Question

To find the surface area of a right rectangular prism, we use the formula:

\[
\text{Surface Area} = 2lw + 2lh + 2wh
\]

where \( l \) is the length, \( w \) is the width, and \( h \) is the height.

In this case, since all edges measure 12.75 cm, we have:

- \( l = 12.75 \, \text{cm} \)
- \( w = 12.75 \, \text{cm} \)
- \( h = 12.75 \, \text{cm} \)

Now, we plug in these values into the formula:

\[
\text{Surface Area} = 2(12.75)(12.75) + 2(12.75)(12.75) + 2(12.75)(12.75)
\]

\[
= 2(12.75 \cdot 12.75 + 12.75 \cdot 12.75 + 12.75 \cdot 12.75)
\]

\[
= 2(3 \cdot (12.75)^2)
\]

Now, calculate \( (12.75)^2 \):

\[
(12.75)^2 = 162.5625
\]

Then multiply by 3:

\[
3 \cdot 162.5625 = 487.6875
\]

Now, multiply by 2:

\[
\text{Surface Area} = 2 \cdot 487.6875 = 975.375 \, \text{cm}^2
\]

Therefore, rounding off, the surface area is \( 975.38 \, \text{cm}^2 \).

The correct response is:

**975.38 cm²**