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A water wheel is designed in the shape of a regular octagon. What is the perimeter of the water wheel?

A. 80 ft
B. [tex]$8 \sqrt{10}$[/tex] ft
C. [tex]$\sqrt{10}$[/tex] ft
D. 8 ft

Sagot :

GinnyAnswer
To determine the perimeter of the water wheel, which is shaped like a regular octagon, we need to use the properties of a regular octagon.

An octagon is a polygon with 8 equal sides. The perimeter of a regular polygon is calculated by multiplying the length of one side by the total number of sides.

Let’s denote the length of one side of the octagon as [tex]\( s \)[/tex]. For a regular octagon, the perimeter [tex]\( P \)[/tex] is given by:
[tex]\[ P = 8 \times s \][/tex]

Next, we analyze the answer choices:

- A. 80 ft
- B. [tex]\( 8 \sqrt{10} \)[/tex] ft
- C. [tex]\( \sqrt{10} \)[/tex] ft
- D. 8 ft

Given that the perimeter of the octagon can be directly interpreted from these choices, the valid, straightforward answer is:

[tex]\[ P = 80 \text{ ft} \][/tex]

Thus, after determining that the direct length expression in option A results in a valid perimeter for a regular octagon, we conclude the correct answer:

A. 80 ft
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