The formula for the volume of a cylinder is V = πr^2h, where r is the radius and h is the height.
The given diameter of 8 inches can be divided by 2 to find the radius, which is 4 inches.
Using this information, we can calculate the volume:
V = π(4^2)(12)
V = π(16)(12)
V = 192π
To approximate the volume, we can use the value of π as approximately 3.14.
V ≈ 3.14 * 192
V ≈ 602.88 cubic inches
Therefore, the correct answer is 602.88 cubic inches.
Find the volume of a cylinder with a height of 12 inches and a diameter of 8 inches.(1 point)
Responses
2,411.52 cubic inches
2,411.52 cubic inches
150.72 cubic inches
150.72 cubic inches
1,808.64 cubic inches
1,808.64 cubic inches
602.88 cubic inches
13 answers
Find the volume of the cylinder.
Slant = 8 cm
Height = 6 cm
Radius = 3 cm
(1 point)
Responses
339.12 cubic centimeters
339.12 cubic centimeters
678.24 cubic centimeters
678.24 cubic centimeters
226.08 cubic centimeters
226.08 cubic centimeters
169.56 cubic centimeters
Slant = 8 cm
Height = 6 cm
Radius = 3 cm
(1 point)
Responses
339.12 cubic centimeters
339.12 cubic centimeters
678.24 cubic centimeters
678.24 cubic centimeters
226.08 cubic centimeters
226.08 cubic centimeters
169.56 cubic centimeters
To find the volume of the cylinder, we can use the formula V = πr^2h, where r is the radius and h is the height.
Given information:
Radius = 3 cm
Height = 6 cm
Using this information, we can calculate the volume:
V = π(3^2)(6)
V = π(9)(6)
V = 54π
To approximate the volume, we can use the value of π as approximately 3.14.
V ≈ 3.14 * 54
V ≈ 169.56 cubic centimeters
Therefore, the correct answer is 169.56 cubic centimeters.
Given information:
Radius = 3 cm
Height = 6 cm
Using this information, we can calculate the volume:
V = π(3^2)(6)
V = π(9)(6)
V = 54π
To approximate the volume, we can use the value of π as approximately 3.14.
V ≈ 3.14 * 54
V ≈ 169.56 cubic centimeters
Therefore, the correct answer is 169.56 cubic centimeters.
A jar of peanut butter has a height of 16 centimeters and a width of 10 centimeters. Find the volume of the peanut butter jar.(1 point)
Responses
5,024 cubic centimeters
5,024 cubic centimeters
1,256 cubic centimeters
1,256 cubic centimeters
2,009.6 cubic centimeters
2,009.6 cubic centimeters
4,019.2 cubic centimeters
Responses
5,024 cubic centimeters
5,024 cubic centimeters
1,256 cubic centimeters
1,256 cubic centimeters
2,009.6 cubic centimeters
2,009.6 cubic centimeters
4,019.2 cubic centimeters
The volume of the peanut butter jar can be calculated using the formula V = lwh, where l is the length, w is the width, and h is the height.
Given information:
Width = 10 cm
Height = 16 cm
Using this information, we can calculate the volume:
V = (10)(16)(h)
V = 160h
To find the volume, we need to know the length of the jar. Without the length, we cannot calculate the volume accurately.
Therefore, the volume of the peanut butter jar cannot be determined with the given information.
Given information:
Width = 10 cm
Height = 16 cm
Using this information, we can calculate the volume:
V = (10)(16)(h)
V = 160h
To find the volume, we need to know the length of the jar. Without the length, we cannot calculate the volume accurately.
Therefore, the volume of the peanut butter jar cannot be determined with the given information.
which of the answers is correct?
Apologies for the confusion. Without the length of the peanut butter jar, I am unable to accurately calculate the volume. Therefore, none of the listed answers can be confirmed as correct.
A water tower has a height of 25 meters and a width of 16 meters. What is the volume of the water tower?(1 point)
Responses
15,700 cubic meters
15,700 cubic meters
7,850 cubic meters
7,850 cubic meters
20,096 cubic meters
20,096 cubic meters
5,024 cubic meters
Responses
15,700 cubic meters
15,700 cubic meters
7,850 cubic meters
7,850 cubic meters
20,096 cubic meters
20,096 cubic meters
5,024 cubic meters
The volume of the water tower can be calculated using the formula V = lwh, where l is the length, w is the width, and h is the height.
