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A farmer's silo is the shape of a cylinder with a hemisphere as the roof. If the height of the silo is 101 feet and the radius of the hemisphere is r feet. Express the volume of the silo as a function of r.

User Shrabanee
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1 Answer

11 votes
11 votes

Answer:


V(r) =101\pi r^2 + (2)/(3)\pi r^3

Explanation:

Given

Shapes: cylinder and hemisphere


h = 101 --- height of cylinder

Required

The volume of the silo

The volume is calculated as:

Volume (V) = Volume of cylinder (V1) + Volume of hemisphere (V2)

So, we have:


V_1 = \pi r^2h


V_1 = \pi r^2 * 101


V_1 = 101\pi r^2 --- cylinder


V_2 = (2)/(3)\pi r^3 ---- hemisphere

So, the volume of the silo is:


V =V_1 + V_2


V =101\pi r^2 + (2)/(3)\pi r^3

Write as a function


V(r) =101\pi r^2 + (2)/(3)\pi r^3

Where:
\pi = (22)/(7)

User Alea
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