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URGENT PLS HELP!!!!!!

The costume department of a theatre company is making cone-shaped hats for a play set in medieval times. Wash that will be covered with satin over its entire lateral surface area inside and out. The slant height of each hat will remain constant at 20 inches but the radius of the base will vary to accommodate different head sizes. Using 3.14 for pi, the lateral area of the hat can be expressed as a function. Use this information for Exercises 9-11.

URGENT PLS HELP!!!!!! The costume department of a theatre company is making cone-shaped-example-1
User BitKFu
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2 Answers

13 votes
13 votes

Final answer:

The lateral area of the cone-shaped hat can be expressed as a function by using the formula Lateral Area = 20πr, where r is the radius of the base.

Step-by-step explanation:

The lateral area of the cone-shaped hat can be expressed as a function using the slant height and the radius of the base. Since the slant height is constant at 20 inches, we can use the formula for the lateral area of a cone, which is given by:

Lateral Area = πr × slant height

By substituting the value of the slant height (20 inches) into the formula, we get:

Lateral Area = πr × 20

Therefore, the lateral area of the cone-shaped hat can be expressed as the function Lateral Area = 20πr.

User Andrew Plotkin
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23 votes
23 votes
If you find the radius to this problem it will give you the answer.
User Thomasdao
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