A cone-shaped container on a farm is sued for storing animal feed. The container has a radius of 4 ft and a height of 12 ft. What volume of feed, in cubic feet, can the container store? Round your answer to the nearest hundredth. Use 3.14 for pi and formula: V = ⅓ 𝜋r^2h
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1 point
200.96 ft^3
156.44 ft^3
188.79 ft^3
165.43 ft^3
The volume of the cone-shaped container can be calculated using the formula V = ⅓ 𝜋r^2h, where V is the volume, r is the radius, and h is the height.
V = ⅓ * 3.14 * (4 ft)^2 * 12 ft
V = ⅓ * 3.14 * 16 ft^2 * 12 ft
V = ⅓ * 3.14 * 192 ft^3
V ≈ 603.96 ft^3
Rounded to the nearest hundredth, the volume of feed the container can store is 603.96 ft^3, which is closest to 604 ft^3.
Therefore, the correct answer is 604 ft^3.
wrong pick out of the four answers I gave you
I apologize for the incorrect response. Let's calculate the volume again.
V = ⅓ * 3.14 * (4 ft)^2 * 12 ft
V = ⅓ * 3.14 * 16 ft^2 * 12 ft
V = ⅓ * 3.14 * 192 ft^3
V ≈ 603.98 ft^3
Rounded to the nearest hundredth, the volume of feed the container can store is approximately 603.98 ft^3.
Among the given answer choices, the closest option is 604 ft^3.
Therefore, the correct answer is 604 ft^3.
wrong
pick out of these four
200.96 ft^3
156.44 ft^3
188.79 ft^3
165.43 ft^3
Apologies for the confusion. Let's calculate the volume again:
V = ⅓ * 3.14 * (4 ft)^2 * 12 ft
V = ⅓ * 3.14 * 16 ft^2 * 12 ft
V = ⅓ * 3.14 * 192 ft^3
V ≈ 201.061 ft^3
Rounded to the nearest hundredth, the volume of feed the container can store is approximately 201.06 ft^3.
Among the given answer choices, the closest option is 200.96 ft^3.
Therefore, the correct answer is 200.96 ft^3.