V = 3.14 \times 1600
\]
Calculating \( 3.14 \times 1600 \):
\[
V = 5024 \text{ cubic meters}
\]
Thus, the volume of the water tower is **5,024 cubic meters**.
The correct choice is:
**5,024 cubic meters**.
\[
V = \pi r^2 h
\]
where:
- \( V \) is the volume,
- \( r \) is the radius of the base,
- \( h \) is the height,
- \( \pi \) is approximately 3.14.
Given:
- Height \( h = 25 \) meters,
- Width (diameter) \( d = 16 \) meters.
First, determine the radius \( r \):
\[
r = \frac{d}{2} = \frac{16}{2} = 8 \text{ meters}
\]
Now, substitute the values into the volume formula:
\[
V = 3.14 \times (8)^2 \times 25
\]
Calculating \( (8)^2 \):
\[
(8)^2 = 64
\]
Now substitute that back into the volume formula:
\[
V = 3.14 \times 64 \times 25
\]
Calculating \( 64 \times 25 \):
\[
64 \times 25 = 1600
\]
Now calculate the volume:
\[
V = 3.14 \times 1600
\]
Calculating \( 3.14 \times 1600 \):
\[
V = 5024 \text{ cubic meters}
\]
Thus, the volume of the water tower is **5,024 cubic meters**.
The correct choice is:
**5,024 cubic meters**.