To find the area of the opening of the doorway, we need to determine both the width and height of the doorway.
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Calculating the Width of the Doorway:
- Enrique frames the width from an 8-foot board and cuts a length of \(2\sqrt{3}\) feet from it.
- The remaining width of the doorway is: \[ 8 \text{ feet} - 2\sqrt{3} \text{ feet} \]
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Calculating the Height of the Doorway:
- The length that was cut off, which is \(2\sqrt{3}\) feet, is attached to another 8-foot board to frame the height of the door.
- Thus, the height of the doorway is \(2\sqrt{3}\) feet.
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Calculating the Area of the Opening:
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The area \(A\) of the doorway can be found using the formula: \[ A = \text{width} \times \text{height} \]
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Substituting in the expressions for width and height: \[ A = (8 - 2\sqrt{3}) \times (2\sqrt{3}) \]
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Expanding this expression: \[ A = (8 \times 2\sqrt{3}) - (2\sqrt{3} \times 2\sqrt{3}) \] \[ A = 16\sqrt{3} - 4 \times 3 \] \[ A = 16\sqrt{3} - 12 \]
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Thus, the area of the opening of the doorway that Enrique is building is: \[ A = 16\sqrt{3} - 12 \text{ square feet} \]
This is the final expression for the area of the doorway. If you need a numerical value, you can approximate \(\sqrt{3} \approx 1.732\): \[ A \approx 16 \times 1.732 - 12 \approx 27.712 - 12 \approx 15.712 \text{ square feet} \]
However, the exact area is \(16\sqrt{3} - 12\) square feet.
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