Question

To find the surface area of a cone, you can use the formula:

\[
\text{Surface Area} = \pi r (r + l)
\]

where:
- \( r \) is the radius of the base,
- \( l \) is the slant height,
- and \( \pi \) is approximately 3.14.

Given:
- The diameter is 38 cm, so the radius \( r \) is half of that:
\[
r = \frac{38}{2} = 19 \text{ cm}
\]
- The slant height \( l \) is 30 cm.

Now, plug the values into the surface area formula:

\[
\text{Surface Area} = 3.14 \times 19 \times (19 + 30)
\]
\[
= 3.14 \times 19 \times 49
\]
Calculating \( 19 + 30 = 49 \):

Now calculate \( 19 \times 49 \):
\[
19 \times 49 = 931
\]

Now calculate the surface area:
\[
\text{Surface Area} = 3.14 \times 931 = 2,922.74 \text{ square centimeters}
\]

When rounded, that is approximately 2,923.34 square centimeters.

Thus, the correct response is:
**2,923.34 square centimeters**.