To find the height \( h \) of the square pyramid using the Pythagorean Theorem, we need to understand the relationships between the height, the slant height, and half of the base edge.
Given:
- The length of the front base edge is \( 40 \) feet.
- The slant height is \( 25 \) feet.
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Find half of the base edge: Since the base is a square, half of the base edge will be: \[ \frac{40}{2} = 20 \text{ feet} \]
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Use the Pythagorean Theorem: In the right triangle formed by the height \( h \), half the base edge \( 20 \) feet, and the slant height \( 25 \) feet, we can write: \[ h^2 + 20^2 = 25^2 \]
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Calculate the squares: \[ h^2 + 400 = 625 \]
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Isolate \( h^2 \): \[ h^2 = 625 - 400 \] \[ h^2 = 225 \]
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Take the square root to find \( h \): \[ h = \sqrt{225} = 15 \text{ feet} \]
Thus, the height \( h \) of the square pyramid is 15.0 ft.
The correct response is: 15.0 ft.