To find the length of the diagonal of the rectangular prism (segment \( BE \)), we can use the formula for the diagonal \( D \) of a rectangular prism:
\[ D = \sqrt{L^2 + W^2 + H^2} \]
where:
- \( L \) is the length of the prism,
- \( W \) is the width of the prism,
- \( H \) is the height of the prism.
Given:
- \( L = 32 \) cm,
- \( W = 24 \) cm,
- \( H = 44 \) cm.
Now we calculate \( D \):
-
Square each dimension:
- \( L^2 = 32^2 = 1024 \)
- \( W^2 = 24^2 = 576 \)
- \( H^2 = 44^2 = 1936 \)
-
Sum these squares: \[ L^2 + W^2 + H^2 = 1024 + 576 + 1936 = 3536 \]
-
Take the square root of the sum: \[ D = \sqrt{3536} \approx 59.5 \text{ cm} \]
Thus, the length of the diagonal of the rectangular prism \( BE \) is approximately \( 59.5 \text{ cm} \).
Therefore, the correct response is:
59.5 cm