To find the length of the diagonal of the rectangular prism (segment BE), we can use the 3D distance formula. The formula for the diagonal \(d\) of a rectangular prism can be calculated using the formula:
\[ d = \sqrt{L^2 + W^2 + H^2} \]
where:
- \(L\) is the length,
- \(W\) is the width,
- \(H\) is the height.
Given:
- Length \(L = 32 , \text{cm}\)
- Width \(W = 24 , \text{cm}\)
- Height \(H = 44 , \text{cm}\)
Now, plug in the values into the formula:
\[ d = \sqrt{(32)^2 + (24)^2 + (44)^2} \]
Calculating each square:
\[ 32^2 = 1024 \] \[ 24^2 = 576 \] \[ 44^2 = 1936 \]
Now summing these values:
\[ 1024 + 576 + 1936 = 3536 \]
Now take the square root:
\[ d = \sqrt{3536} \approx 59.5 , \text{cm} \]
Thus, the length of the diagonal of the rectangular prism, segment BE, is approximately 59.5 cm.
The correct response is:
59.5 cm
1 answer