Given information:
Width = 16 meters
Height = 25 meters
Using this information, we can calculate the volume:
V = (16)(25)(h)
V = 400h
To find the volume, we need to know the length of the water tower. Without the length, we cannot calculate the volume accurately.
Therefore, the volume of the water tower cannot be determined with the given information.
Given information:
Width = 16 meters
Height = 25 meters
Using this information, we can calculate the volume:
V = (16)(25)(h)
V = 400h
To find the volume, we need to know the length of the water tower. Without the length, we cannot calculate the volume accurately.
Therefore, the volume of the water tower cannot be determined with the given information.
Question
Describe the volume of the cylinder with a base radius of 2.5 in. and a height of 9 in.(1 point)
Responses
(2.5)(9)in.^3
left parenthesis 2.5 right parenthesis left parenthesis 9 right parenthesis in. cubed
π(2.5)(9)in.^3
pi left parenthesis 2.5 right parenthesis left parenthesis 9 right parenthesis in. cubed
π(9)2(2.5)in.^3
pi left parenthesis 9 right parenthesis squared left parenthesis 2.5 right parenthesis in. cubed
π(2.5)2(9)in.^3
Describe the volume of the cylinder with a base radius of 2.5 in. and a height of 9 in.(1 point)
Responses
(2.5)(9)in.^3
left parenthesis 2.5 right parenthesis left parenthesis 9 right parenthesis in. cubed
π(2.5)(9)in.^3
pi left parenthesis 2.5 right parenthesis left parenthesis 9 right parenthesis in. cubed
π(9)2(2.5)in.^3
pi left parenthesis 9 right parenthesis squared left parenthesis 2.5 right parenthesis in. cubed
π(2.5)2(9)in.^3
The volume of the cylinder with a base radius of 2.5 in and a height of 9 in can be calculated using the formula V = πr^2h, where r is the radius and h is the height.
Given information:
Radius = 2.5 in
Height = 9 in
Using this information, we can calculate the volume:
V = π(2.5)^2(9)
V = π(6.25)(9)
V = 56.25π
Therefore, the correct answer is π(6.25)(9)in^3, or pi (6.25) (9) in cubed.
Given information:
Radius = 2.5 in
Height = 9 in
Using this information, we can calculate the volume:
V = π(2.5)^2(9)
V = π(6.25)(9)
V = 56.25π
Therefore, the correct answer is π(6.25)(9)in^3, or pi (6.25) (9) in cubed.
Describe the volume of the cylinder with a base radius of 2.5 in. and a height of 9 in.(1 point)
Responses
(2.5)(9)in.^3
left parenthesis 2.5 right parenthesis left parenthesis 9 right parenthesis in. cubed
π(2.5)(9)in.^3
pi left parenthesis 2.5 right parenthesis left parenthesis 9 right parenthesis in. cubed
π(9)^2(2.5)in^.3
pi left parenthesis 9 right parenthesis squared left parenthesis 2.5 right parenthesis in. cubed
π(2.5)^2(9)in.^3
pi left parenthesis 2.5 right parenthesis squared left parenthesis 9 right parenthesis in. cubed
Responses
(2.5)(9)in.^3
left parenthesis 2.5 right parenthesis left parenthesis 9 right parenthesis in. cubed
π(2.5)(9)in.^3
pi left parenthesis 2.5 right parenthesis left parenthesis 9 right parenthesis in. cubed
π(9)^2(2.5)in^.3
pi left parenthesis 9 right parenthesis squared left parenthesis 2.5 right parenthesis in. cubed
π(2.5)^2(9)in.^3
pi left parenthesis 2.5 right parenthesis squared left parenthesis 9 right parenthesis in. cubed
The volume of the cylinder with a base radius of 2.5 in and a height of 9 in can be calculated using the formula V = πr^2h, where r is the radius and h is the height.
Given information:
Radius = 2.5 in
Height = 9 in
Using this information, we can calculate the volume:
V = π(2.5)^2(9)
V = π(6.25)(9)
V = 56.25π
Therefore, the correct answer is π(2.5)^2(9)in^3, or pi (2.5) squared (9) in cubed.
Given information:
Radius = 2.5 in
Height = 9 in
Using this information, we can calculate the volume:
V = π(2.5)^2(9)
V = π(6.25)(9)
V = 56.25π
Therefore, the correct answer is π(2.5)^2(9)in^3, or pi (2.5) squared (9) in cubed.