e owners of the rectangular swimming pool in the illustration want to surround the pool with a crushed-stone border of uniform width. They have enough stone to cover 90 square meters. How wide ould they make the border? (Hint: The area of the larger rectangle minus the area of the smaller is the area of the border. Assume a = 29 m and b = 14 m.) 3D b+ 2w a + 2w b meters a meters

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### How Wide Should the Border Be?

The owners of the rectangular swimming pool in the illustration want to surround the pool with a crushed-stone border of uniform width. They have enough stone to cover 90 square meters. How wide should they make the border? 

**Hint**: The area of the larger rectangle minus the area of the smaller is the area of the border. Assume a = 29 meters and b = 14 meters.

**Equation to Solve:**
\[ w = \_\_\_\_\_\_ \text{ meters} \]

### Diagram Explanation:

The diagram shows a top view of a rectangular swimming pool with dimensions:
- Length (a) = 29 meters
- Width (b) = 14 meters

There is a border surrounding the pool of uniform width, denoted as \( w \). The overall dimensions of the larger rectangle (pool plus border) are:
- Length = \( a + 2w \)
- Width = \( b + 2w \)

The area of the smaller (pool) rectangle is \( \text{a} \times \text{b} \).
The area of the larger rectangle (pool plus border) is \( (a + 2w) \times (b + 2w) \).

Let’s calculate the area of the borders:
\[ (\text{area of larger rectangle}) - (\text{area of smaller rectangle}) = 90 \, \text{square meters}\]

Parameters:
- \(a = 29 \, \text{m}\)
- \(b = 14 \, \text{m}\)

### Calculation Steps:

1. Write the formula for the larger rectangle area: 
\[ (29 + 2w)(14 + 2w) \]

2. Subtract the area of the pool: 
\[ (29 + 2w)(14 + 2w) - 29 \times 14 = 90 \]

3. Solve for \( w \): 

First, expand the left-hand side:
\[ (29 + 2w)(14 + 2w) - 406 = 90 \]

Then, we have:
\[ 406 + 58w + 4w^2 - 406 = 90 \]
\[ 4w^2 + 58w = 90 \]

Finally, simplify and solve the quadratic equation:
\[ 4w^2 + 58w - 90
Transcribed Image Text:### How Wide Should the Border Be? The owners of the rectangular swimming pool in the illustration want to surround the pool with a crushed-stone border of uniform width. They have enough stone to cover 90 square meters. How wide should they make the border? **Hint**: The area of the larger rectangle minus the area of the smaller is the area of the border. Assume a = 29 meters and b = 14 meters. **Equation to Solve:** \[ w = \_\_\_\_\_\_ \text{ meters} \] ### Diagram Explanation: The diagram shows a top view of a rectangular swimming pool with dimensions: - Length (a) = 29 meters - Width (b) = 14 meters There is a border surrounding the pool of uniform width, denoted as \( w \). The overall dimensions of the larger rectangle (pool plus border) are: - Length = \( a + 2w \) - Width = \( b + 2w \) The area of the smaller (pool) rectangle is \( \text{a} \times \text{b} \). The area of the larger rectangle (pool plus border) is \( (a + 2w) \times (b + 2w) \). Let’s calculate the area of the borders: \[ (\text{area of larger rectangle}) - (\text{area of smaller rectangle}) = 90 \, \text{square meters}\] Parameters: - \(a = 29 \, \text{m}\) - \(b = 14 \, \text{m}\) ### Calculation Steps: 1. Write the formula for the larger rectangle area: \[ (29 + 2w)(14 + 2w) \] 2. Subtract the area of the pool: \[ (29 + 2w)(14 + 2w) - 29 \times 14 = 90 \] 3. Solve for \( w \): First, expand the left-hand side: \[ (29 + 2w)(14 + 2w) - 406 = 90 \] Then, we have: \[ 406 + 58w + 4w^2 - 406 = 90 \] \[ 4w^2 + 58w = 90 \] Finally, simplify and solve the quadratic equation: \[ 4w^2 + 58w - 90
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