The design of a garden path uses stone pieces shaped as squares with side length of 15 in. Find the length (horizontal measurement) of the path to the nearest inch.

The length of the path is ? inches.

I found an image that has a similar problem.

The squares were in a diamond form. There were six squares. To get the length of the path, I have to solve for the diagonal of the square.

To solve for the diagonal of the square, I have to multiply the length one side by the square root of 2.

diagonal of one square = 15 in * √2 = 21.21 in

21.21 in * 6 squares = 127.28 inches

The length of the path is 127 inches.

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abidemiokin abidemiokin · Answer 2 · 2022-02-14T14:06:39+01:00

The required length of the path is 127.3 inches

How to calculate the diagonal of a square

First step is to calculate e]the diagonal of each square as shown:

L = 15 * √2

L = 21.2 in

Since there are 6 squares in total, hence the length of the path is calculated as:

Length of path = 6 * 21.2

Length of path = 127.3 inches

Hence the required length of the path is 127.3 inches

Learn more on diagonal of square here: https://brainly.com/question/92334

The design of a garden path uses stone pieces shaped as squares with side length of 15 in. Find the length (horizontal measurement) of the path to the nearest inch. The length of the path is __?__ inches.

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How to calculate the diagonal of a square

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The design of a garden path uses stone pieces shaped as squares with side length of 15 in. Find the length (horizontal measurement) of the path to the nearest inch.

The length of the path is ? inches.