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Type: Open-Ended
Category: Three Dimensional Shapes
Level: Grade 11
Standards: HSF-IF.C.7, HSF-IF.C.7a, HSF-IF.C.7d, HSG-MG.A.3
Author: nsharp1
Created: 4 years ago

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Three Dimensional Shapes Question

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A cylinder is to be constructed such that its volume is

$10 \ "cm"^3$ . What is the smallest possible surface area for this cylinder?

Grade 11 Three Dimensional Shapes CCSS: HSF-IF.C.7, HSF-IF.C.7a, HSF-IF.C.7d, HSG-MG.A.3

Looking at the equation for surface area in the previous question as a function,

$S(r)$ , where the surface area is a function of the radius, find the minimum surface area possible for the given volume. Round the answer to the nearest square centimeter.

Hint: Consider

$S(r)$ as two separate functions, and graph both of these. Then, consider the sum of these two functions.
Grid 10x10